{"id":2203,"date":"2022-07-05T18:50:15","date_gmt":"2022-07-05T18:50:15","guid":{"rendered":"https:\/\/geo-webonline.com\/?page_id=2203"},"modified":"2025-04-06T23:35:20","modified_gmt":"2025-04-06T23:35:20","slug":"espectros-de-respuesta-sismica-la-interseccion-entre-la-ingenieria-geotecnica-y-el-diseno-sismorresistente-de-estructuras","status":"publish","type":"page","link":"https:\/\/geo-webonline.com\/en\/espectros-de-respuesta-sismica-la-interseccion-entre-la-ingenieria-geotecnica-y-el-diseno-sismorresistente-de-estructuras\/","title":{"rendered":"Seismic response spectra: the intersection between geotechnical engineering and seismic-resistant design of structures"},"content":{"rendered":"\t\t<div data-elementor-type=\"wp-page\" data-elementor-id=\"2203\" class=\"elementor elementor-2203\" data-elementor-post-type=\"page\">\n\t\t\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-119c44e elementor-section-boxed 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tabindex=\"-1\">E-learning<\/a><\/li>\n<li class=\"menu-item menu-item-type-post_type menu-item-object-page menu-item-2318\"><a href=\"https:\/\/geo-webonline.com\/en\/servicios-de-consultoria\/\" class=\"elementor-item\" tabindex=\"-1\">Servicios de consultor\u00eda<\/a><\/li>\n<li class=\"menu-item menu-item-type-post_type menu-item-object-page menu-item-3224\"><a href=\"https:\/\/geo-webonline.com\/en\/proyecto-geotecnico\/\" class=\"elementor-item\" tabindex=\"-1\">Proyectos geot\u00e9cnicos<\/a><\/li>\n<li class=\"menu-item menu-item-type-post_type menu-item-object-page menu-item-1168\"><a href=\"https:\/\/geo-webonline.com\/en\/contacto\/\" class=\"elementor-item\" tabindex=\"-1\">Contacto<\/a><\/li>\n<\/ul>\t\t\t<\/nav>\n\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-5ec61f8 elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"5ec61f8\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-ff37730\" data-id=\"ff37730\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-631ac98 elementor-widget elementor-widget-heading\" data-id=\"631ac98\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Espectros de respuesta s\u00edsmica: la intersecci\u00f3n entre la ingenier\u00eda geot\u00e9cnica y el dise\u00f1o sismorresistente de estructuras<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-494430f elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"494430f\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-5a5ac15\" data-id=\"5a5ac15\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-17e7960 elementor-widget elementor-widget-text-editor\" data-id=\"17e7960\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><em>El espectro de respuesta s\u00edsmica es una herramienta fundamental para llevar a cabo el dise\u00f1o sismorresistente de la mayor\u00eda de las estructuras. Sin embargo, el significado f\u00edsico del espectro de respuesta muchas veces es desconocido para muchos profesionales, quienes se limitan simplemente a aplicar lo establecido en la normativa vigente \u00bfQuieres aprender m\u00e1s sobre esta importante herramienta de dise\u00f1o? Contin\u00faa leyendo este post&#8230;<\/em><\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-ccf0ebe elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"ccf0ebe\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-52dfbc2\" data-id=\"52dfbc2\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-6fd98db elementor-toc--minimized-on-tablet elementor-widget elementor-widget-table-of-contents\" data-id=\"6fd98db\" data-element_type=\"widget\" data-e-type=\"widget\" data-settings=\"{&quot;headings_by_tags&quot;:[&quot;h3&quot;],&quot;exclude_headings_by_selector&quot;:[],&quot;no_headings_message&quot;:&quot;No headings were found on this page.&quot;,&quot;marker_view&quot;:&quot;numbers&quot;,&quot;minimize_box&quot;:&quot;yes&quot;,&quot;minimized_on&quot;:&quot;tablet&quot;,&quot;hierarchical_view&quot;:&quot;yes&quot;,&quot;min_height&quot;:{&quot;unit&quot;:&quot;px&quot;,&quot;size&quot;:&quot;&quot;,&quot;sizes&quot;:[]},&quot;min_height_tablet&quot;:{&quot;unit&quot;:&quot;px&quot;,&quot;size&quot;:&quot;&quot;,&quot;sizes&quot;:[]},&quot;min_height_mobile&quot;:{&quot;unit&quot;:&quot;px&quot;,&quot;size&quot;:&quot;&quot;,&quot;sizes&quot;:[]}}\" data-widget_type=\"table-of-contents.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<div class=\"elementor-toc__header\">\n\t\t\t\t\t\t<h4 class=\"elementor-toc__header-title\">\n\t\t\t\tContenido\t\t\t<\/h4>\n\t\t\t\t\t\t\t\t\t\t<div class=\"elementor-toc__toggle-button elementor-toc__toggle-button--expand\" role=\"button\" tabindex=\"0\" aria-controls=\"elementor-toc__6fd98db\" aria-expanded=\"true\" aria-label=\"Open table of contents\"><i aria-hidden=\"true\" class=\"fas fa-chevron-down\"><\/i><\/div>\n\t\t\t\t<div class=\"elementor-toc__toggle-button elementor-toc__toggle-button--collapse\" role=\"button\" tabindex=\"0\" aria-controls=\"elementor-toc__6fd98db\" aria-expanded=\"true\" aria-label=\"Close table of contents\"><i aria-hidden=\"true\" class=\"fas fa-chevron-up\"><\/i><\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<div id=\"elementor-toc__6fd98db\" class=\"elementor-toc__body\">\n\t\t\t<div class=\"elementor-toc__spinner-container\">\n\t\t\t\t<i class=\"elementor-toc__spinner eicon-animation-spin eicon-loading\" aria-hidden=\"true\"><\/i>\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-6d529db elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"6d529db\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-f8b33aa\" data-id=\"f8b33aa\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-ee7a0a2 elementor-widget elementor-widget-heading\" data-id=\"ee7a0a2\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">\nEl concepto de espectro de respuesta s\u00edsmica<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-e9b8da9 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"e9b8da9\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-cf0268c\" data-id=\"cf0268c\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-694eb49 elementor-widget elementor-widget-text-editor\" data-id=\"694eb49\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Primeramente, vamos a revisar el concepto de espectro de respuesta s\u00edsmica. Para ello, es importante mencionar que los movimientos s\u00edsmicos son registrados a trav\u00e9s de <em>acelerogramas<\/em>, que representan la variaci\u00f3n de la aceleraci\u00f3n inducida por un sismo en el sitio donde se encuentra instalada la estaci\u00f3n sismol\u00f3gica, durante el tiempo que dura el evento.<\/p><p>As\u00ed, a partir del registro reflejado en el acelerograma, se puede calcular, con una integraci\u00f3n num\u00e9rica sencilla, cu\u00e1l es la aceleraci\u00f3n m\u00e1xima que se inducir\u00eda en un oscilador lineal simple con amortiguamiento espec\u00edfico <em>\u03b6<\/em> y un per\u00edodo natural <em>T<\/em>. La gr\u00e1fica de estas aceleraciones m\u00e1ximas como funci\u00f3n del per\u00edodo <em>T<\/em>, para un oscilador simple supuesto con un amortiguamiento dado, constituye el espectro de respuesta de aceleraciones.<\/p><p>Asimismo, mediante un tratamiento matem\u00e1tico relativamente sencillo del acelerograma, pueden obtenerse las se\u00f1ales correspondientes a velocidades y desplazamientos, y generar tambi\u00e9n los espectros de respuesta correspondientes. En la Figura 1 se observa un ejemplo de los espectros de respuesta de desplazamiento, velocidad y aceleraci\u00f3n combinados en una sola gr\u00e1fica.<\/p><p><img decoding=\"async\" class=\"aligncenter\" 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\" alt=\"\" width=\"276\" height=\"130\" \/><\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-3cc9984 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"3cc9984\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-1b8f674\" data-id=\"1b8f674\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-dc7e2df elementor-widget elementor-widget-text-editor\" data-id=\"dc7e2df\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><strong>Figura 1<\/strong> Espectros de respuesta combinados para un amortiguamiento <em>\u03b6<\/em> = 2%. Sismo <em>El Centro<\/em>, 1940 (<em>Fuente<\/em>: disponible en <a href=\"https:\/\/boffi.github.io\/dati_2018\/10\/handout_e.pdf\">https:\/\/boffi.github.io\/dati_2018\/10\/handout_e.pdf<\/a>).<\/p><p>\u00a0<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-b09a95f elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"b09a95f\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-49185a5\" data-id=\"49185a5\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-321bdd9 elementor-widget elementor-widget-text-editor\" data-id=\"321bdd9\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>De acuerdo a lo anterior, el espectro de respuesta permite determinar de manera directa desplazamientos, velocidades y aceleraciones m\u00e1ximas que un movimiento s\u00edsmico provocar\u00eda en estructuras asimilables a osciladores lineales simples, y en los distintos modos de las estructuras asimilables a osciladores lineales m\u00faltiples. De ah\u00ed que el espectro de respuesta constituya una herramienta fundamental para el dise\u00f1o sismorresistente de la mayor\u00eda de las estructuras.<\/p><p>\u00a0<\/p><p>En algunos problemas espec\u00edficos de Geotecnia, como la licuaci\u00f3n de suelos o la estabilidad de obras de tierra, donde la modelaci\u00f3n con osciladores lineales simples o m\u00faltiples no es apropiada, el uso del espectro de respuesta para caracterizar el movimiento s\u00edsmico es menos frecuente. No obstante, el an\u00e1lisis de la modificaci\u00f3n del movimiento s\u00edsmico al propagarse a trav\u00e9s del suelo (t\u00f3pico muy importante para el estudio de din\u00e1mica de estructuras), suele realizarse mediante el empleo de espectros de respuesta (Jim\u00e9nez Salas, 1980).<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-5f2be65 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"5f2be65\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-ff4a03b\" data-id=\"ff4a03b\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-b6ab242 elementor-widget elementor-widget-heading\" data-id=\"b6ab242\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Sistema de un grado de libertad (1GDL)<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-e74777f elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"e74777f\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-46da33d\" data-id=\"46da33d\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-bc70123 elementor-widget elementor-widget-text-editor\" data-id=\"bc70123\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>El sistema estructural m\u00e1s sencillo posible es un sistema de un grado de libertad. \u00c9ste puede ser ejemplificado por una losa o techo r\u00edgido, de peso <em>W<\/em>, apoyado en columnas de masa despreciable, axialmente r\u00edgidas, con rigidez finita a la flexi\u00f3n <em>k<\/em>, empotrada en su base. Este sistema tiene, adem\u00e1s, un amortiguamiento <em>C<\/em> que permite la absorci\u00f3n de energ\u00eda en el rango el\u00e1stico (Newmark &amp; Rosenblueth, 1971). Un sistema de este tipo se muestra en la Figura 2.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-ef723d4 elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"ef723d4\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-d063c07\" data-id=\"d063c07\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-d1e8deb elementor-widget elementor-widget-image\" data-id=\"d1e8deb\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"image.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<img decoding=\"async\" width=\"300\" height=\"259\" src=\"https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/1-300x259.jpg\" class=\"attachment-medium size-medium wp-image-2209\" alt=\"\" srcset=\"https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/1-300x259.jpg 300w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/1-768x664.jpg 768w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/1-14x12.jpg 14w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/1.jpg 828w\" sizes=\"(max-width: 300px) 100vw, 300px\" \/>\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-122c27f elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"122c27f\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-ec370d6\" data-id=\"ec370d6\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-9642ccd elementor-widget elementor-widget-text-editor\" data-id=\"9642ccd\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><strong>Figura 2<\/strong> Sistema de 1GDL amortiguado (<em>Fuente<\/em>: Grases, 1997).<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-b6a6c89 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"b6a6c89\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-e332fa3\" data-id=\"e332fa3\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-ebc6f17 elementor-widget elementor-widget-text-editor\" data-id=\"ebc6f17\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Un concepto muy importante en este tipo de sistemas es el de <em>fracci\u00f3n del<\/em> <em>amortiguamiento cr\u00edtico \u03b6<\/em>. B\u00e1sicamente, <em>\u03b6<\/em> afecta la vibraci\u00f3n libre reduci\u00e9ndola. Dado que <em>\u03b6<\/em> = <em>C \/ C<sub>CRIT<\/sub><\/em>, cuando la constante del amortiguador <em>C<\/em> es igual o mayor que <em>C<sub>CRIT<\/sub><\/em>, el sistema no oscila al desplazarlo, o al hacerle adquirir velocidad y dejarlo mover libremente, sino que regresa gradualmente a su estado original no deformado, el cual recupera despu\u00e9s de un tiempo infinitamente largo. Cuando las constantes del amortiguador son menores que <em>C<sub>CRIT<\/sub><\/em>, el sistema tiende, oscilando, a dicho estado (Newmark y Rosenblueth, 1971).<\/p><p>\u00a0<\/p><p>\u00bfQu\u00e9 significa esto desde el punto de vista pr\u00e1ctico? La Figura 3 puede ayudar a responder esta pregunta. En la misma se observan dos gr\u00e1ficas: una correspondiente a un sistema <em>sin amortiguamiento<\/em>, que oscila con la misma amplitud durante cierto tiempo <em>t<\/em>; y la otra que representa un sistema <em>con amortiguamiento<\/em> <em>D<\/em>, en el cual la amplitud va disminuyendo para valores crecientes de <em>t<\/em>.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-dbf69fa elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"dbf69fa\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-fee7e19\" data-id=\"fee7e19\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-4a45677 elementor-widget elementor-widget-image\" data-id=\"4a45677\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"image.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<img loading=\"lazy\" decoding=\"async\" width=\"300\" height=\"236\" src=\"https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/2-300x236.jpg\" class=\"attachment-medium size-medium wp-image-2210\" alt=\"\" srcset=\"https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/2-300x236.jpg 300w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/2-1024x807.jpg 1024w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/2-768x605.jpg 768w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/2-15x12.jpg 15w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/2.jpg 1028w\" sizes=\"(max-width: 300px) 100vw, 300px\" \/>\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-80dccbf elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"80dccbf\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-314e643\" data-id=\"314e643\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-7cec8d9 elementor-widget elementor-widget-text-editor\" data-id=\"7cec8d9\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><strong>Figura 3<\/strong> Oscilaciones libres en un sistema sencillo (<em>Fuente<\/em>: modificado de Newmark &amp; Rosenblueth, 1971).<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-4823211 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"4823211\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-7b23994\" data-id=\"7b23994\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-0939ca7 elementor-widget elementor-widget-text-editor\" data-id=\"0939ca7\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>B\u00e1sicamente, si se piensa en estructuras d\u00factiles dise\u00f1adas para resistir movimientos s\u00edsmicos, las mismas presentan un comportamiento que sigue este patr\u00f3n.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-c9c01af elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"c9c01af\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-7b919e3\" data-id=\"7b919e3\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-815eb66 elementor-widget elementor-widget-heading\" data-id=\"815eb66\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Obtenci\u00f3n de espectros de respuesta s\u00edsmica<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-691db9d elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"691db9d\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-e4cfbf9\" data-id=\"e4cfbf9\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-3a2182a elementor-widget elementor-widget-text-editor\" data-id=\"3a2182a\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Dado un oscilador con un amortiguador viscoso, la acci\u00f3n s\u00edsmica sobre el mismo es simulada por desplazamientos, velocidades y aceleraciones del terreno, designadas por <em>u<sub>g<\/sub>(t)<\/em>, <em>u\u00b4<sub>g<\/sub>(t)<\/em> y <em>u\u00b4\u00b4<sub>g<\/sub>(t)<\/em>, respectivamente. Por lo tanto, el oscilador sufrir\u00e1 <em>desplazamientos relativos<\/em>, <em>velocidades relativas<\/em>, y <em>aceleraciones absolutas<\/em>. La condici\u00f3n de equilibrio din\u00e1mico de la masa del oscilador ser\u00e1:<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-cd8406e elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"cd8406e\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-bb8ab06\" data-id=\"bb8ab06\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-45baf8d elementor-widget elementor-widget-image\" data-id=\"45baf8d\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"image.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<img loading=\"lazy\" decoding=\"async\" width=\"768\" height=\"74\" src=\"https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/f1-768x74.jpg\" class=\"attachment-medium_large size-medium_large wp-image-2215\" alt=\"\" srcset=\"https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/f1-768x74.jpg 768w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/f1-300x29.jpg 300w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/f1-1024x98.jpg 1024w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/f1-1536x148.jpg 1536w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/f1-18x2.jpg 18w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/f1.jpg 1664w\" sizes=\"(max-width: 768px) 100vw, 768px\" \/>\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-233e6f6 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"233e6f6\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-618395f\" data-id=\"618395f\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-f839d17 elementor-widget elementor-widget-text-editor\" data-id=\"f839d17\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Dada la historia de aceleraciones del terreno <em>u\u00b4\u00b4<sub>g<\/sub><\/em>, la ecuaci\u00f3n anterior depende del amortiguamiento <em>\u03b6<\/em> y de la frecuencia circular <em>w<\/em> (o del per\u00edodo <em>T<\/em>) del sistema no amortiguado. La soluci\u00f3n de esta ecuaci\u00f3n puede ser escrita en t\u00e9rminos de la integral de Duhamel (Grases, 1997), como sigue:<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-3e50f14 elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"3e50f14\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-a8d7eed\" data-id=\"a8d7eed\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-2f48ead elementor-widget elementor-widget-image\" data-id=\"2f48ead\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"image.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<img loading=\"lazy\" decoding=\"async\" width=\"768\" height=\"148\" src=\"https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/f2-768x148.jpg\" class=\"attachment-medium_large size-medium_large wp-image-2216\" alt=\"\" srcset=\"https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/f2-768x148.jpg 768w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/f2-300x58.jpg 300w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/f2-1024x197.jpg 1024w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/f2-1536x295.jpg 1536w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/f2-18x3.jpg 18w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/f2.jpg 1664w\" sizes=\"(max-width: 768px) 100vw, 768px\" \/>\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-020cc72 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"020cc72\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-d73833b\" data-id=\"d73833b\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-62823b6 elementor-widget elementor-widget-text-editor\" data-id=\"62823b6\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Para <em>\u03b6<\/em> \u00a3 0,20 el valor de <em>w<\/em><em><sub>D<\/sub><\/em> es, para prop\u00f3sitos pr\u00e1cticos, igual al valor de <em>w<\/em>. El m\u00e1ximo valor del desplazamiento obtenido para un per\u00edodo particular es la ordenada del espectro de desplazamientos relativos; la repetici\u00f3n del c\u00e1lculo para diferentes per\u00edodos permite obtener la envolvente de los desplazamientos m\u00e1ximos, que constituye el espectro de desplazamientos relativos (<em>Sd<\/em>) para un amortiguamiento <em>\u03b6<\/em> seleccionado (Wiegel, 1970). El proceso se resume en la Figura 4.<\/p><p>\u00a0<\/p><p>El producto <em>\u03c9.Sd <\/em>tiene unidades de velocidad y est\u00e1 relacionado con la m\u00e1xima energ\u00eda de deformaci\u00f3n almacenada en el sistema durante la respuesta. As\u00ed, el gr\u00e1fico <em>Spv<\/em> vs. <em>T<\/em> es denominado <em>espectro de respuesta de pseudo-velocidades<\/em> (Grases, 1997).<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-ceddf13 elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"ceddf13\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-2478eee\" data-id=\"2478eee\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-c89a2d4 elementor-widget elementor-widget-image\" data-id=\"c89a2d4\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"image.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<img loading=\"lazy\" decoding=\"async\" width=\"300\" height=\"171\" src=\"https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/3-300x171.jpg\" class=\"attachment-medium size-medium wp-image-2220\" alt=\"\" srcset=\"https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/3-300x171.jpg 300w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/3-1024x585.jpg 1024w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/3-768x439.jpg 768w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/3-1536x878.jpg 1536w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/3-18x10.jpg 18w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/3.jpg 1694w\" sizes=\"(max-width: 300px) 100vw, 300px\" \/>\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-0c288b4 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"0c288b4\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-cddee44\" data-id=\"cddee44\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-2bc393d elementor-widget elementor-widget-text-editor\" data-id=\"2bc393d\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><strong>Figura 4 <\/strong>Obtenci\u00f3n de ordenadas del espectro de desplazamientos relativos <em>Sd<\/em>. (a) Oscilador de <em>T<\/em> = 1 s y <em>\u03b6<\/em> = 0,02 sometido a vibraciones s\u00edsmicas; (b) Selecci\u00f3n de la ordenada espectral <em>Sd<\/em> (<em>Fuente<\/em>: modificado de Grases, 1997).<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-ec67bf8 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"ec67bf8\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-a1d6b60\" data-id=\"a1d6b60\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-bbc483e elementor-widget elementor-widget-text-editor\" data-id=\"bbc483e\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Para la mayor\u00eda de los movimientos s\u00edsmicos, la pseudo-velocidad y la velocidad relativa no difieren mucho. Sin embargo, para per\u00edodos altos puede existir una marcada diferencia (Wiegel, 1970).<\/p><p>\u00a0<\/p><p>Por otro lado, el producto <em>\u03c9<sup>2<\/sup>.Sd<\/em> representa la ordenada del espectro de respuesta de pseudo-aceleraciones. El gr\u00e1fico <em>Sa<\/em> vs. <em>T<\/em> es denominado <em>espectro de respuesta de pseudo-aceleraciones<\/em>, y su similitud con el espectro de respuesta de aceleraciones absolutas no es v\u00e1lida para per\u00edodos muy peque\u00f1os, ni para per\u00edodos muy largos (Grases, 1997).<\/p><p>\u00a0<\/p><p>Es importante se\u00f1alar que los espectros obtenidos seg\u00fan el procedimiento brevemente descrito arriba, dependen de las propiedades estratigr\u00e1ficas y din\u00e1micas del suelo. As\u00ed, considerando que las ondas s\u00edsmicas se propagan a trav\u00e9s de un terreno que tiene cierto per\u00edodo caracter\u00edstico, se encontrar\u00e1 un m\u00e1ximo de amplificaci\u00f3n cuando dicho per\u00edodo se asemeje al predominante del evento s\u00edsmico. Y lo mismo ocurrir\u00e1 en estructuras que presenten per\u00edodos de vibraci\u00f3n similares a los del terreno, produci\u00e9ndose el fen\u00f3meno de <em>resonancia<\/em>.<\/p><p>\u00a0<\/p><p>Seg\u00fan se desprende de lo anterior, resulta imprescindible seleccionar acelerogramas de dise\u00f1o representativos de la amenaza s\u00edsmica del \u00e1rea de estudio. En pr\u00f3ximos posts profundizaremos sobre este tema, pero es algo a tener presente.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-8e26794 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"8e26794\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-7c2ffa6\" data-id=\"7c2ffa6\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-f3c3a60 elementor-widget elementor-widget-heading\" data-id=\"f3c3a60\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Interpretaci\u00f3n f\u00edsica del espectro de respuesta s\u00edsmica<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-819b945 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"819b945\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-d5dd60f\" data-id=\"d5dd60f\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-4b0dda3 elementor-widget elementor-widget-text-editor\" data-id=\"4b0dda3\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Para poder comprender de forma simple el fen\u00f3meno f\u00edsico del espectro de respuesta, podemos suponer una ciudad con edificios de diferentes alturas, cada uno de los cuales tiene un per\u00edodo fundamental de vibraci\u00f3n determinado. Por ende, es posible representar dichos edificios mediante p\u00e9ndulos invertidos, que presenten sus mismos per\u00edodos. De esta manera, la ciudad quedar\u00eda representada por una serie de p\u00e9ndulos de diferentes per\u00edodos y masas.<\/p><p>\u00a0<\/p><p>Si se supone la acci\u00f3n de un sismo con un per\u00edodo predominante, teniendo en cuenta adem\u00e1s que cada p\u00e9ndulo posee un per\u00edodo propio de vibraci\u00f3n, el suelo excitar\u00e1 fuertemente a los p\u00e9ndulos que coincidan cerca de los per\u00edodos del suelo. Los otros p\u00e9ndulos se excitar\u00e1n poco, y algunos pasar\u00e1n el movimiento s\u00edsmico sin ser sensiblemente afectados.<\/p><p>\u00a0<\/p><p>Si se colocara un medidor de aceleraci\u00f3n en el centro de masa de cada p\u00e9ndulo, se encontrar\u00eda la amplificaci\u00f3n de la aceleraci\u00f3n que sufre dicho centro de masa con respecto a la aceleraci\u00f3n del suelo. Colocando estos valores de forma gr\u00e1fica, se llegar\u00eda a formar el espectro de respuesta.<\/p><p>\u00a0<\/p><p>La Figura 5 ilustra el razonamiento previo.<\/p><p>\u00a0<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-39d4c34 elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"39d4c34\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-3add8e9\" data-id=\"3add8e9\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-b6a921e elementor-widget elementor-widget-image\" data-id=\"b6a921e\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"image.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<img loading=\"lazy\" decoding=\"async\" width=\"254\" height=\"300\" src=\"https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/4-254x300.jpg\" class=\"attachment-medium size-medium wp-image-2221\" alt=\"\" srcset=\"https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/4-254x300.jpg 254w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/4-868x1024.jpg 868w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/4-768x906.jpg 768w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/4-10x12.jpg 10w, https:\/\/geo-webonline.com\/wp-content\/uploads\/2022\/07\/4.jpg 1088w\" sizes=\"(max-width: 254px) 100vw, 254px\" \/>\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-9f669f2 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"9f669f2\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-3c920c3\" data-id=\"3c920c3\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-9d1b247 elementor-widget elementor-widget-text-editor\" data-id=\"9d1b247\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><strong>Figura 5 <\/strong>Interpretaci\u00f3n simple del espectro de respuesta (<em>Fuente<\/em>: modificado de Zeevaert, 1995).<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-c8e95b9 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"c8e95b9\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-215fb74\" data-id=\"215fb74\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-f0516e3 elementor-widget elementor-widget-text-editor\" data-id=\"f0516e3\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>De lo anterior, resulta evidente que la respuesta de los edificios en una determinada regi\u00f3n donde \u00e9stos est\u00e1n construidos, depender\u00e1 tanto del per\u00edodo fundamental del suelo como del per\u00edodo propio de la estructura (Zeevaert, 1995).<\/p><p>\u00a0<\/p><p>Hasta aqu\u00ed este post sobre espectros de respuesta s\u00edsmica, que representan una suerte de intersecci\u00f3n entre la Ingenier\u00eda Geot\u00e9cnica y la Ingenier\u00eda Estructural. M\u00e1s adelante trataremos el tema de la amenaza s\u00edsmica, fundamental para analizar la respuesta s\u00edsmica del terreno en un \u00e1rea determinada.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-8121e36 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"8121e36\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-d21afac\" data-id=\"d21afac\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-6ec0647 elementor-widget elementor-widget-heading\" data-id=\"6ec0647\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Referencias<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-821ea14 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"821ea14\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-f4050c7\" data-id=\"f4050c7\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-86ebbfe elementor-widget elementor-widget-text-editor\" data-id=\"86ebbfe\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<ul><li>Boffi, G. (2018) <strong>\u201cEarthquake excitation\u201d<\/strong>. Politecnico di Milano. Available at <a href=\"https:\/\/boffi.github.io\/dati_2018\/10\/handout_e.pdf\">https:\/\/boffi.github.io\/dati_2018\/10\/handout_e.pdf<\/a><\/li><li>Grases, J. (1997) <strong>\u201cAcciones s\u00edsmicas, espectros de respuesta, peligrosidad y zonificaci\u00f3n\u201d<\/strong>. Publicado en el libro <em>Dise\u00f1o sismorresistente. Especificaciones y criterios empleados en Venezuela.<\/em> Academia de Ciencias F\u00edsicas, Matem\u00e1ticas y Naturales. Caracas, Venezuela.<\/li><li>Jim\u00e9nez Salas, A. (1980) <strong>\u201cGeotecnia y cimientos III\u201d<\/strong>. 2da. Edici\u00f3n, Editorial La Rueda. Madrid, Espa\u00f1a.<\/li><li>Newmark, N. y Rosenblueth, E. (1971) <strong>\u201cFundamentals for Earthquake Engineering\u201d<\/strong>. Prentice Hall. USA.<\/li><li>Wiegel, R. (1970) <strong>\u201cEarthquake Engineering\u201d<\/strong>, Prentice-Hall. Englewood Cliffs, New Jersey, USA.<\/li><li>Zeervaert, L. (1995) <strong>\u201cDise\u00f1o sismo-geodin\u00e1mico de cimentaciones\u201d<\/strong>. Facultad de Ingenier\u00eda de la UNAM, Divisi\u00f3n de Estudios de Post-grado. M\u00e9xico D. F., M\u00e9xico.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-2d019aa elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"2d019aa\" data-element_type=\"section\" data-e-type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-13cc149\" data-id=\"13cc149\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-9156f55 elementor-shape-circle elementor-grid-0 e-grid-align-center elementor-widget elementor-widget-social-icons\" data-id=\"9156f55\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"social-icons.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t<div class=\"elementor-social-icons-wrapper elementor-grid\" role=\"list\">\n\t\t\t\t\t\t\t<span class=\"elementor-grid-item\" role=\"listitem\">\n\t\t\t\t\t<a class=\"elementor-icon elementor-social-icon elementor-social-icon-facebook elementor-repeater-item-7da78dc\" href=\"https:\/\/www.facebook.com\/Geo-Web-100977118794652\" target=\"_blank\">\n\t\t\t\t\t\t<span class=\"elementor-screen-only\">Facebook<\/span>\n\t\t\t\t\t\t<i aria-hidden=\"true\" class=\"fab fa-facebook\"><\/i>\t\t\t\t\t<\/a>\n\t\t\t\t<\/span>\n\t\t\t\t\t\t\t<span class=\"elementor-grid-item\" role=\"listitem\">\n\t\t\t\t\t<a class=\"elementor-icon elementor-social-icon elementor-social-icon-twitter elementor-repeater-item-fe85f2d\" href=\"https:\/\/twitter.com\/geowebonline\" target=\"_blank\">\n\t\t\t\t\t\t<span class=\"elementor-screen-only\">Twitter<\/span>\n\t\t\t\t\t\t<i aria-hidden=\"true\" class=\"fab fa-twitter\"><\/i>\t\t\t\t\t<\/a>\n\t\t\t\t<\/span>\n\t\t\t\t\t\t\t<span class=\"elementor-grid-item\" role=\"listitem\">\n\t\t\t\t\t<a class=\"elementor-icon elementor-social-icon elementor-social-icon-instagram elementor-repeater-item-a21533a\" href=\"https:\/\/www.instagram.com\/geowebonline\/\" target=\"_blank\">\n\t\t\t\t\t\t<span class=\"elementor-screen-only\">Instagram<\/span>\n\t\t\t\t\t\t<i aria-hidden=\"true\" class=\"fab fa-instagram\"><\/i>\t\t\t\t\t<\/a>\n\t\t\t\t<\/span>\n\t\t\t\t\t\t\t<span class=\"elementor-grid-item\" role=\"listitem\">\n\t\t\t\t\t<a class=\"elementor-icon elementor-social-icon elementor-social-icon-linkedin elementor-repeater-item-8544528\" href=\"https:\/\/www.linkedin.com\/in\/alvaro-boiero-37bb4348\/\" target=\"_blank\">\n\t\t\t\t\t\t<span class=\"elementor-screen-only\">Linkedin<\/span>\n\t\t\t\t\t\t<i aria-hidden=\"true\" class=\"fab fa-linkedin\"><\/i>\t\t\t\t\t<\/a>\n\t\t\t\t<\/span>\n\t\t\t\t\t<\/div>\n\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-6e0e573 elementor-section-full_width elementor-section-height-default elementor-section-height-default\" data-id=\"6e0e573\" data-element_type=\"section\" data-e-type=\"section\" data-settings=\"{&quot;background_background&quot;:&quot;gradient&quot;}\">\n\t\t\t\t\t\t\t<div class=\"elementor-background-overlay\"><\/div>\n\t\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-d3ac85f\" data-id=\"d3ac85f\" data-element_type=\"column\" data-e-type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-27bfc53 elementor-widget elementor-widget-heading\" data-id=\"27bfc53\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">2024 - geo Todos los derechos reservados \/ Desarrollo web: lubercba<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<\/div>\n\t\t","protected":false},"excerpt":{"rendered":"<p>Facebook Twitter Instagram Linkedin Espectros de respuesta s\u00edsmica: la intersecci\u00f3n entre la ingenier\u00eda geot\u00e9cnica y el dise\u00f1o sismorresistente de estructuras El espectro de respuesta s\u00edsmica es una herramienta fundamental para llevar a cabo el dise\u00f1o sismorresistente de la mayor\u00eda de las estructuras. Sin embargo, el significado f\u00edsico del espectro de respuesta muchas veces es desconocido [&hellip;]<\/p>\n","protected":false},"author":1,"featured_media":0,"parent":0,"menu_order":0,"comment_status":"closed","ping_status":"closed","template":"","meta":{"footnotes":""},"class_list":["post-2203","page","type-page","status-publish","hentry"],"yoast_head":"<!-- This site is optimized with the Yoast SEO plugin v28.0 - https:\/\/yoast.com\/product\/yoast-seo-wordpress\/ -->\n<title>Espectros de respuesta s\u00edsmica: la intersecci\u00f3n entre la ingenier\u00eda geot\u00e9cnica y el dise\u00f1o sismorresistente de estructuras -<\/title>\n<meta name=\"robots\" content=\"index, follow, max-snippet:-1, max-image-preview:large, max-video-preview:-1\" \/>\n<link rel=\"canonical\" href=\"https:\/\/geo-webonline.com\/en\/espectros-de-respuesta-sismica-la-interseccion-entre-la-ingenieria-geotecnica-y-el-diseno-sismorresistente-de-estructuras\/\" \/>\n<meta property=\"og:locale\" content=\"en_US\" \/>\n<meta property=\"og:type\" content=\"article\" \/>\n<meta property=\"og:title\" content=\"Espectros de respuesta s\u00edsmica: la intersecci\u00f3n entre la ingenier\u00eda geot\u00e9cnica y el dise\u00f1o sismorresistente de estructuras -\" \/>\n<meta property=\"og:description\" content=\"Facebook Twitter Instagram Linkedin Espectros de respuesta s\u00edsmica: la intersecci\u00f3n entre la ingenier\u00eda geot\u00e9cnica y el dise\u00f1o sismorresistente de estructuras El espectro de respuesta s\u00edsmica es una herramienta fundamental para llevar a cabo el dise\u00f1o sismorresistente de la mayor\u00eda de las estructuras. 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