{"id":26281,"date":"2025-06-21T06:45:27","date_gmt":"2025-06-21T05:45:27","guid":{"rendered":"http:\/\/www.emiliosilveravazquez.com\/blog\/?p=26281"},"modified":"2025-06-21T06:46:48","modified_gmt":"2025-06-21T05:46:48","slug":"enganosa-perfeccion-la-del-modelo-estandar","status":"publish","type":"post","link":"http:\/\/www.emiliosilveravazquez.com\/blog\/2025\/06\/21\/enganosa-perfeccion-la-del-modelo-estandar\/","title":{"rendered":"Enga\u00f1osa perfecci\u00f3n la del Modelo Est\u00e1ndar"},"content":{"rendered":"<blockquote>\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"Un vistazo r\u00e1pido al Modelo Est\u00e1ndar de F\u00edsica de Part\u00edculas | Acelerando la Ciencia\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcSJg0JknjCnWXlS1TJTqdMk3Q89hCTkISDsFQ&amp;usqp=CAU\" alt=\"Interacciones Del Modelo Est\u00e1ndar De La F\u00edsica De Particulas - Standard Model, HD Png Download - vhv\" \/><\/p>\n<\/blockquote>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Familias de Leptones y Quarks (que en tripletes forman los Hadrones), que son Fermiones, y, por otra parte, las llamadas part\u00edculas de fuerza, los Bosones que son las emisarias de las cuatro fuerzas fundamentales, ese es, el Modelo Est\u00e1ndar de la F\u00edsica de part\u00edculas.<\/p>\n<p>&nbsp;<\/p>\n<p><iframe loading=\"lazy\" title=\"El Modelo Est\u00e1ndar de F\u00edsica de Part\u00edculas\" width=\"500\" height=\"281\" src=\"https:\/\/www.youtube.com\/embed\/NMXgIFpSst8?feature=oembed\" frameborder=\"0\" allow=\"accelerometer; autoplay; clipboard-write; encrypted-media; gyroscope; picture-in-picture; web-share\" referrerpolicy=\"strict-origin-when-cross-origin\" allowfullscreen><\/iframe><\/p>\n<p style=\"text-align: justify;\"><b>El Modelo Est\u00e1ndar<\/b>\u00a0considera que las\u00a0<b>part\u00edculas<\/b> elementales son entes reductibles y cuantos cuya cinem\u00e1tica est\u00e1 regida por las cuatro interacciones fundamentales conocidas, excepto la gravedad, que no encaja en los\u00a0<b>modelos<\/b> matem\u00e1ticos del mundo cu\u00e1ntico.<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/upload.wikimedia.org\/wikipedia\/commons\/thumb\/1\/1e\/Modelo_standard_particulas_subat%C3%B3micas.png\/300px-Modelo_standard_particulas_subat%C3%B3micas.png\" alt=\"\" \/><img decoding=\"async\" loading=\"lazy\" class=\"\" 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\" alt=\"FUERZAS... - Astronom\u00eda - Odisea por el Universo y el Cosmos | Facebook\" width=\"364\" height=\"244\" \/><\/p>\n<blockquote><p>&nbsp;<\/p>\n<p style=\"text-align: justify;\"><strong>&#8220;El modelo est\u00e1ndar de la f\u00edsica de part\u00edculas<\/strong>\u00a0es una teor\u00eda relativista de campos cu\u00e1nticos desarrollada entre 1970 y 1973 basada en las ideas de la unificaci\u00f3n y simetr\u00edas\u200b que describe la estructura fundamental de la materia y el vac\u00edo considerando las\u00a0<strong>part\u00edculas<\/strong>\u00a0elementales como entes irreducibles cuya cinem\u00e1tica\u00a0est\u00e1 regida por las cuatro\u00a0<a title=\"Interacciones fundamentales\" href=\"https:\/\/es.wikipedia.org\/wiki\/Interacciones_fundamentales\">interacciones fundamentales<\/a>\u00a0conocidas (exceptuando la gravedad, cuya principal teor\u00eda, la\u00a0<a title=\"Relatividad general\" href=\"https:\/\/es.wikipedia.org\/wiki\/Relatividad_general\"><a href=\"#\" onclick=\"referencia('relatividad',event); return false;\">relatividad<\/a> general<\/a>, no encaja con los modelos matem\u00e1ticos del mundo cu\u00e1ntico). La palabra &#8220;modelo&#8221; en el nombre viene de la d\u00e9cada de 1970 cuando no hab\u00eda suficiente evidencia experimental que confirmara el modelo.<sup id=\"cite_ref-:0_1-1\"><a href=\"https:\/\/es.wikipedia.org\/wiki\/Modelo_est%C3%A1ndar_de_la_f%C3%ADsica_de_part%C3%ADculas#cite_note-:0-1\">1<\/a><\/sup>\u200b Hasta la fecha, casi todas las pruebas experimentales de las tres fuerzas descritas por el modelo est\u00e1ndar est\u00e1n de acuerdo con sus predicciones. Sin embargo el modelo est\u00e1ndar no alcanza a ser una teor\u00eda completa de las interacciones fundamentales debido a\u00a0<a href=\"https:\/\/es.wikipedia.org\/wiki\/Modelo_est%C3%A1ndar_de_la_f%C3%ADsica_de_part%C3%ADculas#Insuficiencias_del_modelo_est%C3%A1ndar\">varias cuestiones sin resolver<\/a>.&#8221;<\/p>\n<\/blockquote>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" src=\"https:\/\/i.ytimg.com\/vi\/YlhR9Bzbfys\/sddefault.jpg\" alt=\"EL MODELO EST\u00c1NDAR DE LA F\u00cdSICA DE PART\u00cdCULAS, Ciencias Para Todo con Jaume Campos\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">El modelo est\u00e1ndar es una poderosa herramienta pero no cumple todas las expectativas; no es un modelo perfecto. En primer lugar, podr\u00edamos empezar por criticar que el modelo tiene casi veinte constantes que no se pueden calcular. Desde luego, se han sugerido numerosas ideas para explicar el origen de todos estos par\u00e1metros o n\u00fameros inexplicables y sus valores, pero el problema de todas estas teor\u00edas es que los argumentos que dan nunca han sido enteramente convincentes. \u00bfPor qu\u00e9 se iba a preocupar la naturaleza de una f\u00f3rmula m\u00e1gica si en ausencia de tal f\u00f3rmula no hubiera contradicciones? Lo que realmente necesitamos es alg\u00fan principio fundamental nuevo, tal como el principio de la <a href=\"#\" onclick=\"referencia('relatividad',event); return false;\">relatividad<\/a>, pero no queremos abandonar todos los dem\u00e1s principios que ya conocemos. \u00c9sos, despu\u00e9s de todo, han sido enormemente \u00fatiles en el descubrimiento del modelo est\u00e1ndar. El mejor lugar para buscar un nuevo principio es precisamente donde se encuentran los puntos d\u00e9biles de la presente teor\u00eda.<\/p>\n<p>&nbsp;<\/p>\n<p><iframe loading=\"lazy\" title=\"Colisiones de protones en el LHC y su sistema de aceleradores\" width=\"500\" height=\"281\" src=\"https:\/\/www.youtube.com\/embed\/WfzOI17JYEY?feature=oembed\" frameborder=\"0\" allow=\"accelerometer; autoplay; clipboard-write; encrypted-media; gyroscope; picture-in-picture; web-share\" referrerpolicy=\"strict-origin-when-cross-origin\" allowfullscreen><\/iframe><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Una regla universal en la f\u00edsica de part\u00edculas es que para part\u00edculas con energ\u00edas cada vez mayores, los efectos de las colisiones est\u00e1n determinados por estructuras cada vez m\u00e1s peque\u00f1as en el espacio y en el tiempo.<\/p>\n<p style=\"text-align: justify;\">El modelo est\u00e1ndar es una construcci\u00f3n matem\u00e1tica que predice sin ambig\u00fcedad c\u00f3mo debe ser el mundo de las estructuras a\u00fan m\u00e1s peque\u00f1as. Pero existen varias razones para sospechar que sus predicciones pueden, finalmente (cuando podamos emplear m\u00e1s energ\u00eda en un nivel m\u00e1s alto), resultar equivocadas.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"Las constantes de la Naturaleza : Blog de Emilio Silvera V.\" \/><img decoding=\"async\" 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\" alt=\"Las constantes de la naturaleza - John D. Barrow\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Vistas a trav\u00e9s del microscopio, las constantes de la naturaleza parecen estar cuidadosamente ajustadas sin ninguna otra raz\u00f3n aparente que hacer que las part\u00edculas parezcan lo que son. Hay algo muy err\u00f3neo aqu\u00ed. Desde un punto de vista matem\u00e1tico no hay nada que objetar, pero la credibilidad del modelo est\u00e1ndar se desploma cuando se mira a escalas de tiempo y longitud extremadamente peque\u00f1as, o lo que es lo mismo, si calculamos lo que pasar\u00eda cuando las part\u00edculas colisionan con energ\u00edas extremadamente altas. \u00bfY por qu\u00e9 deber\u00eda ser el modelo v\u00e1lido hasta aqu\u00ed? Podr\u00edan existir muchas clases de part\u00edculas s\u00faper pesadas que no han nacido porque se necesitan energ\u00edas a\u00fan inalcanzables. \u00bfD\u00f3nde est\u00e1 la part\u00edcula de <a href=\"#\" onclick=\"referencia('higgs',event); return false;\">Higgs<\/a>? \u00bfC\u00f3mo se esconde de nosotros el <a href=\"#\" onclick=\"referencia('graviton',event); return false;\">gravit\u00f3n<\/a>?<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" title=\"M\u00e1s...\" src=\"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-includes\/js\/tinymce\/plugins\/wordpress\/img\/trans.gif\" alt=\"\" \/><\/p>\n<p><iframe loading=\"lazy\" title=\"El Ajuste Fino del Universo\" width=\"500\" height=\"281\" src=\"https:\/\/www.youtube.com\/embed\/M-PliyyoZss?feature=oembed\" frameborder=\"0\" allow=\"accelerometer; autoplay; clipboard-write; encrypted-media; gyroscope; picture-in-picture; web-share\" referrerpolicy=\"strict-origin-when-cross-origin\" allowfullscreen><\/iframe><\/p>\n<p>&nbsp;<\/p>\n<blockquote>\n<p style=\"text-align: justify;\">En f\u00edsica, la noci\u00f3n de ajuste fino, se refiere a la <b>situaci\u00f3n en la que un cierto n\u00famero de par\u00e1metros deben tener un valor muy preciso para poder explicar tal o cual fen\u00f3meno observado<\/b>.<\/p>\n<p style=\"text-align: justify;\">&#8220;Se cree que la ciencia ha debilitado la creencia en Dios. Como famoso cient\u00edfico Steven Weinberg, ganador del Premio Nobel, coment\u00f3:<strong>\u00a0\u201ccuanto m\u00e1s descubrimos acerca del universo, m\u00e1s insignificante parece todo\u201d<\/strong>. Sin embargo, los descubrimientos de la f\u00edsica y la cosmolog\u00eda modernas en los \u00faltimos 50 a\u00f1os han demostrado que la estructura del universo se establece de una manera extraordinariamente precisa para la existencia de la vida; si su estructura fuera ligeramente diferente, incluso en un grado extraordinariamente peque\u00f1o, la vida no ser\u00eda posible. En la mente de muchas personas, la explicaci\u00f3n m\u00e1s directa de este notable afinamiento es alg\u00fan tipo de prop\u00f3sito divino detr\u00e1s de nuestro universo.<\/p>\n<div style=\"text-align: justify;\">\n<p>Este ajuste fino se divide en tres categor\u00edas: el ajuste fino de las leyes de la Naturaleza, el ajuste fino de las constantes de la f\u00edsica y el ajuste fino de las condiciones iniciales del universo.&#8221;<\/p>\n<p>&nbsp;<\/p>\n<\/div>\n<\/blockquote>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/st2.depositphotos.com\/4164031\/6531\/i\/600\/depositphotos_65310509-stock-photo-planet-earth-in-outer-space.jpg\" alt=\"Fotos de Estratosfera, Im\u00e1genes de Estratosfera \u2b07 Descargar | Depositphotos\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Si deseamos evitar la necesidad de un delicado ajuste de las constantes de la naturaleza, creamos un nuevo problema: \u00bfC\u00f3mo podemos modificar el modelo est\u00e1ndar de tal manera que el ajuste fino no sea necesario? Est\u00e1 claro que las modificaciones son necesarias, lo que implica que muy probablemente haya un l\u00edmite m\u00e1s all\u00e1 del cual el modelo tal como est\u00e1 deja de ser v\u00e1lido. El modelo est\u00e1ndar no ser\u00e1 nada m\u00e1s que una aproximaci\u00f3n matem\u00e1tica que hemos sido capaces de crear, de forma que todos los fen\u00f3menos que hemos observado hasta el presente est\u00e1n reflejados en \u00e9l, pero cada vez que se pone en marcha un aparato m\u00e1s poderoso, tenemos que estar dispuestos a admitir que puedan ser necesarias algunas modificaciones del modelo para incluir nuevos datos que antes ignor\u00e1bamos.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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alt=\"Del modelo est\u00e1ndar \u2014 Cuaderno de Cultura Cient\u00edfica\" \/><img decoding=\"async\" loading=\"lazy\" class=\"\" 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\" alt=\"EL MODELO ESTANDAR Y EL BOSON DE HIGGS| Vol. 2 - YouTube\" width=\"352\" height=\"197\" \/><\/p>\n<p style=\"text-align: justify;\">M\u00e1s all\u00e1 del modelo est\u00e1ndar habr\u00e1 otras respuestas para preguntas que, en este momento, no sabemos ni plantear.<\/p>\n<p style=\"text-align: justify;\">El gobierno de Estados Unidos, despu\u00e9s de llevar gastados miles de millones de d\u00f3lares, suspendi\u00f3 la construcci\u00f3n del\u00a0<em>super-colisionador superconductor<\/em>\u00a0de part\u00edculas asestando un duro golpe a la f\u00edsica de altas energ\u00edas, y se esfum\u00f3 la oportunidad para obtener nuevos datos de vital importancia para el avance de este modelo, que de momento es lo mejor que tenemos.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"2019 febrero 08 : Blog de Emilio Silvera V.\" \/><img decoding=\"async\" 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\" alt=\"El modelo est\u00e1ndar, la supersimetr\u00eda y la supergravedad - La Ciencia de la Mula Francis\" \/><img decoding=\"async\" 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fOmOC7I3RBJUHqSZj0gVNjOCd2ADcnMVmBGmdepPp8Ou1ZrY7EhpNZktmJNjcwIgzrF4JUVGhUNzbbCzU3FklixOwMa+Z6\/n4z4W\/mIz6EiJ8vT8ioOOKjXzbCd53YWFgkG6\/SQN1SDH\/yCrV\/s\/cFt71outtY+rujPpuzxIYAaaE9CY0ANJjcNi47rwyJAPAbSLcRIHwVbfQrYWj4XHxeYag39+Gu+0QS7wXBHuakZV6SP3bn5U1tcDyaghj4nQ+7wpF2d7V5EFvEK\/LtcQG4MuwzhRnEfeyxtrWvwONt3lD2riXFP2kYMPSRXYw2Ep0QHtF9+vsdPUe6jZkqNmfn9JTcVkIMQRrr+dtvhTnC4gOsj3jwru7aDCCKV4Sbd0odvxB2PxmrxIfzQA07bP2nFFFFRKdFZLF43EXC+S0ZBDKWs3QO6K6IZibmZWJ8My1raKirUWVmGnUEg9fGqyCQZCwi3u\/RlI+sTflZROe5b0noe7PUxpqarcPuAOAUzEkAHTl131I066SdNq0mMwqpcchQC0EkAAn1PWKzeNQJfQaibqEQCd32MAwJnWvEYdppYvudCHj4I04bRwK69F3eUXMO6QvolFFFe8XHVN+IWVuLZN22LrAlbZdQ7AbkJMkecVJYxdty4R1YocrhWDFW+6wGx8jWd7UcPxDYrAYjDgFrbX7dwk8q2r1ky7Ddgr27ZgbmBpJI0ODw4toEWYE6nUkkksxPViSST4k0RWaznbD2uH\/ptn\/Du15Yw2IRlH1sMULRfW4BqC2Y3QHXTSLcg6wFOte9r\/a4f+m2f8O7RFo6iu3lUSxAqWs92j4ffuqMrL7gZ\/GiJzZxKPIVlYrGYAgkSJAI6aEGrFZLgGBv2763WQhLitacH2vqyXtXW1gKZvCN+dJ8BrDREp4niorM4zicTJp3xdTrWA7V4Zms3gFLEo4ACliSVIAAHnRFqcDxCTvWo4diJFYDg9swN\/eCPka23CF2oic0UVl+09xs9prOYNaZVvOo0W1eIQr5kE27hA2W3JiQGIneE4hbuMyITmUKxBBHKxdVYTuCbbj3elXaWcM4cbTXHN65da5E5xa5YLEKpRFMDNEMTEeJJLOiLNfye\/wBCH6Rjv89iKlu8dZiwsWjcVSQbjNkQkGCEIVi0HSYA8zVXsSrHAMFMMb2PAPn9NxEH40pwmPIs2EXlCFVvKDlcqiMDbBkQe9CTqNA3jUVRxzBsx0OtFdw1JpY55bmggReLzcxB2Wvv4BaXhPHFus1tkNu6Bmykghl2LKw3AJE6AiRpTusBwc5sXhlWSbYJJLFjlFtlJZjqZYqJO5rf0ovLgZ2FYxtBtJzcoiRMbrkfib3vqqPE+I28Ome62VZiYJ6FiYUEwFVmJ2AUk6CqHFeJW3TEW1bntd3nlWAEuCDJgMNDMHTYxTDiXDrd9cl1cyzMSR0IIkEGCCykbEMQZBIpbxLhlu1bvvbXnfu8xZ3ObK4gSxaN9SBruZqUaqkdFxh+IwNLiHxgrE\/E1ZXi8blD748B4+Y+NKsbeKW8wQFptggSQuZ1Vm0ElVDFthovTpLwtmvW0fuypO6wwymYg5gDOnhVwgKi179hTDE8cRbbtIkKSOYHWBH4r8R41kOxYt\/SM7upyqSDJ9owJ18ifjWsvcIZ0dTAlSPiI\/0rJ9jin0jIwIzKQJI9oQQNvAGubiAzvqe7r+y0qF5qMzek9clvRxGz\/wB1P7wFJe0XEbaA3C4yoAxhh0aSBrvodPKnX0S2okqPfrSniLKTooAzJ0\/rCqfa5Z3LR\/zZ9rp0s03jRYzhuKVL4z3EJZpuHvFKrcaW5Wn2QVy69Akda3OC4thhbCtftazIzr1Pr4VnNsRHTMdPX\/etbgbVvugWVdJkkDoTqfdXM7JfSdjNubId0eZskWGv0r2Na8NbERA38VgOD4u3YxoIu28gZknvE1UyoMTP3T7q0PGrmBhr1trYv8sNau907cwEFkIzDWYaRprSTgn1+OBjkLM8dAoBYCPCcor6H9Et\/cT+6K7uDLQ0xMSuFhBLTl0m3xpwWaHGzadUGKw+IUqx53S1cAUqDzpyOTnWBlTY611f7RYW49od6tu6dAjugLAxorBijkGNFYwCa0n0ZPuL\/dFVeIIuUIABmMaADSrbfNZWneUyp3xlsb3EHqwHj5+R+BrhuI2R\/wBRPiD4\/wCh+BqG3g1ZZACsJDaAiRoeU7A76RvUNzDlfas5h962dfejH8Cay1rTtRznhWH4tZH2gfeP3+h+FRHjKdI97D89RUNm3ZuGEuDN91hDD1UwflXtzh7DoD6VIG0xY\/KhL6kSPiCq+KxyuQSV8ND6ef8AWHxFJeJYle9s5XTU251BJGddBrOs04uW40Ij1FJ+KfztgAKea3MmIHebjQydNtPWvE4x4HbBa2wzN3D+LZ53nVdfAyaYJ3O\/K3lFFFeuVJFFFFERWc7Ye1w\/9Ns\/4d2tHWc7X+1w\/wDTbP8Ah3aItHRRRREUUUURUcdhc1IMRwzXatbUZtg9KIs1hOG67VoMHYyipltgdK7oiKK4ZwKqXOIAURXqKqWsaDVlTNEWc\/k9\/oQ\/SMd\/nsRVriHZyxdbOQyOfaa2cubzYbE+cTVb+T3+hf8AkY7\/AD2IrSVq5rXCCFJTq1KRzMJB4JZwrhFnDiLawTuxlmb1Y6x5bCmdFFZAAEBave57i5xknail\/G1mywgmSggRJ510Eka+8VBxvj9nChe8JLNJCLlzZFVne5BI5VVGJ9ABJIBixfE1ufSLIFxGtNZlioAIdxD25nMAVYSViVI1g1laq\/hsGgA5TMDRoJHkdxNXagsOCBBJjQkiCTG50HyFT1kknVYDQNEV8y7YWDYxL3EEIO5uM8x3ZuXHWfMA2y3x8Nfo9++EEn3DxpDisOtx7jOAwuIttkIBXKpuGI8+8b5VVxGUtynVR1qIqtg9ddXVLg\/aMYpUzkI5AIXafBvWI06TGu9TWb\/eWbVyIzi00bxJUxt08Y+G9Z7iXY0F+8tMdCCEJECI2Mf1Rv8AHWq9rB4q0iW4uZVyKNQQACADpI0gH3VzcU11WmW7bEHiDI+QtGYipTIFRpPEdfr9u+KJluK22xB8wdj5bVBxnjhNp7Ns6GC7bcp6eh0k+fnVK7gsRcLBgxEmCx2g9AdflVzgeGCsM2rDUdV010HjtXJZ3WHPeZpLbeG8A7DG4aGxjSdlurUxGLpBjGFoAguP6gHjaf5TCddjOEG0huuIdwIB3VN9fM7+4Vp6UjiD+APu\/jXLcQc+A9B\/rXsaFId2DTILSJB3ztVRjmUm5BNlfxmLS0hdzAH50FL+HYgX27wGVBI66FWKlfUMD7wagbBm+CrDMp3JJ\/Eaz6U14fgkspkQECSdSWJJ1JkknepSAy21ZaTUM7F6OW55OJ\/WUQfiI+FWqrY1JWRupDD3fwmpbVzMAR1\/MVEp1DjMDbuiLiA+B6j0O4qicBet\/wAzeJH3LnMPQNuKcVSx+JyjKPaPy86jr4sYakXvPhGz8CdpWvdB54+yRYniTZvrUK9JXVdPyaTYm6HvIcpYd5bggxENuddt9N6acRxGRPM6D95pJajPb5iDnQ6DfnHKTB0NeXwmIw+Jqio9jmPJ2HOwmRfK67b28JPIBdBjalGmXyCNL2PxY8ZA0K+lUUUV6xUUUUUURFZvtuSLeFcfYxmCJPgHxCWifhcNaSlnaLhxxGGv2lMOyHu2P2bi81tvc4U+6iJnXhNUOF4\/v7Fu6oyl1BKtujbPbaNmVgykdCpru\/duKjErmMaC37RJMCM2g33Og60RRY\/itu3aF7V0MENbhgQRII11nQACSSwABmmVZrhvBi1q9hsSpyBrgXKzBHs31zNb0iVUu9uPBFOk1paIiiuHmNInz2qhxA3e6feY5e69smRAGaBr4kgDrREY\/iyWrXfQ1y3lZ81uGGRVLl8xIEQPHXpTANpNZrhXBmNt8PiMwVLpuWzbuOoIuDvCsggnJca4AD0W20AwBpY0iiJRxTFRNZbH8XCSWYKPEmBT\/i6HWsH2lwrtbuKoJJUgARqSPOiLTYHiEmtVw2\/IrBcJtHTf31osbiXtYa4bf86w7u0Ndbtw5LcxrAZgSegBPSiKX+T4Rw+00yHbEXgduW9iLt5Tr\/VcV5e41edWuWhbt2Vki5cDEsB9uARlX1MnyppZ4YLeFGGt6KtkWkPgAmQH8KyV7Ed5hlslRKPa7xG0I7plYp6HLH9knep6TZaSBJsoKr4IBMBaPhPGWe4bN5QtyCVKzlcDeJ1BE7a08rE8Jm7jLZXa0GZyNhKFAvqSdvAVtqxXYGugblmg8ubJ3qvicMlwAOiuAQwDKGAZTKtB6giZqhjMDbto5tW7dtma1JVAJKuoUtESB6\/Cm9UeLD6o6A81vQ7H6xdDvpUKmVq1MCSCY1IEAnxAkwPfUeKxAQeJ6Cor+JyAAAZoGg1C0uZiTJ3qCrWy2GqyAvblwsZO9c0UVVWUVHf296ftipKjv7frJ+2PMfnx2rCKzisNyq42gT67TWf4jhih7xNBuY6Hx9K2OC1tj3j5ml+NwMSRqv4fwri9p9nPpu\/3VAWN3DdvI4HU7jfykxbw2IyG\/wDnh+kqwGOD6H2uo8fMU+wi2m2GvgT+ZrK4zh5BzW\/WOo9K8w3EyNHE+Y394qrgu1a+HH9M5ma5TaOR2T6zzup62Bp1fHSHptC3UV7Wcw3FidrgPkYn561d\/wCKHqv4iu2z\/UGEPnzNPEfqVRdQeDB6902qlhOVmTw1Hpp+4j4mqh4m3QR8\/wB1Vbl8seYySNB5iTEDyJqSn21h6tQUqUlxmP4iYJAJOk6Cxute6IElM8TjwNF1Pj0FJcVigssxkn4k1RxPFQNEEnxOg+FLnZnMkyT+YFeZxOIr41wdVsBo3SOtpN90LoswwpNzVDA49f5Xt66bjSfz5V6khrYBA50mRM8w0Go+OtA00HxotIS9uFBh1PoAQSw0Owq1hWRUZzH2Fz8Xi++Ia0Q0aD8nj9e4X0aiiivZqJFFFFERRRRRFVw2EW2XK6Z2zkTpmIAJA6TEmNzJ3JJtUUURFFFFERRRRREUUUURUcdhc1Ir\/DNdq1dcG2PCiLOYThsHam1vh6ZrbsJNvMU8AWGUtH3spYT0DMOpq6qAdK7oiKXY7g9i8c1y0rN97Yx4EjUimNFZBIMgrBAIgqthMHbtLltoqL4KI18fXzqzRRWCZ1WQISzifFBZKDI7FmtropygXL1uzmLnl0NwHLOYgGBoaV3+NrfGKtKNLRswyXJLB335YKnlkGdQQZFaelnH4GHua5Ry82mnOuuumnnWDoioWjpswjTmMn1mST6mu6T9pbd18Iy4dmNxu7yFGCs3OuoYQNRO0Cs6OHY62qm6b5TL7AusLhfumNz6wtAjmYDUQg2O8VDCd63NmAvEbdnLesOflMQt1RWGv4TGd22U3muhXtyLxVSxvBc+tyZHOgnWbZncSw7D4PF2++OK7yDkCZ7veaqXDgcxiDAP8K2q4Lu6ZfnFtm+8WWBUkxC1NR3zp70\/bHmPz47Vxdxaq6IZzP7OhgwCSJ20AJru\/t71\/aFUVInPDjye81aqlws8p9f3CrtX6R8AWCqGJ4erajlP5+FKcZwufbT9Yf6j99aWiuXiuxcPWdnbLHbx+R+oJ2lSsrvZoVhbnCfut8f9RUX0K8NmPuaK3LWFO4BqP6Bb+78z\/rXLd2HihZr2nnI+gVdb2k+L365hYo4W+dyfe\/8AGpcJw+4rq0gEGY1JPlWwGCt\/d+Zov37dpczEKJifPw+Vb0exMSCCajWxfwgu0\/7ZfRYf2i4tLQNeuKzWMwaJnuEAzBE+LeC+4mk7NoY\/3pxxjGWbkqtwFvbQaywOrQPfWc\/4hagnPsJOhmJA2idyBW2OwoZWLmAw6+03kyOEHZ0OXWqvfGY6WHXWi4wONzZVcRcK5iuVlgTGoPnpWtwPDglrOyvmbKwKkqFE6AwRI6kGRtppSXggtXLqMxEAr0kyxIRTpIkht+gatlxhgEE3MksoHs85n2OYHfyg6b1d7NwwLjWIjYB9n8e61Y3amFFFFdlSIooooiKqY7FC2ucqSoIzEZRlWdXMkaDfST4A1bqhxbhy30FtycmZGZfvhGDhD5Fgs+IBHWiK29wCJIEmBJ3PgPOl3FeLizkC23vO4uEJbKTltrLtLsoiSq7zLjpJEfEOApiLaW77NcKhublWSepWMp29kgqeoMCuMTwAFLK2rrWmso9tXCo3I6hWBUjLMqjCAACg0iQSL3iHH0t2kvLbuXUa017MgUBbSqrl2Z2VQYYQsydYEAkeHtFbFwrcR7VuLrC9cyIhFoKXaC2dV5jzMoBynXVc3N3gBK2UW7Fq0AEtNbDpCrbW3m1BYpkYiTEvMSqkSWeE3Fe9c74F7gYBzbBZAfZVSWjIunLEE6mSSSRXuJY1LFtrjzAyiAJLMzBERR1ZmZVA8SKopxxRIvWrthgUCh1DZ8yswFs2iwYgJclRqMhJGUgm5xTh637bW2JWcpDLGZXRg6OsgjMrqrCQRI1BpbieAXLhzPibhaVkQO6KKlxMhtbHW6XkzLKk6KBRF1hO1GGuPcRXEqVAOmW5nw6YhSjzlgo+kkE5W6Caiu9sMMqX2JM2hcJTlJcpY+kFUachbu5MZtgTtrVXh\/YwWk7oYhzamyxUqmrWcPbw6HMBIEWbbEdSvQEg+4jsaHtPZbEXO6fMcoVJDNhjhpDRsAc8feA1jloiaDtDhsofvRBIUCGzElDcACRmMoC0gRlBOwqfEcXsW7aXGuLkcSjLLBlyl8y5ZlcoLTtGtLv+XW7wXvpDd+Mqi5kSMio6BCkRvcZpEc0fZ5a9xfZlWw9nDLddbdu2beoV86lAmZgRBcRIMQCTptBFbftBhgzg30GQMXJMKoVBcaW9mQhDRMwQdqg\/5ow2cIH+zdZmiAhtmwCjAwwc\/SbUCNZ9Jq8Q7MZsO1tXJcF3XUJNw4c2RrlbLrDTlbbYjSqFnsg95r17E3GDvcLqFjlj6CUJy9Q+BUwCdGMmdiLWYLFJdQPbYMpLCR4qxVlI3BDAgg6ggg1apdwbACxbyZixLO5YgCS7Fjt0ExrJ01JMmmNERRRRREUv45PcPG8pHX7a1zxTGXUyC3ZLy9oM2mVVa9btvoDmzBHZ9ssIZIpb9JvYg4u0bX1Y7k2s1u4mdTq6sbgAJldgIAZZMkgYOiLzEW8ywZnQypZDIMyCDI+NL8ZgrjQAzkazmvXTuMu2f7pce+mdvC3wYFpQgChQHAgiZ6REZY99eJhsTCTbWY54cROX7On3vHpUNGpWpCA3r0KEApUnDGMZs28mL13fMzz7fiQfe1McJZKyJYj+s7P4kxmJjeur2DxLKR3ajmUj6weyGUkHTfRqlGHxGY\/VLlgRziZls0+UZfnW1WrWqNykff7QADRcNZBZX1lQwGunNlkkePL8zRf296\/tCulw+JhZtLP2ucfdO2n3o91c3cJiCI7tfaUjnGysreG+hqt3b9y2lNOFn2vd++r9JsEL6M02hlIWIcTMmZ8oj51Ml\/ERbm0s6d5DiDyGcn68b9Jq1SBDQCsFM6KU4h77K690ASRlhwOUEHXz0NTDEXsxmzywsc6zmls0+UZfnUiwmFFLbV\/EZUzWhm0zw4icpnL+tG\/SvHuXiGBtfaEQ49kEHXz0NETOqXEs+QlMkiTzglQAp1IHnHzrkYi9mP1PLAjnWZkz7oj51S4h9KeyqLbQMYFwlxEZTmy\/rRv0mtXkhpIE8EWZ4bi75uux7rNcnL7WUMTInrHTTxqtjcFctuVYIRA9IKdBH3h47Dy1v3Oz+LIaAoMjKe82Ag66byDTXGcPvXHQtaXKMsw4k6nOPTaPfXHGGrVMOWPHiBkabddPX1UWUkI4Pw\/EJZGQ2lLZDqDoI1WI9CPwpteFzuecrm+1AkEZumogxGvyrlL+Iy25srOneQ4j2DOT9aN+k1HiEuXAVewp5lKEspywBzf2gc2o8q69OmKbQxugUoECE3ooordEUUUURFFFFERRRRREUUUURFFFFERRRRREUUUURFFFFERRRRREUUUURFLMXw9muLcF1pRiyqwBRZsvbiFykglgxkn2YETTOiiJP2d4P9FtuneZ8zl5y5fsIm0mWOTMT1ZmMCYpxRRREh4jwN7mItXxfINvMVR0VlWQg5CpVhJTXMWJDsAVB0s8C4YcPbZCwaXZhClQAY01ZmOxMknUmIEANaKIiknE+CtcxFu+t3JkUrGUk6h1MNmEAi4SRBlrdo\/Zgu6KIlnAOGfRrCWcwbKWMhcg5mLQFkwNfGmdFFESPH8EZ8SMQt0KRbCZShb\/ALkwQwgEXTI6m3aP2YNngPDjh7CWiwbLm1ClRBdmAAJJgAgSSSYkkmmdFERS7F4EvcW4HKlUuJ1OjtbJO4ggWzB\/re4saKIlfAeGfR7CWswbLm1Vci6sTosmN\/E6yaaUUURLsZgC11LqvlKpctwQSCLjWmJIDDUC2QP7fuPPAuHfR7CWcwbLm1ClRBYsAAWY6AxJYkxJNM6KIspbu3G4gchuZbd3JdUteNru2wguC4Ncgud69tcvgScs8wZcR4SbmIsXg6r3QcAG2S0upWQ4cQACdIIJgnULDVbYBJAAnU+ZgCT7gPhUlESfszwX6JZ7rvC\/NmnLlA5VWAsmJy5jrqzMdJiinFFEX\/\/Z\" alt=\"M\u00e1s all\u00e1 del Modelo Est\u00e1ndar? : Blog de Emilio Silvera V.\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcRBFWA8Kw50phnJF-EEtLMv8TIY1YyH53s3jQ&amp;usqp=CAU\" alt=\"Sobre el descubrimiento de la supersimetr\u00eda en el LHC del CERN - La Ciencia de la Mula Francis\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Se han estado inventando nuevas ideas, como la <a href=\"#\" onclick=\"referencia('supersimetria',event); return false;\">supersimetr\u00eda<\/a> y el technicolor. Los astrof\u00edsicos estar\u00e1n interesados en tales ideas porque predicen una gran cantidad de nuevas part\u00edculas superpesadas, y tambi\u00e9n varios tipos de part\u00edculas que interaccionan ultra-d\u00e9bilmente, los\u00a0<em>techni<a href=\"#\" onclick=\"referencia('pion',event); return false;\">piones<\/a><\/em>. \u00c9stas podr\u00edan ser las WIMP\u2019s (<em>Weakly Interacting Massive Particles<\/em>, o Part\u00edculas Masivas D\u00e9bilmente Interactivas) que pueblan los huecos entre las galaxias, y ser\u00edan as\u00ed las responsables de la masa perdida que los astrof\u00edsicos siguen buscando y llaman <a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a>.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"El modelo est\u00e1ndar, la supersimetr\u00eda y la supergravedad - La Ciencia de la Mula Francis\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Paul Dirac se sinti\u00f3 muy inc\u00f3modo cuando en 1931 dedujo, a partir de su ecuaci\u00f3n del <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a>, que deber\u00eda existir una part\u00edcula con carga el\u00e9ctrica opuesta. Esa part\u00edcula no hab\u00eda sido descubierta y le daba reparo perturbar la paz reinante en la comunidad cient\u00edfica con una idea tan revolucionaria, as\u00ed que disfraz\u00f3 un poco la noticia: \u201c<em>Quiz\u00e1 esta part\u00edcula cargada positivamente, tan extra\u00f1a, sea simplemente el <a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a><\/em>\u201d, sugiri\u00f3. Cuando poco despu\u00e9s se identific\u00f3 la aut\u00e9ntica antipart\u00edcula del <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> (el positr\u00f3n) se sorprendi\u00f3 tanto que exclam\u00f3: \u201c<em>\u00a1Mi ecuaci\u00f3n es m\u00e1s inteligente que su inventor!<\/em>\u201d. Este \u00faltimo comentario es para poner un ejemplo de c\u00f3mo los f\u00edsicos trabajan y buscan caminos matem\u00e1ticos mediante ecuaciones de las que, en cualquier momento (si est\u00e1n bien planteadas), surgen nuevas ideas y descubrimientos que ni se pod\u00edan pensar. As\u00ed pas\u00f3 tambi\u00e9n con las ecuaciones de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> de la <a href=\"#\" onclick=\"referencia('relatividad',event); return false;\">relatividad<\/a> general, donde Schwarzschild dedujo la existencia de los <a href=\"#\" onclick=\"referencia('agujero negro',event); return false;\">agujeros negros<\/a>.<\/p>\n<p>&nbsp;<\/p>\n<blockquote>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/www.quo.es\/wp-content\/uploads\/2019\/10\/big-bang-conceptual-image-royalty-free-illustration-639549057-1552638775.jpg\" alt=\"Qu\u00e9 pas\u00f3 antes del Big Bang? - Quo\" \/><\/p>\n<\/blockquote>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Se piensa que al principio del comienzo del tiempo, cuando surgi\u00f3 el <a href=\"#\" onclick=\"referencia('big bang',event); return false;\">Big Bang<\/a>, las energ\u00edas eran tan altas que all\u00ed reinaba la simetr\u00eda total; s\u00f3lo hab\u00eda una sola fuerza que todo lo englobaba. M\u00e1s tarde, a medida que el Universo se fue expandiendo y enfriando, surgieron las cuatro fuerzas que ahora conocemos y que todo lo rigen.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" class=\"\" 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\" alt=\"Los mil usos de los aceleradores de part\u00edculas\" width=\"278\" height=\"185\" \/><img decoding=\"async\" loading=\"lazy\" class=\"\" 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\" alt=\"El CERN busca la part\u00edcula que revolucionar\u00e1 la f\u00edsica\" width=\"337\" height=\"189\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Tenemos los medios, en los super-colisionadores de part\u00edculas, para viajar comenzando por 1.000 MeV, hasta finalizar en cerca de 10<sup>19<\/sup>\u00a0MeV, que corresponde a una escala de longitudes de aproximadamente 10<sup>&#8211;<\/sup><sup>30<\/sup>\u00a0cm. Howard Georgi, Helen Quinn y Steven Weinberg descubrieron que \u00e9sta es la regi\u00f3n donde las tres constantes de acoplamiento <a href=\"#\" onclick=\"referencia('gauge',event); return false;\">gauge<\/a> se hacen iguales (U(1), SU(2) y SU(3)); resultan ser lo mismo. \u00bfEs una coincidencia que las tres se hagan iguales simult\u00e1neamente? \u00bfEs tambi\u00e9n una coincidencia que esto suceda precisamente en esa escala de longitud? Faltan s\u00f3lo tres ceros m\u00e1s para alcanzar un punto de retorno que ya comentaremos. Howard Georgi y Sheldon Glashow descubrieron un modelo genuinamente unificado en el dominio de energ\u00edas de 10<sup>19<\/sup>\u00a0MeV tal que, cuando se regresa de all\u00ed, espont\u00e1neamente surgen las tres fuerzas <a href=\"#\" onclick=\"referencia('gauge',event); return false;\">gauge<\/a> tal como las conocemos. De hecho, ellos encontraron el modelo; la f\u00f3rmula ser\u00eda SU(5), que significa que el multiplote m\u00e1s peque\u00f1o debe tener cinco miembros.<\/p>\n<p>&nbsp;<\/p>\n<blockquote>\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"El CERN descubre una nueva categor\u00eda de part\u00edculas, los pentaquarks\" \/><\/p>\n<\/blockquote>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">El <a href=\"#\" onclick=\"referencia('bosones',event); return false;\">bos\u00f3n<\/a> X predicho por Georgi-Glashow dar\u00eda lugar a transiciones a trav\u00e9s de masa que deben estar en la regi\u00f3n de <strong>10<sup>19<\/sup> MeV<\/strong>. Una peculiaridad de este <a href=\"#\" onclick=\"referencia('bosones',event); return false;\">bos\u00f3n<\/a> X es que puede transformar los <a href=\"#\" onclick=\"referencia('quarks',event); return false;\">quarks<\/a> en <a href=\"#\" onclick=\"referencia('leptones',event); return false;\">leptones<\/a> e incluso en anti-quarks.<\/p>\n<p style=\"text-align: justify;\">Y, a todo esto, \u00bfD\u00f3nde est\u00e1 esa energ\u00eda oculta? \u00bfY donde la materia? Podemos suponer que la primera materia que se creo en el Universo fue la que llamamos &#8220;Materia Oscura&#8221; (mejor ser\u00eda llamarla invisible), ya que, de no ser as\u00ed, dif\u00edcil ser\u00eda explicar c\u00f3mo se pudieron formar las primeras estrellas y galaxias de nuestro Universo, \u00bfD\u00f3nde est\u00e1 el origen de la fuerza de Gravedad lo hizo posible, sino en esa materia escondida?<\/p>\n<p style=\"text-align: justify;\">\u00a1Lo dicho! Necesitamos saber, y, deseo que de una vez por todas, se cumpla lo que dej\u00f3 dicho Hilbert en su tumba de Gotinga (Alemania).<\/p>\n<p style=\"text-align: justify;\"><strong>\u00a1Que sea pronto!<\/strong><\/p>\n<p style=\"text-align: justify;\"><strong>Emilio Silvera V\u00e1zquez<\/strong><\/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%2F2025%2F06%2F21%2Fenganosa-perfeccion-la-del-modelo-estandar%2F&amp;title=Enga%C3%B1osa+perfecci%C3%B3n+la+del+Modelo+Est%C3%A1ndar' 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%2F2025%2F06%2F21%2Fenganosa-perfeccion-la-del-modelo-estandar%2F&amp;title=Enga%C3%B1osa+perfecci%C3%B3n+la+del+Modelo+Est%C3%A1ndar' 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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