NON-MODULAR ELLIPTIC CURVES - WAY FOR SOLUTIONS OF PROBLEMS OF P.FERMAT, G.FREY, A.POINCARE AND A.BEAL.

© V.S.Yarosh

The state unitary enterprise “All-russian research institute For optical and physical measurements” (sue “VNIIOFI”)

Contact to the author: vs.yarosh@mtu-net.ru

Abstract

The mail goal of the article is to consider to common solution the system equations of P.Fermat, G.Frey and A.Beal and its application to the non-modular elliptic curves. It is exact proof for the facts:

2. Proof of A.Wiles for Last Theorem of P.Fermat is doubtful.

Introduction

It is known :

1. David Hilbert, while solving the problem of Gordan’s invariants, presented a universal formulation of this problem :

«Is given an endless system of forms of a finite number of variables. Under what circumstances exists a finite system of forms through which all others are expressed in the form of linear combinations as rational functions of the variables»

Universality of the given formulation lies in the fact that it contain in a generalized form the description of a final solution of the Last Theorem Fermat’s.

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