English

An Additive Decomposition in S-Primitive Towers

Symbolic Computation 2020-10-20 v1

Abstract

We consider the additive decomposition problem in primitive towers and present an algorithm to decompose a function in an S-primitive tower as a sum of a derivative in the tower and a remainder which is minimal in some sense. Special instances of S-primitive towers include differential fields generated by finitely many logarithmic functions and logarithmic integrals. A function in an S-primitive tower is integrable in the tower if and only if the remainder is equal to zero. The additive decomposition is achieved by viewing our towers not as a traditional chain of extension fields, but rather as a direct sum of certain subrings. Furthermore, we can determine whether or not a function in an S-primitive tower has an elementary integral without solving any differential equations. We also show that a kind of S-primitive towers, known as logarithmic towers, can be embedded into a particular extension where we can obtain a finer remainder.

Cite

@article{arxiv.2002.02355,
  title  = {An Additive Decomposition in S-Primitive Towers},
  author = {Hao Du and Jing Guo and Ziming Li and Elaine Wong},
  journal= {arXiv preprint arXiv:2002.02355},
  year   = {2020}
}

Comments

This article has been submitted to ISSAC2020 for review. Supplementary material at https://wongey.github.io/add-decomp-sprimitive/

R2 v1 2026-06-23T13:33:15.571Z