A Riemann--Hilbert approach to Painlev\'e IV

Abstract

This paper applies methods of Van der Put and Van derPut-Saito to the fourth Painlev\'e equation. One obtains a Riemann--Hilbert correspondence between moduli spaces of rank two connections on P1 and moduli spaces for the monodromy data. The moduli spaces for these connections are identified with Okamoto--Painlev\'e varieties and the Painlev\'e property follows. For an explicit computation of the full group of B\"acklund transformations, rank three connections on P1 are introduced, inspired by the symmetric form for PIV as was studied by M. Noumi and Y. Yamada.