2015
DOI: 10.1016/j.jsc.2014.08.005
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On the existence of telescopers for mixed hypergeometric terms

Abstract: We present a criterion for the existence of telescopers for mixed hypergeometric terms, which is based on multiplicative and additive decompositions. The criterion enables us to determine the termination of Zeilberger's algorithms for mixed hypergeometric inputs.

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Cited by 27 publications
(18 citation statements)
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“…Lemma 5. 16. Let (F, σ) be a difference field with K = const(F, σ), and let (E, σ) be a basic RΠΣ * -extension of (F, σ) given in the form (4.2) where the R-monomial y has order n with α = σ(y) y ∈ K. Let e 0 , .…”
Section: Further Characterizations Of Rπς * -Extensions: the Interlacmentioning
confidence: 99%
“…Lemma 5. 16. Let (F, σ) be a difference field with K = const(F, σ), and let (E, σ) be a basic RΠΣ * -extension of (F, σ) given in the form (4.2) where the R-monomial y has order n with α = σ(y) y ∈ K. Let e 0 , .…”
Section: Further Characterizations Of Rπς * -Extensions: the Interlacmentioning
confidence: 99%
“…We now consider the exactness testing problem in the case when ∂ x = ∆ x,q and ∂ y = ∆ y . To this end, we first recall a lemma which is a special case of Lemma 5.4 in [10]. Let f ∈ k(x, y).…”
Section: Exactness Criteriamentioning
confidence: 99%
“…Both articles also discuss the trading of order for degree, i.e., the option of computing an equation with lower coefficient degree at the cost of a larger order and vice versa; this trade-off can be used to reduce the complexity of the algorithms. The question of existence criteria for creative telescoping relations for mixed hypergeometric terms was answered in [26]. Concerning new creative telescoping algorithms, the use of residues for the computation of telescopers has been investigated in [30] for rational functions and in [29] for algebraic functions.…”
Section: History and Developmentsmentioning
confidence: 99%