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Related papers: Hypergeometric solutions to the q-Painlev\'e equat…

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The Riemann-Hilbert approach for the equations ${\rm PIII(D_6)}$ and ${\rm PIII(D_7)}$ is studied in detail, involving moduli spaces for connections and monodromy data, Okamoto-Painlev\'e varieties, the Painlev\'e property, special…

Algebraic Geometry · Mathematics 2014-04-24 Marius van der Put , Jaap Top

We establish interpolation problems related to all the $q$-Painlev\'e equations of types from $E_7^{(1)}$ to $(A_2+A_1)^{(1)}$. By solving those problems, we can derive the evolution equations, the scalar Lax pairs and the determinant…

Mathematical Physics · Physics 2016-01-07 Hidehito Nagao

We construct a family of second-order linear difference equations parametrized by the hypergeometric solution of the elliptic Painlev\'e equation (or higher-order analogues), and admitting a large family of monodromy-preserving…

Classical Analysis and ODEs · Mathematics 2011-09-12 Eric M. Rains

Starting with a Riccati equation solved by hypergeometric functions, some sequences of rational solutions to Painleve' VI are obtained.

Classical Analysis and ODEs · Mathematics 2007-05-23 Gert Almkvist

The solutions of the discrete Painlev\'e equation I were constructed in terms of elliptic and hyperelliptic $\psi$ functions for algebraic curves of genera one and two. For the case of genus two, there appear higher order difference…

Mathematical Physics · Physics 2009-11-07 Shigeki Matsutani

In our previous work, a unified description as polynomial Hamiltonian systems was established for a broad class of the Schlesinger systems including the sixth Painleve equation and Garnier systems. The main purpose of this paper is to…

Classical Analysis and ODEs · Mathematics 2010-09-15 Teruhisa Tsuda

In a recent work, we proposed the coupled Painlev\'e VI system with $A^{(1)}_{2n+1}$-symmetry, which is a higher order generalization of the sixth Painlev\'e equation ($P_{\rm VI}$). In this article, we present its particular solution…

Mathematical Physics · Physics 2014-11-20 Takao Suzuki

This paper examines some solutions for confluent and double-confluent Heun equations. In the first place, we review two Leaver's solutions in series of regular and irregular confluent hypergeometric functions for the confluent equation and…

Mathematical Physics · Physics 2011-01-27 Lea Jaccoud El-Jaick , Bartolomeu D. B. Figueiredo

We investigate the integral representations of solutions to the variant of $q$-hypergeometric equation of degree 2 obtained through $q$-middle convolution by using transformation formulas for $q$-hypergeometric series. We show the…

Classical Analysis and ODEs · Mathematics 2026-02-27 Yumi Arai

We examine the power-series solutions and the series solutions in terms of the Hermite functions for the biconfluent Heun equation. Infinitely many cases for which a solution of the biconfluent equation is presented as an irreducible linear…

Classical Analysis and ODEs · Mathematics 2019-07-31 D. Yu. Melikdzhanian , A. M. Ishkhanyan

We introduce two variants of $q$-hypergeometric equation. We obtain several explicit solutions of variants of $q$-hypergeometric equation. We show that a variant of $q$-hypergeometric equation can be obtained by a restriction of $q$-Appell…

Classical Analysis and ODEs · Mathematics 2021-06-04 Naoya Hatano , Ryuya Matsunawa , Tomoki Sato , Kouichi Takemura

We introduce a configuration of a $q$-difference equation and characterize the variants of the $q$-hypergeometric equation, which were defined by Hatano-Matsunawa-Sato-Takemura, by configurations. We show integral solutions and series…

Classical Analysis and ODEs · Mathematics 2025-10-21 Taikei Fujii , Takahiko Nobukawa

We propose hypergeometric constructions of simultaneous approximations to polylogarithms. These approximations suit for computing the values of polylogarithms and satisfy 4-term Apery-like (polynomial) recursions.

Classical Analysis and ODEs · Mathematics 2009-02-24 Wadim Zudilin

We present the discrete, q-, form of the Painlev\'e VI equation written as a three-point mapping and analyse the structure of its singularities. This discrete equation goes over to P_{VI} at the continuous limit and degenerates towards the…

solv-int · Physics 2007-05-23 B. Grammaticos , A. Ramani

In this paper, a theory of hyperelliptic functions based on multidimensional sigma functions is developed and explicit formulas for hyperelliptic solutions to the Kadomtsev-Petviashvili equations KP-I and KP-II are obtained. The…

Mathematical Physics · Physics 2025-07-21 Takanori Ayano , Victor M. Buchstaber

Some new Hamiltonian systems of quasi-Painlev\'e type are presented and the analogue of Okamoto's space of initial conditions computed. Using the geometric approach that was introduced originally for the identification problem of Painlev\'e…

Classical Analysis and ODEs · Mathematics 2025-12-10 Marta Dell'Atti , Thomas Kecker

As a sequel to Kawakami-Nakamura-Sakai (arXiv:1209.3836), this series of papers constructs the complete degeneration scheme of four-dimensional Painlev\'e-type equations which includes the Painlev\'e-type equations associated with linear…

Classical Analysis and ODEs · Mathematics 2017-03-28 Hiroshi Kawakami

Three $q$-Painlev\'e type equations are derived through degenerations of the $q$-Painlev\'e equation with affine Weyl group symmetry of type $q$-$E_8^{(1)}$. The three $q$-Painlev\'e type equations are associated with different realizations…

Exactly Solvable and Integrable Systems · Physics 2023-04-19 Hidehito Nagao , Yasuhiko Yamada

We solve the metrisability problem for the six Painlev\'e equations, and more generally for all 2nd order ODEs with Painlev\'e property, and determine for which of these equations their integral curves are geodesics of a (pseudo) Riemannian…

Differential Geometry · Mathematics 2018-02-06 Felipe Contatto , Maciej Dunajski

The third, fifth and sixth Painlev\'e equations are studied by means of the weighted projective spaces ${\mathbb C}P^3(p,q,r,s)$ with suitable weights $(p,q,r,s)$ determined by the Newton polyhedrons of the equations. Singular normal forms…

Classical Analysis and ODEs · Mathematics 2016-02-24 Hayato Chiba