New representations for all sporadic Apéry-like sequences, with applications to congruences

Abstract: Sporadic Apéry-like sequences were discovered by Zagier, by Almkvist and Zudilin and by Cooper in their searches for integral solutions for certain families of second-and third-order differential equations. We find new representations, in terms of constant terms of powers of Laurent polynomials, for all the 15 sporadic sequences.The new representations in turn lead to binomial expressions for the sequences, which, as opposed to previous expressions, do not involve powers of 8 and powers of 3. We use these to e… Show more

“…In this paper we will only slightly venture beyond the hypergeometric case, where m = 1, by taking m = 2. The interesting operators of this type have been studied by [27,[56][57][58][59][60][61][62]. In those papers the differential equation…”

Analytic periods via twisted symmetric squares

“…In this paper we will only slightly venture beyond the hypergeometric case, where m = 1, by taking m = 2. The interesting operators of this type have been studied by [27,[56][57][58][59][60][61][62]. In those papers the differential equation…”

Analytic periods via twisted symmetric squares

“…In this paper we will only slightly venture beyond the hypergeometric case, where m = 1, by taking m = 2. The interesting operators of this type have been studied by [54][55][56][57][58][59][60][61]. In those papers the differential equation…”

Analytic Periods via Twisted Symmetric Squares