A282377 - OEIS

A282377

T(n,k)=Number of nXk 0..1 arrays with no 1 equal to more than four of its king-move neighbors, with the exception of exactly two elements.

0, 0, 0, 0, 0, 0, 0, 1, 1, 0, 0, 6, 20, 6, 0, 0, 33, 309, 309, 33, 0, 0, 168, 3499, 6244, 3499, 168, 0, 0, 810, 33692, 119390, 119390, 33692, 810, 0, 0, 3780, 309493, 2131096, 4342782, 2131096, 309493, 3780, 0, 0, 17226, 2721044, 36258678, 145363115

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OFFSET

1,12

COMMENTS

Table starts

.0.....0........0..........0.............0................0..................0

.0.....0........1..........6............33..............168................810

.0.....1.......20........309..........3499............33692.............309493

.0.....6......309.......6244........119390..........2131096...........36258678

.0....33.....3499.....119390.......4342782........145363115.........4628356166

.0...168....33692....2131096.....145363115.......9186748436.......549965063215

.0...810...309493...36258678....4628356166.....549965063215.....61758065925680

.0..3780..2721044..594236950..142749216527...31917429718270...6732856863189737

.0.17226.23193721.9502175342.4294477337728.1806509121927104.715938968398655928

LINKS

R. H. Hardin, Table of n, a(n) for n = 1..144

FORMULA

Empirical for column k:

k=1: a(n) = a(n-1)

k=2: a(n) = 6*a(n-1) -3*a(n-2) -12*a(n-3) -27*a(n-4) -18*a(n-5) -9*a(n-6)

k=3: [order 30]

k=4: [order 54]

EXAMPLE

Some solutions for n=4 k=4

..0..0..1..0. .0..0..0..0. .0..0..0..0. .1..1..0..1. .0..0..0..0

..1..0..1..1. .0..0..0..0. .1..0..1..1. .1..0..1..1. .0..1..1..0

..0..0..1..1. .1..1..1..1. .1..0..1..1. .0..1..0..1. .0..1..1..0

..0..0..1..1. .1..1..1..0. .0..1..1..1. .1..1..1..0. .0..1..1..1

CROSSREFS

Sequence in context: A176559 A241715 A224919 * A281936 A075251 A090590

Adjacent sequences: A282374 A282375 A282376 * A282378 A282379 A282380

KEYWORD

nonn,tabl

AUTHOR

R. H. Hardin, Feb 13 2017

STATUS

approved