Non-modular elliptic curves and congruents numbers of pythagorean

The article « Non-modular elliptic curves and congruents numbers of Pythagorean» - the play-off to dramatic history of the determination of real existence of the simple proof Fermat’s Last Theorem. Known italian mathematician Paulo Ribenboym wrote in its book Fermat's Last Theorem: «Some mathematicians not satisfied method proof, using elliptical curves and modular of the form, as alien this problem. Wholly reasonable problem to try to find another, more idle time proof Fermat's Last Theorem». Known american mathematician Harold M Edwards wrote also about this in its book Fermat's Last Theorem: "Certainly, wholly possible that best european mathematicians approached to problem false fetter and that exists some simple idea - possible openning Fermat, acceptable to all events." Such idea was offered by author of this article Her have blocked the known mathematicians to Russia, which approached to problem false fetter. The Copies blocking documents reader will find on put http://yvsevolod-28.narod.ru/index.html. In spite of official blocking, the idea was published in book, published in russian and english. The Role of the key to asked a decision of the problem execute primitiv and congruents of the numbers of Pythagorean. :In proposed article is described proof of real existence endless ensemble non-modular elliptical curves. The mail goal of the article is to consider to common solution the system equations of P.Fermat, G.Frey and its application to the non-modular elliptic curves. It is exact proof for the facts: Hypothesis of G.Shimura-Y. Taniyama: All elliptic curves is modular curves – it is wrong. Proof of A.Wiles for Last Theorem of P.Fermat is doubtful.