On determinants involving (j+kp)(j-kp)
Abstract
Let p=2n+1 be an odd prime. In this paper, we mainly evaluate determinants involving ( j+kp)(j-kp), where (·p) denotes the Legendre symbol. When p14, we determine the characteristic polynomials of the matrices [(j+kp)+(j-kp)]1 j,k n\ \ and\ \ [(j+kp)-(j-kp)]1 j,k n, and also establish the general identity align* &\ |x+(j+kp)+(j-kp)+( jp)y+( kp)z+(jkp)w|1 j,k n \\=&\ (-p)(p-5)/4((p-12)2wx-(p-12y-1)(p-12z-1)). align*
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