On certain determinants and the square root of some determinants involving Legendre Symbols
Abstract
Let p>3 be a prime and (.p) be the Legendre symbol. For any integer d with p d and any positive integer m, Sun introduced the determinants Tm(d,p)=[(i2+dj2)m(i2+dj2p)]1≤slant i,j ≤slant (p-1)/2, and Dp(m)= [(i2-j2)m(i2-j2p)]1≤ i,j≤ (p-1)/2 . In this paper, we obtain some properties of Tm (d,p) and Dp(m) for some m. We also confirm some related conjectures posed by Zhi-Wei Sun.
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