A modular approach to the generalized Ramanujan-Nagell equation
Abstract
Let k be a positive integer. In this paper, using the modular approach, we prove that if k 0 4, 30< k<724 and 2k-1 is an odd prime power, then under the GRH, the equation x2+(2k-1)y=kz has only one positive integer solution (x,y,z)=(k-1,1,2). The above results solve some difficult cases of Terai's conecture concerning this equation.
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