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QDifferenceEquations[QRationalCanonicalForm] - construct four q-rational canonical forms of a rational function
Calling Sequence
QRationalCanonicalForm[1](F, q, n)
QRationalCanonicalForm[2](F, q, n)
QRationalCanonicalForm[3](F, q, n)
QRationalCanonicalForm[4](F, q, n)
Parameters
F
-
rational function of n
q
name used as the parameter q, usually q
n
variable
Description
Let F be a rational function of n over a field K of characteristic 0, q is a nonzero element of K which is not a root of unity. The QRationalCanonicalForm[i](F,q,n) command constructs the th rational canonical form for F, .
If QRationalCanonicalForm is called without an index, the first q-rational canonical form is constructed.
The output is a sequence of 5 elements , called , where z is an element of K, and are monic polynomials over K such that:
, .
for all integers .
Note: Q is the automorphism of K(n) defined by .
The five-tuple that satisfies the four conditions is a strict q-rational normal form for F. The rational function and are called the kernel and the shell of the , respectively.
Let be any qRNF of a rational function F. Then the degrees of the polynomials r and s are unique, and have minimal possible values in the sense that if where p, q are polynomials in n, and G is a rational function of n, then and .
Additionally, if then is minimal; if then is minimal; if then is minimal, and under this condition, is minimal; if then is minimal, and under this condition, is minimal.
Examples
Check the result from QRationalCanonicalForm[2].
Condition 1 is satisfied.
Condition 2 is satisfied.
Condition 3 is satisfied.
Condition 4 is satisfied.
Degrees of the kernel:
The degree of v1 is minimal:
The degree of u2 is minimal:
For , the degree of the shell is minimal:
See Also
QDifferenceEquations[QDispersion], QDifferenceEquations[QEfficientRepresentation], QDifferenceEquations[QMultiplicativeDecomposition], QDifferenceEquations[QPolynomialNormalForm]
References
Abramov, S.A.; Le, H.Q.; and Petkovsek, M. "Efficient Representations of (q-)Hypergeometric Terms and the Assignment Problem." Submitted.
Abramov, S.A.; Le, H.Q.; and Petkovsek, M. "Rational Canonical Forms and Efficient Representations of Hypergeometric Terms." Proc. ISSAC'2003, pp. 7-14. 2003.
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