In recent work (math.QA/0309252) on multivariate hypergeometric integrals, the author generalized a conjectural integral formula of van Diejen and Spiridonov to a ten parameter integral provably invariant under an action of the Weyl group E_7. In the present note, we consider the action of the affine Weyl group, or more precisely, the recurrences satisfied by special cases of the integral. These are of two flavors: linear recurrences that hold only up to dimension 6, and three families of bilinear recurrences that hold in arbitrary dimension, subject to a condition on the parameters. As a corollary, we find that a codimension one special case of the integral is a tau function for the elliptic Painlevé equation
We give a Jensen–Rohrlich type formula for a certain class of automorphic functions on the hyperboli...
AbstractIn this paper, we prove an analogue of Beurling's theorem for the Laguerre hypergroup, then ...
AbstractThe purpose of this paper is to construct λ-Euler numbers and polynomials by using fermionic...
In recent work (math.QA/0309252) on multivariate hypergeometric integrals, the author generalized a ...
We start from an interpretation of the BC_(2)-symmetric “Type I” (elliptic Dixon) elliptic hypergeom...
AbstractWe undertake a thorough investigation of the moments of Ramanujanʼs alternative elliptic int...
AbstractTextA class of hyperelliptic integrals are expressed through hypergeometric functions, like ...
AbstractIn this paper, we prove some generalisations of several theorems given in [K.A. Driver, S.J....
A class of hyperelliptic integrals are expressed through hypergeometric functions, like those of Gau...
AbstractThe Poincaré–Bertrand formula concerning two repeated Cauchy's principal integrals on a smoo...
AbstractIn this paper, we study the relationship between the generalized Hersch–Pfluger distortion f...
AbstractWe conjecture a hypergeometric identity related to Apéry-like rational approximations to ζ(4...
We discuss the regularization of certain hypergeometric integrals appearing in 2D CFT, a step needed...
AbstractThe object of the present paper is to give two general multiple integral transformations of ...
AbstractWe derive recurrence relationships for the evaluation of two integral transforms which are o...
We give a Jensen–Rohrlich type formula for a certain class of automorphic functions on the hyperboli...
AbstractIn this paper, we prove an analogue of Beurling's theorem for the Laguerre hypergroup, then ...
AbstractThe purpose of this paper is to construct λ-Euler numbers and polynomials by using fermionic...
In recent work (math.QA/0309252) on multivariate hypergeometric integrals, the author generalized a ...
We start from an interpretation of the BC_(2)-symmetric “Type I” (elliptic Dixon) elliptic hypergeom...
AbstractWe undertake a thorough investigation of the moments of Ramanujanʼs alternative elliptic int...
AbstractTextA class of hyperelliptic integrals are expressed through hypergeometric functions, like ...
AbstractIn this paper, we prove some generalisations of several theorems given in [K.A. Driver, S.J....
A class of hyperelliptic integrals are expressed through hypergeometric functions, like those of Gau...
AbstractThe Poincaré–Bertrand formula concerning two repeated Cauchy's principal integrals on a smoo...
AbstractIn this paper, we study the relationship between the generalized Hersch–Pfluger distortion f...
AbstractWe conjecture a hypergeometric identity related to Apéry-like rational approximations to ζ(4...
We discuss the regularization of certain hypergeometric integrals appearing in 2D CFT, a step needed...
AbstractThe object of the present paper is to give two general multiple integral transformations of ...
AbstractWe derive recurrence relationships for the evaluation of two integral transforms which are o...
We give a Jensen–Rohrlich type formula for a certain class of automorphic functions on the hyperboli...
AbstractIn this paper, we prove an analogue of Beurling's theorem for the Laguerre hypergroup, then ...
AbstractThe purpose of this paper is to construct λ-Euler numbers and polynomials by using fermionic...
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