Regularisation and iterated regularisation of Hamiltonian systems of the second quasi-Painlevé equation

Abstract

In this paper we consider several Hamiltonian functions for the second quasi-Painlevé equation. One of the features of these functions is that they give rise to the same final chart regular systems once using certain blowups and twists in the regularisation procedure. We also discuss what happens if we iterate the blowup process for these final chart systems. Using birational transformations between different Hamiltonian systems we show how to construct new Hamiltonian functions which give rise to the second quasi-Painlevé equation with shifted coefficients. We also give an explicit example of the Bäcklund transformation.