{"id":21371,"date":"2018-07-05T07:08:34","date_gmt":"2018-07-05T06:08:34","guid":{"rendered":"http:\/\/www.emiliosilveravazquez.com\/blog\/?p=21371"},"modified":"2018-07-05T07:08:34","modified_gmt":"2018-07-05T06:08:34","slug":"seguimos-con-einstein","status":"publish","type":"post","link":"http:\/\/www.emiliosilveravazquez.com\/blog\/2018\/07\/05\/seguimos-con-einstein\/","title":{"rendered":"Seguimos con Einstein"},"content":{"rendered":"<p style=\"text-align: justify;\"><a title=\"Noticias de Ciencia\" href=\"https:\/\/www.abc.es\/ciencia\/\">CIENCIA<\/a>-ABC<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/www.abc.es\/media\/ciencia\/2018\/07\/04\/174800-kUVE--620x349@abc.jpg\" alt=\"La investigaci\u00f3n se ha llevado a cabo en un sistema estelar triple situado a miles de a\u00f1os luz\" \/><\/p>\n<p style=\"text-align: justify;\">La investigaci\u00f3n se ha llevado a cabo en un sistema estelar triple situado a miles de a\u00f1os luz &#8211;\u00a0NRAO\/AUI\/NSF; S. Dagnello<\/p>\n<p style=\"text-align: justify;\">\n<h1 style=\"text-align: justify;\">La Relatividad de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> supera la prueba m\u00e1s extrema hecha hasta el momento<\/h1>\n<p>&nbsp;<\/p>\n<h2 style=\"text-align: justify;\">Un estudio ha confirmado que un <a href=\"#\" onclick=\"referencia('pulsar',event); return false;\">p\u00falsar<\/a> y una <a href=\"#\" onclick=\"referencia('enana blanca',event); return false;\">enana blanca<\/a> \u00abcaen\u00bb con la misma aceleraci\u00f3n en un mismo campo gravitatorio, lo que concuerda con los postulados del genio alem\u00e1n. Es la prueba m\u00e1s exigente del Principio de Equivalencia<\/h2>\n<p style=\"text-align: justify;\">\n<footer><\/footer>\n<footer><time datetime=\"2018-07-04T19:44:30Z\"><\/time><\/p>\n<aside><a title=\"Comentarios\" href=\"https:\/\/www.abc.es\/ciencia\/abci-relatividad-einstein-pasa-prueba-mas-exigente-hecha-hasta-ahora-201807042054_noticia.html#disqus_thread\" data-voc-comments-count=\"19fa2e24-7ecc-11e8-aba3-fa4d2264fe0e\" data-voc-comments-count-show-zero=\"false\">1<\/a><label for=\"capa_compartir\"><\/label><\/aside>\n<aside>\n<h4>NOTICIAS RELACIONADAS<\/h4>\n<p>&nbsp;<\/p>\n<ul>\n<li><a title=\"\u00abMuchos esperan que la Relatividad de Einstein falle en alg\u00fan momento\u00bb\" href=\"https:\/\/www.abc.es\/ciencia\/abci-muchos-esperan-relatividad-einstein-falle-algun-momento-201803251956_noticia.html#ns_campaign=mod-sugeridos&amp;ns_mchannel=relacionados&amp;ns_source=muchos-esperan-que-la-relatividad-de-einstein-falle-en-algun-momento&amp;ns_linkname=noticia.foto.ciencia&amp;ns_fee=pos-1\" data-voc-vtm-id=\"contenidorelacionado\">\u00abMuchos esperan que la Relatividad de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> falle en alg\u00fan momento\u00bb<\/a><\/li>\n<li><a title=\"\u00bfPor qu\u00e9 Einstein no pudo aceptar los agujeros negros?\" href=\"https:\/\/www.abc.es\/ciencia\/abci-einstein-no-pudo-entender-agujeros-negros-201606102209_noticia.html#ns_campaign=mod-sugeridos&amp;ns_mchannel=relacionados&amp;ns_source=por-que-einstein-no-pudo-aceptar-los-agujeros-negros&amp;ns_linkname=noticia.foto.ciencia&amp;ns_fee=pos-2\" data-voc-vtm-id=\"contenidorelacionado\">\u00bfPor qu\u00e9 <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> no pudo aceptar los <a href=\"#\" onclick=\"referencia('agujero negro',event); return false;\">agujeros negros<\/a>?<\/a><\/li>\n<li><a title=\"Einstein gana la batalla incluso en otra galaxia\" href=\"https:\/\/www.abc.es\/ciencia\/abci-einstein-gana-batalla-escalas-cosmologicas-201806230153_noticia.html#ns_campaign=mod-sugeridos&amp;ns_mchannel=relacionados&amp;ns_source=einstein-gana-la-batalla-incluso-en-otra-galaxia&amp;ns_linkname=noticia.foto.ciencia&amp;ns_fee=pos-3\" data-voc-vtm-id=\"contenidorelacionado\"><a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> gana la batalla incluso en otra galaxia<\/a><\/li>\n<\/ul>\n<div><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Resultado de imagen de Galileo experimento desde la torre de Pisa\" \/><\/div>\n<div>Galileo Galilei experiment\u00f3 desde la Torre de Pisa<\/div>\n<\/aside>\n<\/footer>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Si no hubiera aire ni rozamiento, y dej\u00e1ramos caer desde un mismo punto de un alto edificio una pluma y un gran yunque de hierro, ver\u00edamos algo curioso:\u00a0<strong>los dos llegar\u00edan al suelo exactamente en el mismo momento<\/strong>. Este concepto, incorporado en las leyes de la gravedad desde hace siglos, en la Teor\u00eda de la\u00a0<a href=\"https:\/\/www.abc.es\/ciencia\/abci-teoria-relatividad-einstein-necesaria-para-tele-o-no-perderse-201511242221_noticia.html\">Relatividad General de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a><\/a>\u00a0se traduce en el llamado<a href=\"https:\/\/es.wikipedia.org\/wiki\/Principio_de_equivalencia\" target=\"_blank\">Principio de Equivalencia<\/a>: seg\u00fan este, todos los cuerpos situados en un mismo campo gravitatorio \u00abcaen\u00bb con la misma aceleraci\u00f3n, con independencia de su masa y de su composici\u00f3n.<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Resultado de imagen de El P\u00c3\u00balsar PSR J0337+1715\" \/><\/p>\n<p style=\"text-align: justify;\">Un pulsar rapido (periodo de milisegundo) a la izquierda, alrededor del cual orbita una estrella <a href=\"#\" onclick=\"referencia('enana blanca',event); return false;\">enana blanca<\/a> caliente (en el centro), y una m\u00e1s fr\u00eda (en el fondo). Cr\u00e9dito de la im\u00e1gen: Bill Saxton; NRAO\/AUI\/NSF<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Resultado de imagen de El P\u00c3\u00balsar PSR J0337+1715\" \/><\/p>\n<p style=\"text-align: justify;\">This image shows the pulsar PSR J0337+1715. Image credit: Ransom SM et<\/p>\n<p style=\"text-align: justify;\">Esta teor\u00eda ha pasado varias pruebas en la Tierra, pero este mi\u00e9rcoles, un estudio publicado en\u00a0<a href=\"https:\/\/www.nature.com\/articles\/s41586-018-0265-1\" target=\"_blank\">Nature<\/a>\u00a0ha llevado a cabo la prueba m\u00e1s exigente de este principio hasta la fecha, y esta vez lejos de nuestro planeta. Un equipo internacional de astr\u00f3nomos\u00a0<strong>ha confirmado a validez de la Teor\u00eda General de la Relatividad en una estrella triple<\/strong>, llamada\u00a0<a href=\"https:\/\/en.wikipedia.org\/wiki\/PSR_J0337%2B1715\" target=\"_blank\">PSR J0337+1715<\/a>, y situada a 4.200 a\u00f1os luz. Los cient\u00edficos han confirmado que la aceleraci\u00f3n de los tres miembros de este sistema, dos estrellas enanas blancas y un <a href=\"#\" onclick=\"referencia('pulsar',event); return false;\">p\u00falsar<\/a>, es id\u00e9ntica, al menos de acuerdo con la sensibilidad de los instrumentos usados.<\/p>\n<p style=\"text-align: justify;\">\u00abLa mayor\u00eda de las teor\u00edas de gravedad alternativas a la Relatividad General predicen que el <a href=\"#\" onclick=\"referencia('pulsar',event); return false;\">p\u00falsar<\/a> deber\u00eda caer de forma diferente\u00bb, ha explicado a ABC\u00a0<strong>Anne Archibald<\/strong>, investigadora en la Universidad de \u00c1msterdam (Holanda) y autora principal del estudio. \u00abPero nosotros hemos confirmado que no es as\u00ed\u00bb.<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/3.bp.blogspot.com\/-OE1UNiXIYy8\/WiMoViq5fmI\/AAAAAAAACAA\/GAqJXSlm6SQm8MXUj8QKiotYF6Q460G1wCLcBGAs\/s1600\/principio%2Bequivalncia.jpg\" alt=\"Resultado de imagen de El Principio de equivalencia\" \/><\/p>\n<p style=\"text-align: justify;\">La idea del Principio de Equivalencia y de la misma aceleraci\u00f3n de todos los cuerpos situados en un campo gravitatorio, con independencia de su composici\u00f3n y masa, fue explorada por Galileo y asentada con las leyes de <a href=\"#\" onclick=\"referencia('newton',event); return false;\">Newton<\/a>. Con la Relatividad, los cient\u00edficos consiguieron el aparato matem\u00e1tico necesario para expresar este fen\u00f3meno.<\/p>\n<h3 style=\"text-align: justify;\">\u00bfY qu\u00e9 pasa cuando la gravedad es extrema?<\/h3>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" src=\"https:\/\/endimages.s3.amazonaws.com\/cache\/69\/fa\/69fa77639c6fc74f8a8194dd9d16829e.jpg\" alt=\"Resultado de imagen de Estrella de neutrones pulsante\" \/><\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Aunque hasta ahora las pruebas hechas han confirmado estos principios, existen teor\u00edas alternativas de gravedad que, desde luego, no afectar\u00edan a un yunque o a una pluma. Sin embargo, s\u00ed que afectar\u00edan a las gravedades extremas, como las originadas por un objeto tan compacto y masivo como un p\u00falsar:\u00a0<a href=\"https:\/\/www.abc.es\/ciencia\/abci-muchos-esperan-relatividad-einstein-falle-algun-momento-201803251956_noticia.html\">una estrella de <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> extraordinariamente comprimida<\/a>\u00a0que gira a gran velocidad y emite potentes chorros de energ\u00eda. Seg\u00fan estas teor\u00edas,\u00a0<strong>la energ\u00eda gravitatoria que mantiene cohesionada la materia\u00a0<\/strong>que forma algo tan \u00abpesado\u00bb como un p\u00falsar<strong>\u00a0deber\u00eda influir en su aceleraci\u00f3n<\/strong>\u00a0en un campo gravitatorio. Por eso, su aceleraci\u00f3n y su ca\u00edda no ser\u00eda id\u00e9ntica a la de objetos menos masivos.<\/p>\n<p style=\"text-align: justify;\">\u00bfQu\u00e9 supondr\u00eda esto en el sistema triple de terrible nombre PSR J0337+1715? Dicho sistema est\u00e1 compuesto por una pareja, constituida por una estrella de <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> en una \u00f3rbita de 1,6 d\u00edas de duraci\u00f3n en torno a una estrella <a href=\"#\" onclick=\"referencia('enana blanca',event); return false;\">enana blanca<\/a>, y una tercera en discordia: otra estrella <a href=\"#\" onclick=\"referencia('enana blanca',event); return false;\">enana blanca<\/a> situada en la distancia y que completa una vuelta completa en torno al d\u00fao en 327 d\u00edas.<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/www.abc.es\/media\/ciencia\/2018\/07\/04\/orbit-one-massive-kUVE--510x349@abc.png\" alt=\"En rojo, efecto de desplazamiento de la \u00f3rbita del p\u00falsar hacia la enana blanca externa y que no se ha observado en este caso, validando el Principio de Equivalencia de la Relatividad\" data-src=\"https:\/\/www.abc.es\/media\/ciencia\/2018\/07\/04\/orbit-one-massive-kUVE--510x349@abc.png\" data-was-processed=\"true\" \/><\/p>\n<p style=\"text-align: justify;\">En rojo, efecto de desplazamiento de la \u00f3rbita del <a href=\"#\" onclick=\"referencia('pulsar',event); return false;\">p\u00falsar<\/a> hacia la <a href=\"#\" onclick=\"referencia('enana blanca',event); return false;\">enana blanca<\/a> externa y que no se ha observado en este caso, validando el Principio de Equivalencia de la Relatividad &#8211;\u00a0Cortes\u00eda de Anne Archibald<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\u00ab<strong>Seg\u00fan las teor\u00edas alternativas, la \u00f3rbita del <a href=\"#\" onclick=\"referencia('pulsar',event); return false;\">p\u00falsar<\/a> deber\u00eda estar ligeramente desplazada<\/strong>\u00a0del centro, y desviada hacia la compa\u00f1era del exterior, siguiendo su trayectoria\u00bb, ha explicado Archibald.\u00a0<strong>Pero no es as\u00ed<\/strong>.<\/p>\n<h3 style=\"text-align: justify;\">Observando al p\u00falsar<\/h3>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" src=\"https:\/\/ugc.kn3.net\/i\/origin\/http:\/\/4.bp.blogspot.com\/_cZniPzvJ8Ig\/TFLdzmgdhsI\/AAAAAAAAADs\/8Dq81G4fSjc\/s1600\/Pulsar.jpg\" alt=\"Resultado de imagen de P\u00c3\u00balsares binarios\" \/><\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">En 2011, el Telescopio de Green Bank (situado en Estados Unidos) descubri\u00f3 este sistema estelar y comenz\u00f3 a investigarlo de forma continuada. Gracias a este y otros potentes radiotelescopios, como el de Arecibo (Puerto Rico) o el Radio Telescopio Westerbork Synthesis (Holanda), los astr\u00f3nomos han recopilado cientos de horas de observaci\u00f3n con los movimientos de cada uno de los objetos de esta estrella triple.<\/p>\n<p style=\"text-align: justify;\">Todo gracias a que\u00a0<strong>la estrella de <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> gira sobre s\u00ed misma unas 366 veces cada segundo<\/strong>\u00a0y que hace llegar pulsos a la Tierra de una forma peri\u00f3dica. \u00abHemos podido contar cada pulso de la estrella de <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> desde que comenzamos la investigaci\u00f3n\u00bb, ha dicho Archibald. El resultado es que los astr\u00f3nomos han logrado alcanzar una precisi\u00f3n de cientos de metros a la hora de estimar la posici\u00f3n de un objeto de unas dos decenas de kil\u00f3metros de di\u00e1metro y situado a 4.200 a\u00f1os luz de distancia.<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/www.abc.es\/media\/ciencia\/2018\/07\/04\/174472_web-U30834880027AuC--510x349@abc.jpg\" alt=\"Radio Telescopio Westerbork Synthesis (Holanda)\" data-src=\"https:\/\/www.abc.es\/media\/ciencia\/2018\/07\/04\/174472_web-U30834880027AuC--510x349@abc.jpg\" data-was-processed=\"true\" \/><\/p>\n<p style=\"text-align: justify;\">Radio Telescopio Westerbork Synthesis (Holanda) &#8211;\u00a0ASTRON<\/p>\n<p style=\"text-align: justify;\">\n<blockquote>\n<p style=\"text-align: justify;\">\u00abMe hubiera sorprendido que la teor\u00eda de la Relatividad de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> hubiera fallado esta prueba\u00bb, ha reconocido Anne Archibald. \u00abPero podr\u00eda haber ocurrido:\u00a0<strong>nuestra prueba es m\u00e1s sensible que cualquiera otra hecha hasta ahora<\/strong>, as\u00ed que nadie hab\u00eda comprobado que la teor\u00eda de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> funcionaba hasta este l\u00edmite antes\u00bb.<\/p>\n<p style=\"text-align: justify;\">\n<\/blockquote>\n<h3 style=\"text-align: justify;\">El mundo de la masa enormemente compactada<\/h3>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Resultado de imagen de P\u00c3\u00balsar y enana blanca\" \/><\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Los astr\u00f3nomos no han detectado ninguna diferencia entre la aceleraci\u00f3n del <a href=\"#\" onclick=\"referencia('pulsar',event); return false;\">p\u00falsar<\/a> y la <a href=\"#\" onclick=\"referencia('enana blanca',event); return false;\">enana blanca<\/a> externa, pero sus medidas no son perfectas. Sin embargo, la mayor discordancia posible entre ambas aceleraciones, a la luz de la precisi\u00f3n de los instrumentos, ser\u00eda<strong>\u00a0como m\u00e1ximo de 2,6 partes por mill\u00f3n<\/strong>, diez veces inferior a la que podr\u00edan haber pasado por alto ex\u00e1menes anteriores.<\/p>\n<p style=\"text-align: justify;\">Tal como ha explicado a ABC\u00a0<strong>Clifford Will<\/strong>, autor de un comentario publicado en Nature sobre la investigaci\u00f3n de Archibald y cient\u00edfico en la Universidad de Florida (EE.UU.), hasta ahora la prueba m\u00e1s precisa era una que hab\u00eda medido \u00abla igualdad de la aceleraci\u00f3n de la Tierra y la Luna hacia el Sol, por medio de un l\u00e1ser\u00bb. Ahora, los astr\u00f3nomos se han fijado en un sistema mucho m\u00e1s distante pero mucho m\u00e1s masivo, lo que permite<strong>\u00a0poner a prueba la Relatividad en el mundo de las masas enormemente compactadas<\/strong>.<\/p>\n<p style=\"text-align: justify;\">Esto es importante, tal como explica Will, porque las teor\u00edas alternativas de la gravedad, que sugieren que la aceleraci\u00f3n de objetos muy masivos no es la misma que la de cuerpos menos masivos, se basa en un curioso fen\u00f3meno que depende de la energ\u00eda gravitacional que mantiene cohesionados estos objetos.<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Resultado de imagen de P\u00c3\u00balsar y enana blanca\" \/><\/p>\n<p style=\"text-align: justify;\">Seg\u00fan ha explicado este investigador, lo que ocurre, seg\u00fan teor\u00edas como la\u00a0<a href=\"https:\/\/www.abc.es\/ciencia\/abci-teoria-relatividad-einstein-necesaria-para-tele-o-no-perderse-201511242221_noticia.html\">Relatividad<\/a>, es que no solo la masa de un cuerpo interacciona con la gravedad, sino que\u00a0<strong>su propia gravedad interacciona con ella misma<\/strong>. \u00ab\u00bfSe relaciona la gravedad de cuerpos como la Tierra o una estrella de <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> con la gravedad de un cuerpo externo, igual que con sus propios \u00e1tomos? La Relatividad dice que s\u00ed, pero otras teor\u00edas dicen que no. Por eso es tan importante hacer estas pruebas\u00bb, ha argumentado el investigador.<\/p>\n<p style=\"text-align: justify;\">En la Tierra este efecto de supuesta desviaci\u00f3n ser\u00eda peque\u00f1o, pero en una estrella de <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a>, tan extremadamente compactada, ser\u00eda mucho m\u00e1s importante.<\/p>\n<p style=\"text-align: justify;\">Los autores del estudio ya han comentado que<strong>\u00a0seguir\u00e1n buscando lugares donde poner a prueba la Relatividad General de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a><\/strong>, y en concreto el Principio de Equivalencia. Tal como han explicado, la b\u00fasqueda para aprender sobre las \u00faltimas fronteras del Universo continuar\u00e1. 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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>CIENCIA-ABC La investigaci\u00f3n se ha llevado a cabo en un sistema estelar triple situado a miles de a\u00f1os luz &#8211;\u00a0NRAO\/AUI\/NSF; S. Dagnello La Relatividad de Einstein supera la prueba m\u00e1s extrema hecha hasta el momento &nbsp; Un estudio ha confirmado que un p\u00falsar y una enana blanca \u00abcaen\u00bb con la misma aceleraci\u00f3n en un mismo [&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":[153],"tags":[],"_links":{"self":[{"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/21371"}],"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=21371"}],"version-history":[{"count":0,"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/21371\/revisions"}],"wp:attachment":[{"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/media?parent=21371"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/categories?post=21371"},{"taxonomy":"post_tag","embeddable":true,"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/tags?post=21371"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}