An application of Baker's method to the Je\'smanowicz' conjecture on primitive Pythagorean triples
Abstract
Let m, n be positive integers such that m>n, (m,n)=1 and m n 2. In 1956, L. Je\'smanowicz Jes conjectured that the equation (m2 - n2)x + (2mn)y = (m2+n2)z has only the positive integer solution (x,y,z) = (2,2,2). This problem is not yet solved. In this paper, combining a lower bound for linear forms in two logarithms due to M. Laurent Lau with some elementary methods, we prove that if mn 2 4 and m > 30.8 n, then Je\'smanowicz' conjecture is true.
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