%I #4 Apr 04 2014 11:00:10
%S 2,3,3,4,11,4,7,21,21,7,10,67,75,67,10,15,155,450,450,155,15,24,353,
%T 1729,5161,1729,353,24,35,998,7233,36398,36398,7233,998,35,54,2256,
%U 36148,271764,486179,271764,36148,2256,54,83,5639,139855,2492182,6436979
%N T(n,k)=Number of nXk 0..3 arrays with no element equal to one plus the sum of elements to its left or one plus the sum of the elements above it or zero plus the sum of the elements diagonally to its northwest, modulo 4
%C Table starts
%C ..2.....3.......4..........7...........10............15.............24
%C ..3....11......21.........67..........155...........353............998
%C ..4....21......75........450.........1729..........7233..........36148
%C ..7....67.....450.......5161........36398........271764........2492182
%C .10...155....1729......36398.......486179.......6436979......110122847
%C .15...353....7233.....271764......6436979.....169838571.....5145071133
%C .24...998...36148....2492182....110122847....5145071133...296413962369
%C .35..2256..139855...17380978...1403151574..121626491919.12947745036751
%C .54..5639..645733..143489019..20729739995.3384817934297
%C .83.14624.2919837.1182292032.314460587672
%H R. H. Hardin, <a href="/A240376/b240376.txt">Table of n, a(n) for n = 1..111</a>
%F Empirical for column k:
%F k=1: a(n) = a(n-2) +2*a(n-3)
%F k=2: [order 15] for n>17
%e Some solutions for n=4 k=4
%e ..3..2..3..3....3..3..2..3....2..2..3..2....3..3..2..3....3..2..3..3
%e ..2..0..1..2....3..2..0..3....2..1..1..0....3..1..2..1....2..1..1..2
%e ..3..1..2..1....2..0..2..0....3..1..2..1....2..2..2..2....3..3..2..0
%e ..2..1..1..2....3..1..0..2....2..0..2..2....2..0..0..0....2..1..2..0
%Y Column 1 is A159288(n+1)
%K nonn,tabl
%O 1,1
%A _R. H. Hardin_, Apr 04 2014
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