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Gnudist
2006-01-01 18:52:20
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127
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| Akkor menj es jelentkezz a dijert:D |
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A hozzászólás:
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iszugyi
2006-01-01 09:02:18
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126
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"One of the great open problems of modern mathematical physics is whether the Standard Model of particle physics is mathematically consistent. "
A problémát megoldottam: a Standard Modell se fizikailag se matematikailag konzisztens. |
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Előzmény:
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Simply Red
2005-12-30 15:38:57
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124
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Ugyanez John Baez megfogalmazásában:
5. Existence and mass gap for Yang-Mills theory.
One of the great open problems of modern mathematical physics is whether the Standard Model of particle physics is mathematically consistent. It's not even known whether "pure" Yang-Mills theory - uncoupled to fermions or the Higgs - is a well-defined quantum field theory with reasonable properties. To make this question precise, people have formulated various axioms for a quantum field theory, like the so-called "Haag-Kastler axioms". The job of constructive quantum field theory is to mathematically study questions like whether we can construct Yang-Mills theory in such a way that it satisfies these axioms. But one really wants to know more: at the very least, existence of Yang-Mills theory coupled to fermions, together with a "mass gap" - i.e., a nonzero minimum mass for the particles formed as bound states of the theory (like protons are bound states of quarks).
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Ha kedveled azért, ha nem azért nyomj egy lájkot a Fórumért!
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