English

On Abel's Problem about Logarithmic Integrals in Positive Characteristic

Number Theory 2024-04-25 v2 Commutative Algebra Classical Analysis and ODEs

Abstract

Linear differential equations with polynomial coefficients over a field KK of positive characteristic pp with local exponents in the prime field have a basis of solutions in the differential extension Rp=K(z1,z2,)( ⁣(x) ⁣)\mathcal{R}_p=K(z_1, z_2, \ldots)(\!( x)\!) of K(x)K(x), where x=1,z1=1/xx'=1, z_1'=1/x and zi=zi1/zi1z_i'=z_{i-1}'/z_{i-1}. For differential equations of order 11 it is shown that there exists a solution yy whose projections yzi+1=zi+2==0y\vert_{z_{i+1}=z_{i+2}=\cdots=0} are algebraic over the field of rational functions K(x,z1,,zi)K(x, z_1, \ldots, z_{i}) for all ii. This can be seen as a characteristic pp 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 pip^i-curvatures are introduced, generalizing the notion of the pp-curvature.

Keywords

Cite

@article{arxiv.2401.14154,
  title  = {On Abel's Problem about Logarithmic Integrals in Positive Characteristic},
  author = {Florian Fürnsinn and Herwig Hauser and Hiraku Kawanoue},
  journal= {arXiv preprint arXiv:2401.14154},
  year   = {2024}
}

Comments

28 pages

R2 v1 2026-06-28T14:27:03.485Z