Legendre symbols related to Dp(b,1)
Abstract
Let p be an odd prime. For any b,c∈Z, Z.-W. Sun introduced the new-type determinant Dp(b,c)=|(i2+bij+cj2)p-2|1≤slant i,j≤slant p-1, and studied its arithmetic properties. In this paper we mainly prove that (Dp(b,1)p)=(2bp) when (b2-4p)=-1 and p1 4. As an application of our result, we confirm several conjectures of Sun.
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