{"id":23970,"date":"2019-07-11T04:38:33","date_gmt":"2019-07-11T03:38:33","guid":{"rendered":"http:\/\/www.emiliosilveravazquez.com\/blog\/?p=23970"},"modified":"2019-07-11T04:38:33","modified_gmt":"2019-07-11T03:38:33","slug":"nuevas-ideas-sobre-el-universo","status":"publish","type":"post","link":"http:\/\/www.emiliosilveravazquez.com\/blog\/2019\/07\/11\/nuevas-ideas-sobre-el-universo\/","title":{"rendered":"Nuevas ideas sobre el Universo"},"content":{"rendered":"<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/static1.abc.es\/media\/ciencia\/2019\/07\/09\/teoria-camaleon-kSrB--620x349@abc.jpg\" alt=\"Imagen de una galaxia generada por ordenador\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0Imagen de una galaxia generada por ordenador &#8211;\u00a0Universidad de Durham<\/p>\n<p style=\"text-align: justify;\"><strong>La teor\u00eda del camale\u00f3n_ otras leyes rigen el Universo m\u00e1s all\u00e1 de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a>. Sugieren una alternativa a la <a href=\"#\" onclick=\"referencia('relatividad',event); return false;\">relatividad<\/a> general para entender como funciona la Gravedad y como se forman las galaxias<\/strong><\/p>\n<h1 style=\"text-align: justify;\"><\/h1>\n<h2 style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/www.almaobservatory.org\/wp-content\/uploads\/2016\/05\/17-880x350.jpg\" alt=\"Resultado de imagen de Formaci\u00c3\u00b3n de galaxias\" \/><\/h2>\n<p>Formaci\u00f3n de galaxias tempranas<\/p>\n<p style=\"text-align: justify;\">\n<footer><a title=\"ABC Ciencia\">ABC Ciencia<\/a><\/footer>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">\n<aside><label for=\"capa_compartir\"><\/label><\/aside>\n<aside>\n<h4>NOTICIAS RELACIONADAS<\/h4>\n<p>&nbsp;<\/p>\n<ul>\n<li><a title=\"As\u00ed lo hemos contado: Publicada la primera imagen de un agujero negro de la Historia\" href=\"https:\/\/www.abc.es\/ciencia\/abci-agujero-negro-directo-maxima-expectacion-primera-foto-agujero-negro-201904101247_directo.html#vca=mod-sugeridos-p1&amp;vmc=relacionados&amp;vso=asi-lo-hemos-contado-publicada-la-primera-imagen-de-un-agujero-negro-de-la-historia&amp;vli=noticia.foto.ciencia\" data-voc-vtm-id=\"contenidorelacionado\">As\u00ed lo hemos contado: Publicada la primera imagen de un <a href=\"#\" onclick=\"referencia('agujero negro',event); return false;\">agujero negro<\/a> de la Historia<\/a><\/li>\n<li><a title=\"\u00abVer el horizonte de sucesos de un agujero negro podr\u00eda poner a prueba la Relatividad\u00bb\" href=\"https:\/\/www.abc.es\/ciencia\/abci-astronomo-telescopio-horizonte-sucesos-podria-poner-prueba-teoria-relatividad-201702272154_noticia.html#vca=mod-sugeridos-p2&amp;vmc=relacionados&amp;vso=ver-el-horizonte-de-sucesos-de-un-agujero-negro-podria-poner-a-prueba-la-relatividad&amp;vli=noticia.foto.ciencia\" data-voc-vtm-id=\"contenidorelacionado\">\u00abVer el horizonte de sucesos de un <a href=\"#\" onclick=\"referencia('agujero negro',event); return false;\">agujero negro<\/a> podr\u00eda poner a prueba la Relatividad\u00bb<\/a><\/li>\n<li><a title=\"Stacy McGaugh: \u00abLa materia oscura pierde por goleada ante el principio de la navaja de Occam\u00bb\" href=\"https:\/\/www.abc.es\/ciencia\/abci-stacy-mcgaugh-materia-oscura-pierde-goleada-ante-principio-navaja-occam-201711270345_noticia.html#vca=mod-sugeridos-p3&amp;vmc=relacionados&amp;vso=stacy-mcgaugh-la-materia-oscura-pierde-por-goleada-ante-el-principio-de-la-navaja-de-occam&amp;vli=noticia.foto.ciencia\" data-voc-vtm-id=\"contenidorelacionado\">Stacy McGaugh: \u00abLa <a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a> pierde por goleada ante el principio de la navaja de Occam\u00bb<\/a><\/li>\n<\/ul>\n<div><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Resultado de imagen de La Teor\u00c3\u00ada de la Relatividad\" \/><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Resultado de imagen de La Teor\u00c3\u00ada de la Relatividad\" \/><\/div>\n<\/aside>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">La\u00a0<a href=\"https:\/\/www.abc.es\/ciencia\/abci-teoria-relatividad-einstein-necesaria-para-tele-o-no-perderse-201511242221_noticia.html\">Teor\u00eda de la Relatividad General\u00a0<\/a>fue desarrollada por\u00a0<strong><a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a><\/strong>\u00a0a principios del siglo XX para explicar c\u00f3mo la gravedad pod\u00eda deformar el espacio-tiempo. Mundialmente famosa, sus postulados tuvieron consecuencias en la comprensi\u00f3n de\u00a0<a href=\"https:\/\/www.abc.es\/ciencia\/abci-hubble-confirma-universo-expande-mas-rapido-creia-201904260126_noticia.html\">la expansi\u00f3n acelerada del Universo<\/a>, que se cree impulsada por una misteriosa sustancia llamada\u00a0<a href=\"https:\/\/www.abc.es\/ciencia\/abci-sorpresa-poder-energia-oscura-aumenta-medida-universo-envejece-201901302052_noticia.html\">energ\u00eda oscura<\/a>. Adem\u00e1s, ha sido probada y confirmada una y otra vez, la m\u00e1s reciente y espectacular con la\u00a0<a href=\"https:\/\/www.abc.es\/ciencia\/abci-primera-historia-tenemos-imagen-agujero-negro-201904101833_noticia.html\">primera imagen directa de un <a href=\"#\" onclick=\"referencia('agujero negro',event); return false;\">agujero negro<\/a>.<\/a><\/p>\n<p style=\"text-align: justify;\">Ahora, f\u00edsicos de la Universidad de Durham (Reino Unido) dicen que es posible que esa no sea la \u00fanica forma de explicar c\u00f3mo funciona la gravedad y c\u00f3mo se forman las galaxias. En un estudio publicado en la revista<a href=\"https:\/\/www.nature.com\/articles\/s41550-019-0823-y\">\u00abNature Astronomy\u00bb<\/a>, proponen un modelo alternativo a partir de la llamada<strong>\u00a0Teor\u00eda del Camale\u00f3n<\/strong>, que dice que\u00a0<strong>la gravedad puede cambiar de comportamiento en relaci\u00f3n con el entorno<\/strong>. Esto, advierten,\u00a0<strong>no significa que <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> estuviera equivocado<\/strong>, sino que quiz\u00e1s haya m\u00e1s de una manera de explicar las cosas.<\/p>\n<p style=\"text-align: justify;\">Los investigadores crearon enormes simulaciones por supercomputaci\u00f3n de las fuerzas que rigen el cosmos para probar la teor\u00eda alternativa para la gravedad, tambi\u00e9n conocida como\u00a0<strong>Gravedad f(R)<\/strong>. Los resultados muestran que esas condiciones, con una gravedad diferente, tambi\u00e9n permiten formar galaxias espirales como nuestra V\u00eda L\u00e1ctea.<\/p>\n<p style=\"text-align: justify;\">\n<aside>\n<div id=\"google_ads_iframe_\/4900\/vocento.abc\/ciencia_5__container__\"><iframe id=\"google_ads_iframe_\/4900\/vocento.abc\/ciencia_5\" title=\"3rd party ad content\" name=\"google_ads_iframe_\/4900\/vocento.abc\/ciencia_5\" frameborder=\"0\" marginwidth=\"0\" marginheight=\"0\" scrolling=\"no\" width=\"1\" height=\"1\" data-google-container-id=\"a\" data-load-complete=\"true\"><\/iframe><\/div>\n<\/aside>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<h3 style=\"text-align: justify;\">A gran escala<\/h3>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" src=\"http:\/\/hyperphysics.phy-astr.gsu.edu\/hbasees\/imgmec\/orvl.gif\" alt=\"Imagen relacionada\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Los cient\u00edficos ya sab\u00edan que la Gravedad f(R) pod\u00eda demostrar la evoluci\u00f3n de nuestro Sistema Solar, pero la nueva investigaci\u00f3n muestra que esta teor\u00eda tambi\u00e9n se puede ir m\u00e1s all\u00e1 y aplicar a la formaci\u00f3n de galaxias a escalas cosmol\u00f3gicas muy grandes. Seg\u00fan los autores, modelos como este pueden reproducir el r\u00e1pido crecimiento del Universo e incluso ser un peque\u00f1o paso para identificar qu\u00e9 es la energ\u00eda oscura, algo que trae de cabeza a la comunidad cient\u00edfica.<\/p>\n<p style=\"text-align: justify;\">\u00abLa Teor\u00eda del Camale\u00f3n permite modificar las leyes de la gravedad para que podamos probar el efecto de los cambios en la gravedad en la formaci\u00f3n de galaxias. A trav\u00e9s de nuestras simulaciones, hemos demostrado por primera vez que incluso si cambia la gravedad, esto no evitar\u00e1 que se formen galaxias de disco con brazos en espiral\u00bb, afirma Christian Arnold, responsable del estudio.<\/p>\n<h3 style=\"text-align: justify;\">Sin negar al genio<\/h3>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" 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\" alt=\"Resultado de imagen de Teor\u00c3\u00ada del Camale\u00c3\u00b3n\" \/><\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Como explican los investigadores, sus resultados no niegan a\u00a0<a href=\"https:\/\/www.abc.es\/ciencia\/abci-albert-einstein-genio-hombros-rayo-201807030220_noticia.html\"><a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a><\/a>, sino que muestran que podr\u00eda haber m\u00e1s de una manera de explicar el papel de la gravedad en la evoluci\u00f3n del universo. La <a href=\"#\" onclick=\"referencia('relatividad',event); return false;\">relatividad<\/a> general es un \u00e9xito que a efectos pr\u00e1cticos nos permite, entre otros avances, consultar el GPS.<\/p>\n<p style=\"text-align: justify;\">Por el momento, la<strong>\u00a0Teor\u00eda del Camale\u00f3n\u00a0<\/strong>se reduce al campo de lo te\u00f3rico. Quiz\u00e1s un d\u00eda pueda confirmarse mediante observaciones, como tambi\u00e9n lo fue la de\u00a0<a href=\"https:\/\/www.abc.es\/ciencia\/abci-cien-anos-eclipse-razon-einstein-y-convirtio-estrella-201905291408_noticia.html\">la <a href=\"#\" onclick=\"referencia('relatividad',event); return false;\">relatividad<\/a> general de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a>\u00a0<\/a>por primera vez durante un eclipse solar total de 1919. De ser as\u00ed, cambiar\u00eda todo lo que sabemos sobre la evoluci\u00f3n del Universo y la astrof\u00edsica dar\u00eda un salto hist\u00f3rico.<\/p>\n<div class='bookmark'>\r\n\t\t<table align='left' border='0' cellpadding='0' width='100%'>\r\n\t\t<tr><td><span class='pushbutton'><a href='http:\/\/delicious.com\/post?url=http%3A%2F%2Fwww.emiliosilveravazquez.com%2Fblog%2F2019%2F07%2F11%2Fnuevas-ideas-sobre-el-universo%2F&amp;title=Nuevas+ideas+sobre+el+Universo' title='Delicious' target='_blank' rel='nofollow'><img src='http:\/\/www.emiliosilveravazquez.com\/blog\/wp-content\/plugins\/knxdt-bookmarks-wordpress-plugin\/images\/delicious.png'  alt='' class='book_img' border='none' style='margin:1px; padding: 0;'  \/><\/a><\/span><span class='pushbutton'><a href='http:\/\/digg.com\/submit?url=http%3A%2F%2Fwww.emiliosilveravazquez.com%2Fblog%2F2019%2F07%2F11%2Fnuevas-ideas-sobre-el-universo%2F&amp;title=Nuevas+ideas+sobre+el+Universo' title='Digg' target='_blank' rel='nofollow'><img src='http:\/\/www.emiliosilveravazquez.com\/blog\/wp-content\/plugins\/knxdt-bookmarks-wordpress-plugin\/images\/digg.png'  alt='' class='book_img' border='none' style='margin:1px; 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padding-left: 5px;'><a href='http:\/\/wordpress.org\/extend\/plugins\/knxdt-bookmarks-wordpress-plugin\/' title='Plugin' rel='nofollow' target='_blank'>[?]<\/a><\/span><\/td><\/tr><\/table><br\/><br\/><\/div>","protected":false},"excerpt":{"rendered":"<p>\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0Imagen de una galaxia generada por ordenador &#8211;\u00a0Universidad de Durham La teor\u00eda del camale\u00f3n_ otras leyes rigen el Universo m\u00e1s all\u00e1 de Einstein. Sugieren una alternativa a la relatividad general para entender como funciona la Gravedad y como se forman las galaxias Formaci\u00f3n de galaxias tempranas ABC Ciencia [&hellip;]<\/p>\n","protected":false},"author":2,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_s2mail":"yes","footnotes":""},"categories":[321],"tags":[],"_links":{"self":[{"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/23970"}],"collection":[{"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/users\/2"}],"replies":[{"embeddable":true,"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/comments?post=23970"}],"version-history":[{"count":0,"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/23970\/revisions"}],"wp:attachment":[{"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/media?parent=23970"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/categories?post=23970"},{"taxonomy":"post_tag","embeddable":true,"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/tags?post=23970"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}