VIAJAR EN EL TIEMPO
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Viajar a través del tiempo , una de las fantasias favoritas de la Humanidad … Pero quizás no lo sean . Quizás ya se hayan producido estos viajes y se estén produciendo en la actualidad .


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El Dr. Ron Mallett, demostró matemáticamente mensajes binarios que podrían ser enviados al futuro .

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Un nuevo prototipo de máquina del tiempo que, en vez de objetos masivos, utiliza energía luminosa en forma de rayos láserpara curvar el tiempo, ha sido ideada por el físico de la Universidad de Connecticut, Ronald Mallet. Ha utilizado ecuaciones basadas en las teorías de la relatividad de Einstein para observar la curvatura del tiempo a través de un rayo de luz circulante obtenido por medio de una disposición de espejos e instrumentos ópticos. Aunque su equipo aún necesita fondos para el proyecto, Mallett calcula que este método permitirá que el ser humano viaje en el tiempo quizá antes de un siglo. MARIO TOBOSO . ( Doctor en ciencias Físicas por la Universidad de Salamanca y miembro de la Cátedra )

 

 


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Científico revela que es matemáticamente posible viajar en el tiempo


Los viajes en el tiempo siempre han sido un tema interesante tanto para los científicos como para los amantes de la ciencia ficción. Mientras que para algunos el tiempo es lineal, hay teorías que sugieren que no es realmente así.
 


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De acuerdo con la teoría de la Relatividad Especial de Albert Einstein, el espacio y el tiempo coexisten al mismo tiempo. Una analogía con lo que parece una idea imposible. Independientemente de lo que se pueda decir, la cuestión comparte respuesta con las teorías científicas. Pues lejos de las especulaciones, quizá algún día podamos encontrar ese mecanismo que haría posible nuestro viaje, tal vez llegado el momento y/o como lo sugieren algunos relatos que contemplan el accidente en el tiempo.

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

Según el reconocido físico Stephen Hawking, es posible viajar al futuro, pero no al pasado.

 

http://2.bp.blogspot.com/_oMNSZ3--g9A/S5v8uXJ_V0I/AAAAAAAADwc/MBKArFYgG1M/s320/paul_davies.jpg  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 4H+dZptVph0XpFJTlQ77H8kb0k+0KvH2kuTsrE4Gw9wHIJjjqB9dVrMQp6QAzutfTIn0SmROf2Qi7tm9bWTmVe5tNe4GsENXhdfLutDXvtzZnYd5Cu6OaNtzcDxQRu9tdpoDRYZAJGqNwmGvEZkmD1homNO2uLXYrhscvCqSC5vVu9a9j0PcnxwykXZp42UWMS4hGeZOoMydO+tdBVUlVEfs9t0ZEbthn3WCpIx7D7WqiOIZtCSe4knWtLYYYbva1rctQAMlQuc7K6MOBvICdQAJMN2eBrktxzDKl7YyQSTYXadT4hP+zzMF/qq9rvaa7rWhosMgs+q5xO0cqy7nLw4kyeoAdZ7hSeFDH7W6BbnYBWG87LNE7Kw+KuEk2zZtkSud4uE9ptrOXTt10rgVW0OHNfYjfI6AH5n6LU2lltkbI3EYG+omS3osSfZRTY5hc7t2waf9TQB8cx8VD6eZovr5qu+FN5ze013+BF/CPgFm3ndUVf2dcVSzAQNTzta5dNj1FNK2CMm5yGVgmuppGjeKz+1NuW7A5xlupV4+vsFdlzwEtsZcqobHx20La3VyC0xOVOUyjmsQcwjUyOuuDWY7TU8pilJuOg65rZHTm1wqDZewrt+81i3l5Rc0y0DmHK2sdprRU18NPCJpL7pty65hSGFxsF1t/d+9hCgvZZcEjK2bRYmdO8VWhxGGtBMN8uotqpcwt1Vq3k/xgQuFtkZc0B5Y6TAEcawDaKi39wkjO2mXqrcF1rrLV3Upbnye7Iu3EuOuTkywGp1Drrwjsbj3VzqvG6aik4ct7kXyF/qodA6QXatLZwzM5tiMwkGTppx1rbUYlFBTCpffdNj356LM2Jzn7g1Rh2Ld7V9p+6uR+tdD0d8B+af9ik7lS4/YO0GzC21hFJ5pztnC9nQjXjVDtXR9HfAfmmNoyNV3Zwd6xbRMQytcg6qSQRJiSQNYrs4biUVdGXx3yNs/j1KzTxGN1lYbstOMt+BrRNqrQ6L02lJqod94+CNPnJ1x+sOurs7So/RZvdeOfEdXBs3b3CK8ttf7qLxPoE6i1KusVZDoy8ZHv4j+VeRw+pNJUxzdD8tD9VskbvsLVk0RSwXSSYjlOuY82vrrpA1u8Tlr5LihtzZbCzbCKqjgBA7dK+PVUz6mZ8x5knwucvyXba0NaGqm2+qm5bBjURqxHX2AV7bZA/9NJ+L6BYK0e0ELsWwj3ZEELroxJ7pEVv2jrPs9EWg5v8AZHhz+Xql0se9JfotELqklZEgCR2AzH1V84MMkcbZtA4mx722/NdTeBJasRt+8uGLSmaDCqrEs06roOGlfWKCsFTSsm6jPx5/Ncd8Vnlqk3H2W9xmxeJWGkiyh1FtetgOo6xrroe2vJ7UYi/eFK02Fru+g+vwW+ljaBvBAb27/XLd5rOGCwhys7DMSw4hRMAA6SZquF7OxyQiWovnmAMrDvVpJiDYKz3W35S+VS9ltvHEmFZgNSCdBPZVcX2fjii41NfLVuvmOfiOiiOZxdZ3xUm8m0MNbZXLIQ5hsrZjpHAIez6q6uzVTNwHQzAjd7NwdDyz6fVIqYgXAt5q13tulcFfZSQRbJB6xwryOEn/AORjI/i/NbZReMrwtjOpOp468fGvpqwr2bya/o+16Vz+K9fN9ovv7/BvoFth7CyW4f6Vv+F/+IK7+Ofstn8nolRdsq18p+y7l57GQCFV8zEwBJSO89fCqbItJZL4t+qiqcG2ut3htEX0VHuFeOmaeK4DqfldagcgvKvKRu7yN3l7Y+TunnRwS4dT6m1PjPdXudncS+0Q8F59pnzH9NPgsszLG60vkp+aP/et9lK4m1H3tv4R6lNg7KN2diAcWwhRLXIOsnKTMSY8a7uKkfoRnhH9FjhH+OfNC+UHeK9gxZ5HJz8+bMubo5YjXvNcDAcNgrd/ig5WtY21utkry21kLu/trHXFD3uTCspZQqRPNLKS0+HCvTt2YoNSD8Ssb6t/JTYvGXLhBdbZjTpAf9ddeiw+CiYWQ3AJv1WaSR0hu5E7sH8st6KND0TmHr1NOl1TItF6dSkxZ/fs/kb8eknBQx6Y/VPGrx9pUf2Vmd0mkvObgONsJ29Y415ba/3UXifQJ1FqVbYbEfL3EM8FYc2F4AGG6+qvP1NJfDIKgci5p+JI+vxWlr/8VzfAoFMIRi+vL+c/Nrl16s/GZ1rtuxS+B6+17v8Av+VZxD/1HdqjrmIJxCIM0BWJ5vNk8Od26e+uNFS7mEyTnVzmgeA/r6J5feYN7kFt8kOpGbRG6KBtSYGvbJmO6vQbIfd5PxD0Was7QU+71krazNMsSecoUgDQaD1n11x9p6rj1ghbozLzOZ+g8k+kZusueaD2dj5vFiHi4+UTbAgAaSZmNVrs4pRQjChExwvGAdRmf3vUlIie7jXPNNvVbC5bkgDon5NX14jU6jrpOyNZcPpj+Ieh+h+KtWs0crLYn5i2RGonRcoMkngOFcDaAn9IyX7vQLRTe6C8GxoPKPm6WZpnjMma+jxgBgt0CyqJLZYwASTwAEk+AFWLg0XJsEKV8I6aujoD1shUH2iltmjfk1wPgQVNiF75jL9tLLPejk1WWkZhGnFYM18qhjkknDIu0Tlnb5reSAM1nPxn2V22v+XP/ZXZ/RWLf6v9/wDVK34/7C0Wx8ZZu2lfDxyZJjKuQSCQeaQOsGuPWQzQylk/a8b/ADTGkEZLzjcT9K3/AP3H8QV7HHP2Wz+T0WeL3i1W+e1OTa1bBZWuTlgwCQRpp1mRFU2PIDJQeo9Cl1rSbEK62kzfBmyzmyCIMGdOuuHhgBxZoP8AG76p83uT4KLk1xWHa1dHSUK40kEgEMOzXUd4puIU8mEVwki7OrfDm0+nhZRE8SssdVWbg7NfD2r1q50kvNqODDKhDDuI1qmP1DKiaOVmhYPU5eSvCLAg9VlN1j/tm96eJ9uZq7mJ/sZnhH9EqP3i3+2r+HXL8IVWmcua3njhMaGOqvN4ZRVtTvfZTa1r+1u+CbLIxnaQuG2phWYBEBJMaWT16awNBXW/Q2M/xn/efzSOPB0+SodrupuEoiBTHTbJ1D9TMI9lewwmGaGlbHObuF7535nn4LFMWueS3RF7nn8rtxk6+hMe01ql1VotF6nSkxZzygj8ieAzc63ovS6Y4aGrx9pVfoszuckBpR1LAHnmdJIAHNGuhPrFeX2v91F4n0TaPUqPaV5reNDi3dYDLJWSkFYOgUzA7+qmYbSiqwTg8zvW8QSR80Sv3J7+C1JAmeuOPdxrwYLyOEL66d+i35arK7Fus+MZzauLmDatOWIgCMo6gOuve41TCmwcQj93dHnz+a58Dt6a/ijd5rGdrShWYucpKmAqgySTlPaD6qybMztp6OeV2jTf5K9U3ee0BWGPxYw9oZUZ4hQqiTEdw7BXnqChlxOpcC6xN3E/31JWmSQRNVZe3oKhZw9zUSeOmp0PN7AD667v6nP/AM4f7f6rP9tHRWN1vhGHlCVLrIIPOVuMadhEVxadzsLxEB37rrHvB/pmnuAlj8UFsDaal2sNczMphZkNzQFYSeJkE8es129qcPcXCrYLi1nfQ+Fsvh1SKSTLcKpN7dyjiLme1lEnWAFYTxmIzjr11q+FbRQthEVTcFuQda4I5Xtnf1UyQODrt06KHcvci5Yv8viCvMnk1UySSIzN2QCdO/u1z41jkU8Jgp8wdTa2XQXzTIoiDcrnygzibi2UdVWyGdy0kZyVUDmg8Af9Vb9mMPfHE6dwtv2t4Dn5n0SqiYX3ei1e8FjPg7qQTNuIHE8OFeZwhv8A8lGP9X5rRKbRnwXnC4Kwltc1hSSzgmSH0CdpIHE9VfU9wLlF5K325NpFwiC2CFzPAY5iJck6wJr5ntK22IO8G+i6dMbxgrFbjfpa/wCOI/iV3cb/AGUz+T0VIveKfywnnYf0bv1pSdkuxL4t+qmo5La7SBOCaOJtLxIHUOs6VxcL/arPxn6q83uj4LL4DGNYvq5ZApS2HHKKZXIswASZHEf+a99iuHtrqYx/vatPQ/kdCudDJw3XW9tuCAywQQCCOsHga+UvY5jix2RGVui6wscwsPsSzZXaVwqhzl7xLFhxJJMCOHrr3mJtH6DYf9Mf0WGJxM5HitFvBs65eCcmyDLM51B4xESDHCuDgeLRYfv8RpO9bS3K/U96fPCZLWVP+LOIJUteVoIMFmI0M8Ir0H63Uv8AA75fms32N/UKq29stcMVzkvnzEBYQAAjiSDPEdVdfC8WjxBrixpG7bXv8EmWEx2uj9xWBxVshco1jUmdOMn+VbZdUR6L1mlpizXlDthsE4MwXtzHUM6yfAcfVV4+0qv0Xm2y9uiyzNbtvzgBDQYVRCgQOyKzYjhcNe1rZScs8j18iqRymM3Cjx+NGIuZ2t3MzQIUgA9Q4qafRUcdHCIYzkL66559yh7y83Ks8VvI2RrARyoXk8/6zADLmmOuOzrrmt2epBU/aRe+9vWuLX10t170w1L93dVZszHCxc5RLdzMARziCIPHggrpV1FHWRGKXQ2OXclxvLDcK0xu3m5ZHNpi9tYHYCwBbSOIkrx6jXPjwGlZTup2l264gnPPLy0TDUOLg7ogdrbYOJyC4riDzQsCS0DWRr/5rRh+E09BvGG/tWvc308lSSZ0naQeJvWzcIR7gjmjKoOiAKIhh1LXSS1b7J23dt5LYuSpb+1tPmjiYYE9U1x63A6Srl4soN+49E5k72CwVZcxTs5ccgxJzaZUIMzoTlf311I4WsiEWoAtnnlpn1Si4k3Wgwe8uITS9YaArNmIYaKpbQnpcOM9dcGp2YoZnbzbt8Dl8Df5LQ2qkGuaGvbzX7w+RZV/wiD4Zuco91WptmaGB284Fx/1HL4C1/NDqqR2iqmTKl03bRSQFLIZBJdW6yQTzeoivQDuWZE4reC9dRrYuW2VhlKleTeP3jE+BNceDAKKGYTNB3gb6lPdUPcN1V+LxdxEtLcEmGOW6uYxmIEZhI6PVFdlIVhsPeVk5O0qhFLgc3Uc5tdGk9fbXIrMEpKuUyygl3iRonMnewWCpBiGtXWxOGuoLpDEh7ZGbMZMASsz30+pw6GeEQvHsi3PpoiOYtN1R7e29exZXlyDkkCFy9KJmPAUiiw+CjBEItfXO+ie55dqj7m+2Ka3yTMpSApGQTlEaT6qRDg1JFMJmtO8DfU6odI5zd1WmLsk5CWQA27epcH9QDgsnq7K7oKxFWeyNuPbAti9KqrkBbcxCMw57weI7DXKqcEoqiUyyM9o65kehTWTvaLAquXbRS4bttYuEsS7HMZbjAEKPYa1S0EEsAp3j2BYWueWmeqqJHB28NVapvBi2tI4cAFnBZlRVgBI1Ig8Tw7K5/6uYd/l/wDJ35pn2mTr6KM713l43i57Etoq/TZZ/wBNH6uYd/l/8nfmj7TJ1Tbb2jfuOC5S2oUFSwAcZlVjEgvPeo6q3UeH09GCIG2vrmTp4lLfI5/aVhuHcnFIc5uHWSZ7OrMZPup0uqtHovW6WmLL+Um5lwFw5ivOt6rqRLqNNR9dXj7Sq/RZfyX3w1y9Fx35q9MQBqeHONXm0VI1pdu72WsKxW4jmAplYg5s2gkjUBST6u2ltYXK5cAlsXePDY4NbUGQJKXAJK8JEEjiR30Frm5oBDli94tmLhcSQbl3k8vKgdIZQYyFi4J50Dh+sPGnMdvBKcLFbrdLC8lhULMc1z5Ri+hm5GUESY0yiJ40l5uU1osFRb94QpdTEi46KFIYLJXOOgTDDiWHjlpkRysqPGd1m90MSTjLA+EM/OPNbPrzW7ZFXf2Sqs1Wy8oBIsKwyCGIGfLEspXi3DQn2UqLVXk0XmfJk/2Ntv7u5zvUFcj3VoulL13HGMA5kpGHOo6S/J+rUeqsg7S0HRUnkzu5rV451fnrqEyHo/raCT3yfGrzahVj0Wf305mIvtne0XuW4Yg5Gy2jMMusc4ToeHsZH2Qlv1WauTBL21deu5ZIEellGUfvKD30xVU9xmyWltOGGSeTcCTNxzORpUnq0M1CFHgLicuge2bbBx0SQAQQdbbyfeKEIP4Op6F1T3PNtvfzf9VTdCqtq7PdefHNbSVYMJAk6qT4+qkvHNOjOVlW0tMWjws3LdsyoCqEJa4q9GRwJnhHVT2HJIeM0bs23bF1AbmYk5YRTHOBXVmiOPUDV1RRYe8SYs2gI1LNzyB2lm5i+MDxoQibpBtg3Ha63KRCNJllEA3GB839UGoQuC7JxKYcdgnlj48XHgSooQp8VZHybcnOZF599uTU5ZToSCTCA8TxoQr/AHBn4UksjanoJlUacBzRPjSJdU2PReuUtMWW8pbEYC5DBTmt6ngPlF7Afqq8faVX6LLeS64xuXpuK/MGizpzuuVFXl0CpHqrHfDYOMv3w1hkFsIBDNBzS0mMp6svsqrHtAsVZ7STkp9zd3MRYuNcxFwE5cqopkakEkmB2cO+h7wRkhrSELt+/wDCsfaw1q4oCEcsAWzHKczLIXLAGnHie6pZ7LblQ7N1kX5RdqG1at27dxbbu2aTPRSDplU/rZfYaiIXN1LzYKx2naOLwJKRme2HUxIDgTwYeI4ddVHsuUn2mrz3dC4xxtibllucdFQBui3A8mCPbT39kpbNVrfKcTyFqOT/ADn9pEHmNwnrpUWqtJovNys/qYY+F7L/APKKelL2PFSMA0aH4P8AqtlI+T6nPDxrKO0tB0VL5NyeTvZs/SXpsrk83z16Xrq8uoVY9FR78DLiX1KZjmJDsgMoigNmUo35vgSOPfTI+yqP1WcFgdMaR/aJ8iR/iWy1n7NXVF3tPD5imZQ0okEEW7pkAnKdbd3jwWTQhRbOzC4FDC4FDfJ3Vy3UhGMKp1HAaI3qoUqtuJbJIlrLDirgsoPiBmXwKnxqVCj2nhWGFJ5rAXQZVgw6JGsGR0uuKXJomR6rPGkpytNlWMykl0QA8WOvAcFEsfZFOjOSTJqrrY6py1sW1e6wdCSRlVRmEtkWTp2kgdoq6Wm5MvzXYvl15KzARO9mHyaD9oT30IVlhbB5JgvNBZI5JiuYQ4I5dgTc6pCBhpwoKFHaw+XROaR1WxD+t4e8PoqKEKS9ZHJg5DKkgl7YmG5wObENHHPrloQrrcNycUk9U/2iXI06uTAVfCkSap0ei9bpausv5SfmFzmcpzrfMgnMc4jo6xOunZV2dpVdosn5Ls4uXg1kWxlGuRlJObhmY8O6ry6Kseqst6tu4uzilt2QeS5MOx5LPqC5YBuEwogdpFVYxpGalziCs1id7tpPmHJsqt1LZcEA9QYa+uaYI2hU3ytD5M9nEC7fuWhbYnk15jKxGjOeceBOX2GqSnkrRjmrjal/AXLk30zunNk2bjxBOgISCJmqAPAyViWnVWGxsXYYFMPICyxBR01Ykk88CZJJPjUODuakEclhcRhGw+1Uy2FFo3FYOttjCuIJLSQIYt7Kde7Eu1nLTeUDZ1y9YTkkV2W4pIZc3NIKkgd2YHwmlxmxV3i4XmxwWIa7FrBkc4Bc2HbtgFy2gniZ0p9wEkBet7YBXBupIJNvJwkFmASSOsSZ8KzNzcnuyCoPJpOXETa5IZ1yjIUJGU6meJq8uoVY9FQ712MWcfc5Gy+VigFwWWI1RQSXA1A16+qrsI3VRwN1U4p8cWJTC3QBorHCk3I7S5WQTxMECrXHVRYoFsTjCWmz04DThxDQIGYZYMCNTVlClx1/EZsiWZVAUU/BwxIgqxBK6AydBAgjxqEIa5exRUKbOYDgDh1OX0ZXT1VKE+Pt35yLYBQBT83UgvkXMejxmR6qLAovZCfBb3/Dr/yqf9lV3Qp3iiMPh72S58goYZSv5PbE84BhGTXRp/dqQAFBN11y+MgDIAFIIAsWgoI1BAyRPfU5KFPh7uIKMjIgjnpNm0BnGsEZYMidSJkCoyUqO3iMaSQACX6Q5OyS8edzZbhU5KFLaxWJfMl3IQQYLCzCMBI0iIJ0OnXPVUZKUAoxAmFtCdDzMOJEgwdNdQD6qm6havydB/hKZwgMnoBAIjr5PSfGkS6psei9hpaYsf5WP0bd9K1/EWrx9pVdovMdxd40wb3HuI7B1CjJEzIOskU57d4JbXWXG+e3Exl8XUVlAtqkPEyGYzoT5woY3dFlDjcqiFWVV6Fsff6xhsKlm3ZuZkSJOUKbhkljzpgsSaU6Mk3TQ8AWXnzPJJOpJkntJ4mmpaud0tu/A8QLpUssMrKvEg9k6cQpqrm3ClpsUfvtvPZxvJlLTo6SJYggqerQ9RHvNQxpapc4FW+73lKNtFt4lGuZRAuIRnIHDMp0J75qrouisH9Vd3PKdhQNEvE9mVR781U4RVt8LDb2733MbC5eTtKZCAySepnPX4cBNNYwNS3OuiNyd7kwKXVa0z52VuawEQCNZqHs3lLXWWl+NS1/w9z6a/dVOEVbiBMfKpb/AOHf/MH3UcIo4gXnt9heDPEXFlmHnp1t6Q6+0a9Rp6Uq80ITEUKEwAoQnihSlFCEqELu1bLMFUSSQAB1k8BQhE37wQG3bIjg7j+0PYD5g7OvieoAQg6FCVCFufJX84X0j9kUiXVNj0XtVLTFj/Kx+jbvpWv4i1ePtKrtF555Ndj2cTduLfTOFSQMzLBzATzSKbI4gZJbADqt1id2NlWzluJaQxMPfZTHbBucNDSd96ZutXNzcbZ99CbQjse1dLQfWWWp4jhqjcaV5tvVu3cwV0KxzI2qOBAYDiCOphIkd4pzXByU5tiqa2hJAAkkwAOsngKsoC9q2duLhFtWxcsq7hRnYs3OaOcdG7ZrOZDdODAvJ95NmfBsVdtRorSs9aHnL46ED1GnNNxdKIsV6Vc3VweIwRuYewqvctZ0IJlXyyBx7dKTvuDs03dFsl5BWhJXq+4u6eHbBpcxFlXa4WeW6k4LHdC5v3qQ95vYJrWi2ag3H2RhMV8KuNYtlRfItgjRbeUZQPr9dD3OFs0NAKoTsyz+GuQ5NeS5QDk45sclMR461e53LqthvWW/x+wtm2FDXrVi2CYBeFBMEwJPGAaUHOKvutCCtnYykFThARwIYffU3f3os1ZDf7DYQnCrgRam4XB5KOcSUVJI78w9tMYXZ7yo4DktXgd1sFgLHK4oJcYAZ3uLnXMeq3bMjjw0mll7nGwVg0DVd4La+ysYwshLRZtFD2Akn9livH1zRZ7c1N2nJY7yhbophMt6xPJO2UqTPJtBIgnUqQDx7KvG++RVHNssVTFVNUqEdZ5lsv8ArXJVO5ODt6+iP36hSgqlQmoQlQhbryV/n19I/ZFIl1TY9F7VS1dZDyr/AKNu+la/iLV4+0qu0WI8kB+Xvf3X/WtMl0VI9VH5V/nif3K/buVEWiJNVQ7sbVfDYi3cQkDMocdTITDAjr0Mjvq7gCFDTYr1LymYMXMC7Ea2mV1PZqFPuY0iM+0mPGSwHk42Xy2MQkStkcoeyRog+kQf3ac82CowZrf7c3l5LaGFsTzGBFzxuc237Cv+qlNbdpKuTnZUPld2V+axKj/+T+9kP2x6xVojyVZBzVj5KNo58M9knWy+noPLD/Vn91VkGd1ZhyWF3l2GV2i9hBHKXAU9G6QRHcCSP3aa13s3SyM7L03fHFjCbPcJpzBZt/vDLp4LJ9VJbm5NcbBUvkf+b3/70fYFWl1CrHoqa5/6g/xR/BFW/wDrUfvrY7+bv3MbZtpaZFKXM5zkgRlZdIB15wpbHBpzV3C4WI+K/Ff7yz9Jv+2mcUJfDKrr+zXwN9EulXa0UxSZJgqrfKLqBqVTN/h99WB3goIsV6ltLBWNpYUAOTbYh1dCJVhPEHr1IIPbSAS0ppAcFhsV5NMTaYPhryOVIZcw5NgVMg/rAmQONNEoOqpuEaKh3o2jtD8xjWeCcwVkQBo61dF149RqzQ3UKpLtCs3VlVd2LRdlReLEAeJMCe6pQpcffDNzegoCp6C6Ax2nVj3sagIQs1KEpoQnBoQt35K/nC+kfsikSaprNF7TS1dZDyrD/Zt30rX8RauztKHaLDeSD5xd/uv+taZLoqR6peVgflaf3K/buVEWiJNVmth7Pa/ftWkElmE9ygjMx7gKYTYXVALr1jylYsJgLg67jIg7+cGPuU1njHtJr9EP5LNl8lheVYc6+2bvyLKr78x/eFTIbmyGDJdbY3At4i+99r91Xcg80LzYACgSOoAeypbJYWQWXzV7vDsv4Rhblk6ll0J88aqfpAVRpsbqSLheVeTfaJs45UaQLoNpgepuKz35hHrp0guEthzXpuO2CLmNw+K0+SR1PaT/AGfsz3D7KSHezZMIzusR5X9pTcs4cHRQbjek3NT2AN9KmRDmqSHkrLyPH5C//ej7AqJdQrM0VPf/APUH+Kv8EVb/AOtV/fWo8pe172Gw9p7Fw22a6FJCq0rkcxDAjio9lLjaCc1Z5IGS86/HjH/8S3+Xb/7Kdw2qm8VHs7EX8djLIuXQbhOUM4AGVQzZSEA0Oo/eoyaFGbirLb27+J2Xlu2r5Cu5WbZZYgSofqaRPHsqA4OyUkFqk2T5SMVbI5bLeTrlQrx3MsCfEUGIclIeVuvKHhUu7Pusw1QC4hI1UyPrBI9dKYbOVnDJeIGtCUisFzVuXOxci+lclfsC564qUISoUJqlCVCEhQhbvyV/OF9I/ZFIk1TWaL2qlq6x/lXP+zbvpWv4i1dnaUO0Xnvkw2lasX7jXri2wbcAsYBOZTFMkBIyVGGy3mP2jsu8wa8+GuMBALEEgamPeaUA8aK5LSo03j2ZhVJstaE8RYSWbskqPrNG692qi7QvPt5942x99ASLVoEKoJ0QMQGdz2x7AI8XNbuhULrlbXebenC28C9rC3kZsgtIqHVVgKT6lmltaS65Vi4WyXkgc9pp6UvRfJtvPas2rlnEXAgDB0LHjmEMB4FQf3jSZGk6JrXAarM71XrS417uFuKysy3VK8FeZI+kCfWKu29rFVNr5L1PDb7YJkUtfRSQCVMypI1B06qTuFM3gvH95tpfCMVeu9TMcvoLzV9wFPaLCySTcrYeTLb+Hw1q8t+6tss4IBBMjLE6A0uRpJyV2EAKsvbXs/hn4QLg5HlFbPBiOTAJiJ491Wsdyyi43rreY3erZl0Bbty1cAMgXLRcAwRIDIYME+2lBrhor7zShPwxsXzcL/yv/wBdTZ6LtWZ312vg4sNgOSW5buZibVnkyIGhJyiRMaVdgd+8quI5LS7N31wmKsRiwqZjkdXXNaZgAZBgwNZExwPZNULCDkrBwOq5tLsWy3KKcPmGo57XYI1BCEnXwFF3lFmhZrfvfdcSnIWARakF3YQbkGQAvUswdddBV2MtmVVzrrCmmKiKxPNtW187NcPrORfchP71ChBg1KlIVChHYTZVy4uZVEEwJYLmbsWTqasASoLgEI9sqSCCCDBB0II4g1ClbjyV/OF9I/ZFIl1TWaL2qlq6x3la/Rl30rX8VauztKHaLw6zaYozAaJBY9gJgeOpFOL2hwadTp5Z+iRY2uiGwThnUrzra5mEjRRGvf0h7aWKiMta8HJxsPFTum9l3bwFwpngZYJALKGKr0iqEyQOsiquqYxJwze+XI2BOgJ0F1IabXQtPVUTjNnXLWcOuXIwRtRozKWXhxBCkzWeGrhmDTGb7wJHgDY/Amys5hbqmxWBa2JYpqFOUXFLgMoYEoDI0I9tTFUslNmg887EDI2OemqC0hSjY14/q/rrb4iMzLmX1ZSDPfSzXwD97kXaHQGx+eVlPDcgK2KiNxGy7iKWOQgBCwDgsocSmZQZEyKyR1kcj9wXzva4Nju5Gx0yVywhcXtnsqK7MgzKGC8oOUKkwDk49vsq7Klr3ljQcjYmxtcd+igtsLp7mznW2HOWCobLnGfITlDZOME6VDapjpCwXyNr2yuBci/WyncIF0n2cwtC7nt5SYAFwFpAUlcvaAykjvoFU0ymGzr+GVs879DYo3MrpruznW2HJXVQ2XMM+RjlDZesT2UMqmOkMYByNr2yuMyL+CNwgXT3cAVtq7PbGZcyrn+UKyVkL4g+yhlS10hjaDkbE2yBtfVG4bXUF7DsoQn9dcy+EldfWppkcrXlwH7psfGwPoQoIsi0w5VHRo59tL6wfNJ/6GumO6iOVsl93kSD4hBFlxitntbUMzJJCtlDEvDDMCREcCOulxVTZXFrQciRfK1xked9e5SWEZrq9st1QvmQwiXCobnqj5QpII7WXgeuqsrGOeGWOZLQbZEtvcfI62QWG10BFa1VF7V/OsvUkW/oAIfaVJ9dQhB1KE9Qhen7n4ZbmGIbKFXDg2yTEXSXzP6iF9p7aJnEBtlETQS4lYfen5yxIAYqhYDgGKLIq7+0qR9laTyWfOF9I/ZFZpNVoZovaaWrrHeVr9GXfStfxVq7O0odovGNm7Qa0lwJIZwoDA9GGDeuYiq1FKydzC/MNJNutxZKa8tBsp721M1y9cy/nUKRPCcusxr0ffVI6Pcijjv2Df4X/NSX3JPVdYXagWybeRjIYQXm3LcHyMDlYdRUiYE99ZaNz5xKHAZjl7WXK4IuDzuDqVIkAbZVoOtbrJas9pbaN5GUrE3TcDTJC/KEWzpqAbrQe+OyufTYeIHteHaN3bd+Xtee6LhMfJvC3fdNtPa3LIqw4yhBBuBrfMQJITICCYnj1mppaLgPLrjO/wC7Z2Zvmb528EPk3gpre8LBQoQaWjbmeLwqi7w4hERY7uNLdhbS8u3tXb3lmS3wLiT5qeKbW7v7KpRXUS1cY3bfKWimVtVtrzrudF5MATbTKMpOXUyeke2uZBhwil4lxq45NsTvXyJubgX6cgmuluLKLF7Xz2UtEXBkVV0vfJnKZk2svHXt7KvFQiOd0otmSez7WfLevp5Kpku231THa3yHJZDqoGtwtbBDA50tkcxzEEgxqdNakUX/AFHG3uZOgB0tYuGrRyBF9M0b/s7qEbE/JC3HB2eZ85UWI/c99aREBKZb6gD4En6qu9lZFttb5A2ch1VRrcJQQwbOtoiFcxBIPWdNazfYv8fjb2hJ0AOYtYu5tF8gR0zyVt/2bJX9r5rC2SHAVQul5hbMMWk2YgnXj3ChlFuTmYEZm/ZF9LZO1sgvu2ygv45XtIht85Fyh854Zi2qR+0RxpkdO5krnh+Tjci3OwGvkFBdcAWRWHx6O1lWtwQFtF85jkzKNzIjou3XRFTuje4h2RJNrcz3oc4EaLnaG0y6C2ysCgVfzrFJtjLPJHmg6cfGqQUQhkLwRmSeyL5m/a1yUufvCya/tl3Q2zOQ27aBcxKqbeWHVeAJykfvGhlBEyQSDtbzjewud6+RPTO/kEGQkW5IfZiA3bc8AwY+ivOb3Ka2qiFZySSeJ1PieNShNUISqUKxwO2HtLkCo6wQBcTNlDdIDXgezhUhxCoWg5oO9eLsWcyzGSe01CsMlt/Jb84X0j9kUiTVNZovaKWrqq3m2ImMw7WLjMqsVMpGbmsGHEEcRUg2N1BF15bc8mt0MQoYidCSJI9lM4pVeGFz8XF/sb2j7qjilHDCXxcX/Nb2j7qnilG4Evi4v+a3tH3VHFKOGEvi3v8Amt7R91HFKOGEvi3v+a3tH3UcUo3Al8XF/wA1vaPuo4pRuBL4t7/mt7R91HFKNwJfFvf81vaPuo4pRuBL4t7/AJre0fdRxCjcCXxb3/Nb2j7qOKUbgS+Le/5re0fdRxCjcCXxb3/Nb2j7qOIUbgS+Le/5re0fdRxCjcCb4tr/AJre0fdRxSjcCQ8m1/sb2j7qOIUbgUuI8nt93ZipBYliARAJMmPbRxCjcCj+Le/2N7R91HEKNwLuz5PMQpJCnVWXUjg6lT1djGjiFG4Fx8W9/wA1vaPuo4hRuBL4t7/mt7R91HEKNwJfFvf81vaPuo4hRuBL4t7/AJre0fdRxCjcCXxb3+xvav3UcQo3AtFuZupew15Cy80SSxIJJPbHsqhddWAsvR6hSlQhKhCVCEqEJUISoQlQhKhCVCEqEJUISoQlQhKhCVCEqEJUISoQlQhKhCVCEqEJUISoQlQhKhCahC//2Q==

PAUL DAVIES – ¿ CÓMO CONSTRUIR UNA MÁQUINA DEL TIEMPO ? Propone un modelo de máquina basado en el mecanismo de funcionamiento de los agujeros de gusano que hay en el espacio.

https://lh5.googleusercontent.com/-y4dcxuyNz6E/TX1eQWlqohI/AAAAAAAAABs/zRZuKCDbNlI/s1600/PDavies1.jpg
Paul Davies es Profesor de Filosofía Natural en el Centro Australiano de Astrobiología de la Universidad Macquarie. Previamente ocupó cargos académicos en astronomía, física y matemáticas en las universidades de Cambridge, Londres, Newcastle y Adelaida. Sus investigaciones han tocado los campos de la cosmología, gravitación, y teoría cuántica de campos, con un énfasis particular en los agujeros negros y el origen del universo. Su monográfico Campos Cuánticos en un Espacio Curvo, cuyo coautor fue el entonces estudiante Nicholas Barrel, sigue siendo ampliamente consultado. Davies también está interesado en la naturaleza del tiempo, la física de partículas de alta energía, los fundamentos de la mecánica cuántica, el origen de la vida y la naturaleza de la conciencia.

 

Además de por sus investigaciones, el profesor Davies es bien conocido como autor, comunicador y conferenciante. Ha escrito más de 25 libros, tanto de divulgación como trabajos de especialidad. Sus obras han sido traducidas a más de veinte idiomas. Entre sus trabajos más conocidos están Dios y la Nueva Física, El Plano Cósmico, La Mente de Dios, Los Últimos Tres Minutos, Sobre el Tiempo y ¿Estamos solos? Su último libro es ¿Cómo Construir una Máquina del Tiempo? También hay que destacar su popular informe sobre Astrobiología, publicadooriginalmente bajo el título El Quinto Milagro, que ahora ha vuelto a ver la luz, en edición revisada, con el título El Origen de la Vida. En
reconocimiento a su trabajo de autor, en 1999 fue elegido Miembro de la Royal Society of Literature.

 

Hasta hace bien poco, viajar en el tiempo era una cuestión exclusiva de la ciencia-ficción.Uno de los anhelos del hombre ha sido poder viajar hacia el futuro, y por qué no, también hacia el pasado.
Hasta el momento, estos viajes estaban reservados para el celuloide y para la imaginación de los más fantasiosos. Ahora, la física empieza a darnos claves y herramientas para empezar a pensar en serio que un día no muy lejano podremos viajar en el tiempo.
Los expertos en el tema pronostican que, seguramente, algún día podremos viajar al futuro sin problemas, eso sí, lo de viajar de regreso al pasado aún está bastante más lejano.Hoy en día sabemos que lo de programar una máquina del tiempo tiene mucho que ver con el tiempo relativo y con los agujeros de gusano.

 

Para abordar este apasionante tema, Eduard Punset entrevista en este programa a Paul Davies, conocido físico y autor del libro «Cómo construir una máquina del tiempo». Davies propone un modelo de máquina basado en el mecanismo de funcionamiento de los agujeros de gusano que hay en el espacio. Los agujeros de gusano son parecidos a los agujeros negros con la única diferencia que mientras de los agujeros negros no se sale, de los agujeros de gusano se llega a otro espacio y a otro tiempo, por lo que en un futuro se pueden convertir en auténticas máquinas del tiempo. El problema es encontrar agujeros de gusano en el espacio y controlar su funcionamiento.

 

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

Davies es, además, profesor del Centro de Astrobiología de Sydney. En el plató junto a Eduard Punset intervendrán Francisco J. Ynduráin, catedrátrico de la Universidad Autónoma de Madrid y Juan García Bellido, profesor de la Universidad Autónoma de Madrid.

https://i.ytimg.com/vi/PMwtETPHZx8/hqdefault.jpg?custom=true&w=246&h=138&stc=true&jpg444=true&jpgq=90&sp=68&sigh=s90PzRsYt9oCrUCgwNAvegxIs4c

6:59

Redes – La máquina del tiempo – Part 1

https://i.ytimg.com/vi/3pQrRfwnyI8/hqdefault.jpg?custom=true&w=246&h=138&stc=true&jpg444=true&jpgq=90&sp=68&sigh=bAyqNICbLhMOR7rmCLq9uw0N13Q

6:56

Redes – La máquina del tiempo – Part 2

https://i.ytimg.com/vi/8kepAxOgLGA/hqdefault.jpg?custom=true&w=246&h=138&stc=true&jpg444=true&jpgq=90&sp=68&sigh=wgG7BIZ-w_amtxDNJ-JgkALBfWQ

7:23

Redes – La máquina del tiempo – Part 3

Más de un viajero del tiempo, ha dejado sus marcas y dan fe de que son toda una realidad. ( Ooparts , objetos fuera de tiempo , que aparecen donde no deberían de estar ) .

 


1-http://www.tendencias21.net/La-maquina-del-tiempo-es-cuestion-de-dinero-y-no-de-fisica_a262.html LA MÁQUINA DEL TIEMPO ES CUESTIÓN DE DINERO Y NO DE FÍSICA – STEPHEN CAUCHI

2-http://www.tendencias21.net/El-primer-viaje-en-el-tiempo-tendra-lugar-este-siglo_a958.html EL PRIMER VIAJE EN EL TIEMPO TENDRÁ LUGAR ESTE SIGLO – MARIO TOBOSO

3-http://lighthousebcn.es/?p=319  LA MÁQUINA DEL TIEMPO DE RONALD MALLET – MARIO TOBOSO

4-http://viajeparanormal.blogspot.com.es/2013/09/cientificos-afirman-que-ya-se-puede.html CIENTÍFICOSAFIRMAN QUE YA SE PUEDE CONSTRUIR MÁQUINA DEL TIEMPO

5-http://eltamiz.com/elcedazo/2009/07/28/los-problemas-filosoficos-del-viaje-en-el-tiempo/ LOS PROBLEMAS FILOSÓFICOS DEL VIAJE EN EL TIEMPO .

6-https://www.lagranepoca.com/ciencia-y-tecnologia/93703-viajar-en-el-tiempo-es-posible-como-enviar-un-mensaje-al-pasado.html VIAJAR EN EL TIEMPO ES POSIBLE : CÓMO ENVIAR UN MENSAJE AL PASADO – TARA MACISAAC.

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