On two congruence conjectures of Z.-W. Sun involving Franel numbers
Abstract
In this paper, we mainly prove the following conjectures of Z.-W. Sun S13: Let p>2 be a prime. If p=x2+3y2 with x,y∈Z and x1 3, then x14Σk=0p-1(3k+4)fk 2k12Σk=0p-1(3k+2)fk(-4)kp2, and if p13, then Σk=0p-1fk2kΣk=0p-1fk(-4)kp3, where fn=Σk=0nnk3 stands for the nth Franel number.
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