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Integrals of logarithmic and hypergeometric functions

Anthony Sofo (2016)

Communications in Mathematics

Integrals of logarithmic and hypergeometric functions are intrinsically connected with Euler sums. In this paper we explore many relations and explicitly derive closed form representations of integrals of logarithmic, hypergeometric functions and the Lerch phi transcendent in terms of zeta functions and sums of alternating harmonic numbers.

Legendre polynomials and supercongruences

Zhi-Hong Sun (2013)

Acta Arithmetica

Let p > 3 be a prime, and let Rₚ be the set of rational numbers whose denominator is not divisible by p. Let Pₙ(x) be the Legendre polynomials. In this paper we mainly show that for m,n,t ∈ Rₚ with m≢ 0 (mod p), P [ p / 6 ] ( t ) - ( 3 / p ) x = 0 p - 1 ( ( x ³ - 3 x + 2 t ) / p ) ( m o d p ) and ( x = 0 p - 1 ( ( x ³ + m x + n ) / p ) ) ² ( ( - 3 m ) / p ) k = 0 [ p / 6 ] 2 k k 3 k k 6 k 3 k ( ( 4 m ³ + 27 n ² ) / ( 12 ³ · 4 m ³ ) ) k ( m o d p ) , where (a/p) is the Legendre symbol and [x] is the greatest integer function. As an application we solve some conjectures of Z. W. Sun and the author concerning k = 0 p - 1 2 k k 3 k k 6 k 3 k / m k ( m o d p ² ) , where m is an integer not divisible by p.

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