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RationalNormalForms[MinimalRepresentation] - construct the first and second minimal representations of a hypergeometric term
Calling Sequence
MinimalRepresentation[1](H, n, k)
MinimalRepresentation[2](H, n, k)
Parameters
H
-
hypergeometric term in n
n
variable
k
name
Description
The MinimalRepresentation[1](H,n,k) and MinimalRepresentation[2](H,n,k) functions construct the first and second minimal representations for H, where H be a hypergeometric term in n. respectively.
If is a hypergeometric term such that , a rational function in n for all , then , . If is a rational normal form of , then , where .
Note: and are of minimal possible degrees.
The first and second minimal representations of are constructed from the first and second canonical forms of , respectively.
This function is part of the RationalNormalForms package, and so it can be used in the form MinimalRepresentation(..) only after executing the command with(RationalNormalForms). However, it can always be accessed through the long form of the command by using RationalNormalForms[MinimalRepresentation](..).
Examples
See Also
RationalNormalForms[IsHypergeometricTerm], RationalNormalForms[RationalCanonicalForm]
References
Abramov, S., and Petkovsek, M. "Canonical Representations of Hypergeometric Terms." In Proceedings of FPSAC '01, 1-10. Edited by H. Barcelo and V. Welker. Tucson: University of Arizona Press, 2001.
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