An elementary proof of a result Ma and Chen
Abstract
In 1956, Jesmanowicz conjectured that, for positive integers m and n with m>n, \, (m,\, n)=1 and m n2, the exponential Diophantine equation (m2-n2)x+(2mn)y=(m2+n2)z has only the positive integer solution (x,\,y,\, z)=(2,\,2,\,2). Recently, Ma and Chen MC17 proved the conjecture if 4|mn and y2. In this paper, we present an elementary proof of the result of Ma and Chen MC17.
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