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A338832

Number of spanning trees in the k_1 X ... X k_j grid graph, where (k_1 - 1, ..., k_j - 1) is the partition with Heinz number n.

1, 1, 1, 4, 1, 15, 1, 384, 192, 56, 1, 31500, 1, 209, 2415, 42467328, 1, 49766400, 1, 2558976, 30305, 780, 1, 3500658000000, 100352, 2911, 8193540096000, 207746836, 1, 76752081000, 1, 20776019874734407680, 380160, 10864, 4140081, 242716067758080000000, 1 (list; graph; refs; listen; history; text; internal format)

	OFFSET	`1,4`
	COMMENTS	`a(n) > 1 precisely when n is composite.`
	LINKS	`Pontus von Brömssen, Table of n, a(n) for n = 1..1151` `Germain Kreweras, Complexité et circuits Eulériens dans les sommes tensorielles de graphes, J. Combin. Theory B 24 (1978), 202-212.` `Eric Weisstein's World of Mathematics, Grid Graph` `Eric Weisstein's World of Mathematics, Spanning Tree` `Index entries for sequences related to trees`
	FORMULA	`a(n) = Product_{n_1=0..k_1-1, ..., n_j=0..k_j-1; not all n_i=0} Sum_{i=1..j} (2(1 - cos(n_iPi/k_i))) / Product_{i=1..j} k_i, where (k_1 - 1, ..., k_j - 1) is the partition with Heinz number n.`
	EXAMPLE	`The partition (2, 2, 1) has Heinz number 18 and the 3 X 3 X 2 grid graph has a(18) = 49766400 spanning trees.`
	CROSSREFS	`2 X n grid: A001353(n) = a(2prime(n-1))` `3 X n grid: A006238(n) = a(3prime(n-1))` `4 X n grid: A003696(n) = a(5prime(n-1))` `5 X n grid: A003779(n) = a(7prime(n-1))` `6 X n grid: A139400(n) = a(11prime(n-1))` `7 X n grid: A334002(n) = a(13prime(n-1))` `8 X n grid: A334003(n) = a(17prime(n-1))` `9 X n grid: A334004(n) = a(19prime(n-1))` `10 X n grid: A334005(n) = a(23prime(n-1))` `n X n grid: A007341(n) = a(prime(n-1)^2)` `m X n grid: A116469(m,n) = a(prime(m-1)prime(n-1))` `2 X 2 X n grid: A003753(n) = a(4prime(n-1))` `2 X n X n grid: A067518(n) = a(2prime(n-1)^2)` `n X n X n grid: A071763(n) = a(prime(n-1)^3)` `2 X ... X 2 grid: A006237(n) = a(2^n)` `Sequence in context: A328235 A293129 A200062 * A229468 A319039 A107873` `Adjacent sequences: A338829 A338830 A338831 * A338833 A338834 A338835`
	KEYWORD	`nonn`
	AUTHOR	`Pontus von Brömssen, Nov 11 2020`
	STATUS	`approved`

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Last modified September 11 17:54 EDT 2024. Contains 375839 sequences. (Running on oeis4.)