Algebraic solutions of differential equations over the projective line minus three points

Abstract

The Grothendieck--Katz p-curvature conjecture predicts that an arithmetic differential equation whose reduction modulo p has vanishing p-curvatures for almost all p, has finite monodromy. It is known that it suffices to prove the conjecture for differential equations on P1-\0,1,∞\. We prove a variant of this conjecture for P1-\0,1,∞\, which asserts that if the equation satisfies a certain convergence condition for all p, then its monodromy is trivial. For those p for which the p-curvature makes sense, its vanishing implies our condition. We deduce from this a description of the differential Galois group of the equation in terms of p-curvatures and certain local monodromy groups. We also prove similar variants of the p-curvature conjecture for the elliptic curve with j-invariant 1728 minus its identity and for P1-\ 1, i,∞\.