Add to ORKGWe study the sixth $q$-difference Painlev\'e equation ($q{\textrm{P}_{\textrm{VI}}}$) through its associated Riemann-Hilbert problem (RHP) and show that the RHP is always solvable for irreducible monodromy data. This enables us to identify the solution space of $q{\textrm{P}_{\textrm{VI}}}$ with a monodromy manifold for generic parameter values. We deduce this manifold explicitly and show it is a smooth and affine algebraic surface when it does not contain reducible monodromy. Furthermore, we describe the RHP for reducible monodromy data and show that, when solvable, its solution is given explicitly in terms of certain orthogonal polynomials yielding special function solutions of $q{\textrm{P}_{\textrm{VI}}}$.Comment: 44 pages, 1 figure, Se...
A systematic construction of isomonodromic families of connections of rank two on the Riemann sphere...
A systematic construction of isomonodromic families of connections of rank two on the Riemarm sphere...
The methods of [vdP-Sa, vdP1, vdP2] are applied to the fourth Painleve equation. One obtains a Riema...
We formulate a geometric Riemann-Hilbert correspondence that applies to the derivation by Jimbo and ...
We formulate a geometric Riemann-Hilbert correspondence that applies to the derivation by Jimbo and ...
The Riemann-Hilbert approach for the equations PIII(D-6) and PIII(D-7) is studied in detail, involvi...
Abstract. A solution to the sixth Painleve equation (P6) corresponding to the quantum cohomology of ...
ABSTRACT. In this note, we will give a brief summary of geometric approach to understanding equation...
In a recent paper [1], we classified the critical behaviour of solutions of the discrete Painleve eq...
In a recent paper [1], we classified the critical behaviour of solutions of the discrete Painleve eq...
The inverse monodromy method for studying the Riemann-Hilbert problem associated with classical Pain...
The D7 degeneration of the Painleve-III equation has solutions that are rational functions of $x^{1/...
A systematic construction of isomonodromic families of connections of rank two on the Riemarm sphere...
A systematic construction of isomonodromic families of connections of rank two on the Riemarm sphere...
A systematic construction of isomonodromic families of connections of rank two on the Riemarm sphere...
A systematic construction of isomonodromic families of connections of rank two on the Riemann sphere...
A systematic construction of isomonodromic families of connections of rank two on the Riemarm sphere...
The methods of [vdP-Sa, vdP1, vdP2] are applied to the fourth Painleve equation. One obtains a Riema...
We formulate a geometric Riemann-Hilbert correspondence that applies to the derivation by Jimbo and ...
We formulate a geometric Riemann-Hilbert correspondence that applies to the derivation by Jimbo and ...
The Riemann-Hilbert approach for the equations PIII(D-6) and PIII(D-7) is studied in detail, involvi...
Abstract. A solution to the sixth Painleve equation (P6) corresponding to the quantum cohomology of ...
ABSTRACT. In this note, we will give a brief summary of geometric approach to understanding equation...
In a recent paper [1], we classified the critical behaviour of solutions of the discrete Painleve eq...
In a recent paper [1], we classified the critical behaviour of solutions of the discrete Painleve eq...
The inverse monodromy method for studying the Riemann-Hilbert problem associated with classical Pain...
The D7 degeneration of the Painleve-III equation has solutions that are rational functions of $x^{1/...
A systematic construction of isomonodromic families of connections of rank two on the Riemarm sphere...
A systematic construction of isomonodromic families of connections of rank two on the Riemarm sphere...
A systematic construction of isomonodromic families of connections of rank two on the Riemarm sphere...
A systematic construction of isomonodromic families of connections of rank two on the Riemann sphere...
A systematic construction of isomonodromic families of connections of rank two on the Riemarm sphere...
The methods of [vdP-Sa, vdP1, vdP2] are applied to the fourth Painleve equation. One obtains a Riema...