Additive Decompositions in Primitive Extensions
Symbolic Computation
2018-02-08 v1
Abstract
This paper extends the classical Ostrogradsky-Hermite reduction for rational functions to more general functions in primitive extensions of certain types. For an element in such an extension , the extended reduction decomposes as the sum of a derivative in and another element such that has an antiderivative in if and only if ; and has an elementary antiderivative over if and only if is a linear combination of logarithmic derivatives over the constants when is a logarithmic extension. Moreover, is minimal in some sense. Additive decompositions may lead to reduction-based creative-telescoping methods for nested logarithmic functions, which are not necessarily -finite.
Keywords
Cite
@article{arxiv.1802.02329,
title = {Additive Decompositions in Primitive Extensions},
author = {Shaoshi Chen and Hao Du and Ziming Li},
journal= {arXiv preprint arXiv:1802.02329},
year = {2018}
}