English

Differential transcendence criteria for second-order linear difference equations and elliptic hypergeometric functions

Number Theory 2021-01-22 v3 Mathematical Physics Commutative Algebra math.MP

Abstract

We develop general criteria that ensure that any non-zero solution of a given second-order difference equation is differentially transcendental, which apply uniformly in particular cases of interest, such as shift difference equations, q-dilation difference equations, Mahler difference equations, and elliptic difference equations. These criteria are obtained as an application of differential Galois theory for difference equations. We apply our criteria to prove a new result to the effect that most elliptic hypergeometric functions are differentially transcendental.

Keywords

Cite

@article{arxiv.1809.05416,
  title  = {Differential transcendence criteria for second-order linear difference equations and elliptic hypergeometric functions},
  author = {Carlos E. Arreche and Thomas Dreyfus and Julien Roques},
  journal= {arXiv preprint arXiv:1809.05416},
  year   = {2021}
}
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