On Abel's Problem about Logarithmic Integrals in Positive Characteristic

Abstract

Linear differential equations with polynomial coefficients over a field K of positive characteristic p with local exponents in the prime field have a basis of solutions in the differential extension Rp=K(z1, z2, …)(\!( x)\!) of K(x), where x'=1, z1'=1/x and zi'=zi-1'/zi-1. For differential equations of order 1 it is shown that there exists a solution y whose projections yzi+1=zi+2=·s=0 are algebraic over the field of rational functions K(x, z1, …, zi) for all i. This can be seen as a characteristic p analogue of Abel's problem about the algebraicity of logarithmic integrals. Further, the existence of infinite product representations of these solutions is shown. As a main tool pi-curvatures are introduced, generalizing the notion of the p-curvature.