On Fermat's marginal note: a suggestion

Abstract

A suggestion is put forward regarding a partial proof of FLT(case1), which is elegant and simple enough to have caused Fermat's enthusiastic remark in the margin of his Bachet edition of Diophantus' "Arithmetica". It is based on an extension of Fermat's Small Theorem (FST) to mod pk for any k>0, and the cubic roots of 1 mod pk for primes p=1 mod 6. For this solution in residues the exponent p distributes over a sum, which blocks extension to equality for integers, providing a partial proof of FLT case1 for all p=1 mod 6. This simple solution begs the question why it was not found earlier. Some mathematical, historical and psychological reasons are presented. . . . . In a companion paper, on the triplet structure of Arithmetic mod pk, this cubic root solution is extended to the general rootform of FLT (mod pk) (case1), called "triplet". While the cubic root solution (a3=1 mod pk) involves one inverse pair: a+a-1 = -1 mod pk, a triplet has three inverse pairs in a 3-loop: a+b-1 = b+c-1 = c+a-1 = -1 (mod pk) where abc = 1 (mod pk), which reduces to the cubic root form if a=b=c (≠ 1) mod pk. The triplet structure is not restricted to p-th power residues (for some p ≥ 59) but applies to all residues in the group Gk(.) of units in the semigroup of multiplication mod pk.

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