Algebraic Independence of generic Painlev\'e Transcendents: PIII and PVI

Abstract

We prove that if y"=f(y,y',t) is a generic Painlev\'e equation from the class III and VI, and if y1,...,yn are distinct solutions, then y1,y1',...,yn,yn' are algebraically independent over C(t). This improves the weaker results obtained by the author and Pillay and completely prove the algebraic independence conjecture for the generic Painlev\'e transcendents. In the process, we also prove that any three distinct solutions of a Riccati equation are algebraic independent over C(t), provided that there are no solutions in the algebraic closure of C(t). This answers a very natural question in the theory.