On a generalization of R. Chapman's "evil determinant"
Abstract
Let p be an odd prime and x be an indeterminate. Recently, Z.-W. Sun proposed the following conjecture: [x+(j-ip)]0 i,j p-12=cases (2p)pbpx-ap & if\ p 14, 1 & if\ p 34, cases where ap and bp are rational numbers related to the fundamental unit and class number of the real quadratic field Q(p). In this paper, we confirm the above conjecture of Sun based on Vsemirnov's decomposition of Chapman's "evil determinant".
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