A Note on Terai's Conjecture Concerning the Exponential Diophantine Equation x2+by=cz
Abstract
Let (a,b,c) be a primitive Pythagorean triple, i.e., a2+b2=c2 with gcd(a,b,c)=1, a even and b odd. Terai's conjecture says that the Diophantine equation x2+by=cz has only the positive integer solutions (x,y,z)=(a,2,2). In this study, we prove that Terai's conjecture is true when b is a product of two primes and c=5(mod8).
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