On equations (-1)αpx+(-1)β(2k(2p+1))y=z2 with Sophie Germain prime p

Abstract

In this paper, we consider the Diophantine equation (-1)αpx+(-1)β(2k(2p+1))y=z2 for Sophie Germain prime p with α, β ∈\0,1\, αβ=0 and k≥ 0. First, for p=2, we solve three Diophantine equations (-1)α2x+(-1)β(2k 5)y=z2 by using Nagell-Lijunggren Equation and the database LMFDB of elliptic curve y2=x3+ax+b over Q. Then we obtain all non-negative integer solutions for the following four types of equations for odd Sophie Germain prime p: i) px+(22k+1(2p+1))y=z2 with p 3, 5 8 and k≥ 0; ii) px+(22k(2p+1))y=z2 with p 3 8 and k≥ 1; iii) px-(2k(2p+1))y=z2 with p 3 4 and k≥ 0; iv) -px+(2k(2p+1))y=z2 with p 1, 3, 5 8 and k≥ 1; For each type of the equations, we show the existences of such prime p. Since it was conjectured that there exist infinitely many Sophie Germain primes in literature, it is reasonable to conjecture that there exist infinite Sophie Germain primes p such that p k 8 for any k∈\1,3,5,7\.

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