A Pfaffian Proof and Generalization of a Conjecture of Sun Zhiwei

Abstract

Let p be an odd prime, let n=(p-1)/2, and let χ=(·p), with χ(0)=0. For a∈ Fp× define \[ Da(x)=1 i,j n(x+χ(i2-aj)), Da(0)(x)=0 i,j n(x+χ(i2-aj)). \] We prove \[ Da(0)=0 p 3 4 χ(a n!)=1. \] For p34 we also give explicit Pfaffian-square factorizations of Da(x) and Da(0)(x). Let sp=(-1)(p+1)/8. If χ(a n!)=1, then spDa(x)/x=spDa(0)(x) is a positive integer square. If χ(a n!)=-1, then there is a positive integer σ such that \[ spDa(x)=σ2(nx-1), spDa(0)(x)=-σ2(n+(2n+1)x). \] The case a=n! settles Sun's Conjecture 4.1.

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