QEfficientRepresentation

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QDifferenceEquations

QEfficientRepresentation

construct the four efficient representations of a q-hypergeometric term

	Calling Sequence
	QEfficientRepresentation[1](H, q, n) QEfficientRepresentation[2](H, q, n) QEfficientRepresentation[3](H, q, n) QEfficientRepresentation[4](H, q, n)

Parameters

H	-	q-hypergeometric term in q^n
q	-	name used as the parameter q, usually q
n	-	variable

Description

•

Let H be a q-hypergeometric term in $q^{n}$ . The QEfficientRepresentation[i](H,q,n) command constructs the ith efficient representation of H of the form $H (n) = C α^{n} V (q^{n}) Q (n)$ where $C$ , $α$ are constant and $Q (n)$ is a product of QPochhammer-function values and their reciprocals. Additionally,

1.	$Q (n)$ has the minimal number of factors,

2.	$V (q^{n})$ is a rational function which is minimal in one sense or another, depending on the particular q-rational canonical form chosen to represent the certificate of $H (q^{n})$ .

•

If $i = 1$ then $degree (denom (V))$ is minimal; if $i = 2$ then $degree (numer (V))$ is minimal; if $i = 3$ then $degree (numer (V)) + degree (denom (V))$ is minimal, and under this condition, $degree (denom (V))$ is minimal; if $i = 4$ then $degree (numer (V)) + degree (denom (V))$ is minimal, and under this condition, $degree (numer (V))$ is minimal.

•	If QEfficientRepresentation is called without an index, the first efficient representation is constructed.

Examples

>	$with (QDifferenceEquations) &colon;$

>	$H ≔ Product (\frac{(q^{k} + q^{2}) (q^{k} + 1) (q^{k} + q^{5} - q^{3}) (q^{k} + q^{4} - q^{2}) (q^{3} q^{k} + q^{2} - 1) (q^{12} q^{k} + q^{2} - 1)}{(q^{k} + q^{5}) {(q^{k} + q^{4})}^{2} (q^{4} q^{k} + 1) (q^{k} + q^{2} - 1) (q^{2} q^{k} + q^{2} - 1)}, k = 0 .. n - 1)$

$H ≔ \prod_{k = 0}^{n - 1} \frac{(q^{k} + q^{2}) (q^{k} + 1) (q^{k} + q^{5} - q^{3}) (q^{k} + q^{4} - q^{2}) (q^{3} q^{k} + q^{2} - 1) (q^{12} q^{k} + q^{2} - 1)}{(q^{k} + q^{5}) {(q^{k} + q^{4})}^{2} (q^{4} q^{k} + 1) (q^{k} + q^{2} - 1) (q^{2} q^{k} + q^{2} - 1)}$

(1)

>	$QEfficientRepresentation [1] (H, q, n)$

$\frac{q^{66} {(q^{n} + \frac{q^{2} - 1}{q^{2}})}^{2} {(q^{3} + q^{n})}^{2} {(q^{4} + q^{n})}^{2} (q + q^{n}) (q^{2} + q^{n}) (q^{n} + \frac{q^{2} - 1}{q^{11}}) (q^{n} + \frac{q^{2} - 1}{q^{10}}) (q^{n} + \frac{q^{2} - 1}{q^{9}}) (q^{n} + \frac{q^{2} - 1}{q^{8}}) (q^{n} + \frac{q^{2} - 1}{q^{7}}) (q^{n} + \frac{q^{2} - 1}{q^{6}}) (q^{n} + \frac{q^{2} - 1}{q^{5}}) (q^{n} + \frac{q^{2} - 1}{q^{4}}) (q^{n} + \frac{q^{2} - 1}{q^{3}}) (q^{n} + \frac{q^{2} - 1}{q}) (q^{2} + q^{n} - 1) {(\frac{{(q^{2} - 1)}^{2}}{q^{6}})}^{n} QPochhammer (\frac{1}{- q^{4} + q^{2}}, q, n) QPochhammer (\frac{1}{- q^{5} + q^{3}}, q, n)}{{(2 q^{2} - 1)}^{2} {(q^{3} + 1)}^{2} {(q^{4} + 1)}^{2} (q + 1) (q^{2} + 1) (q^{11} + q^{2} - 1) (q^{10} + q^{2} - 1) (q^{9} + q^{2} - 1) (q^{8} + q^{2} - 1) (q^{7} + q^{2} - 1) (q^{6} + q^{2} - 1) (q^{5} + q^{2} - 1) (q^{4} + q^{2} - 1) (q^{3} + q^{2} - 1) (q^{2} + q - 1) QPochhammer (- q^{4}, q, n) QPochhammer (- \frac{1}{q^{5}}, q, n)}$

(2)

>	$QEfficientRepresentation [2] (H, q, n)$

$\frac{2 (q^{5} - q^{3} + 1) (q^{2} + q - 1) (q + 1) (q^{2} + 1) {(q^{4} - q^{2} + 1)}^{2} {(q^{3} - q + 1)}^{2} (q^{3} + q^{n}) (q^{4} + q^{n}) {(\frac{{(q^{2} - 1)}^{2}}{q^{6}})}^{n} QPochhammer (- \frac{q^{12}}{q^{2} - 1}, q, n) QPochhammer (- \frac{q^{3}}{q^{2} - 1}, q, n)}{q^{5} (q^{4} + 1) {(q^{3} + q^{n} - q)}^{2} {(q^{n} + q^{4} - q^{2})}^{2} (q^{n} + \frac{1}{q^{3}}) (q^{n} + \frac{1}{q^{2}}) (q^{n} + \frac{1}{q}) (q^{n} + 1) (q^{n} + \frac{q^{2} - 1}{q}) (q^{2} + q^{n} - 1) (q^{n} + q^{5} - q^{3}) QPochhammer (- \frac{1}{q^{4}}, q, n) QPochhammer (- \frac{1}{q^{5}}, q, n)}$

(3)

>	$QEfficientRepresentation [3] (H, q, n)$

$\frac{q^{2} (q^{3} - q + 1) (q^{4} - q^{2} + 1) {(q^{3} + q^{n})}^{2} {(q^{4} + q^{n})}^{2} (q + q^{n}) (q^{2} + q^{n}) (q^{n} + \frac{q^{2} - 1}{q^{2}}) {(\frac{{(q^{2} - 1)}^{2}}{q^{6}})}^{n} QPochhammer (\frac{1}{- q^{5} + q^{3}}, q, n) QPochhammer (- \frac{q^{12}}{q^{2} - 1}, q, n)}{{(q^{3} + 1)}^{2} {(q^{4} + 1)}^{2} (q + 1) (q^{2} + 1) (2 q^{2} - 1) (q^{3} + q^{n} - q) (q^{n} + q^{4} - q^{2}) QPochhammer (- q^{4}, q, n) QPochhammer (- \frac{1}{q^{5}}, q, n)}$

(4)

>	$QEfficientRepresentation [4] (H, q, n)$

$\frac{2 (q^{4} - q^{2} + 1) (q^{3} - q + 1) (q + 1) (q^{2} + 1) (q^{3} + q^{n}) (q^{4} + q^{n}) (q^{n} + \frac{q^{2} - 1}{q^{2}}) {(\frac{{(q^{2} - 1)}^{2}}{q^{6}})}^{n} QPochhammer (- \frac{q^{12}}{q^{2} - 1}, q, n) QPochhammer (\frac{1}{- q^{5} + q^{3}}, q, n)}{q^{4} (2 q^{2} - 1) (q^{4} + 1) (q^{n} + \frac{1}{q^{3}}) (q^{n} + \frac{1}{q^{2}}) (q^{n} + \frac{1}{q}) (q^{n} + 1) (q^{3} + q^{n} - q) (q^{n} + q^{4} - q^{2}) QPochhammer (- \frac{1}{q^{5}}, q, n) QPochhammer (- \frac{1}{q^{4}}, q, n)}$

(5)

>	$RegularQPochhammerForm (H, q, n)$

$\frac{{(\frac{{(q^{2} - 1)}^{2}}{q^{6}})}^{n} QPochhammer (- \frac{q^{12}}{q^{2} - 1}, q, n) QPochhammer (\frac{1}{- q^{5} + q^{3}}, q, n) QPochhammer (−1, q, n) QPochhammer (- \frac{1}{q^{2}}, q, n) QPochhammer (\frac{1}{- q^{4} + q^{2}}, q, n) QPochhammer (- \frac{q^{3}}{q^{2} - 1}, q, n)}{QPochhammer (- q^{4}, q, n) QPochhammer (- \frac{q^{2}}{q^{2} - 1}, q, n) {QPochhammer (- \frac{1}{q^{4}}, q, n)}^{2} QPochhammer (\frac{1}{- q^{2} + 1}, q, n) QPochhammer (- \frac{1}{q^{5}}, q, n)}$

(6)

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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