Add to ORKGAbout seventy years after the original discovery, the six Painleve equations have reappeared in two settings, namely self-similar solutions of integrable hierarchies of ODEs, and random-matrix theory. This talk reports on the case of Painleve VI, proposing an isomonodromic counterpart to Sato's operator, and related Darboux transformations.Non UBCUnreviewedAuthor affiliation: Boston UniversityFacult
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
The six Painleve equations (PI–PVI) were first discovered about a hundred years ago by Painleve and ...
In our previous paper [10] an ergodic theory of Painleve VI is developed and the chaotic nature of i...
About seventy years after the original discovery, the six Painleve equations have reappeared in two ...
Abstract. We will give a quick introduction to isomonodromy and the sixth Painlevé differential equ...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
The six Painleve equations (PI–PVI) were first discovered about a hundred years ago by Painleve and ...
In our previous paper [10] an ergodic theory of Painleve VI is developed and the chaotic nature of i...
About seventy years after the original discovery, the six Painleve equations have reappeared in two ...
Abstract. We will give a quick introduction to isomonodromy and the sixth Painlevé differential equ...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painle...
The six Painleve equations (PI–PVI) were first discovered about a hundred years ago by Painleve and ...
In our previous paper [10] an ergodic theory of Painleve VI is developed and the chaotic nature of i...