A250443 - OEIS

A250443

T(n,k)=Number of (n+1)X(k+1) 0..2 arrays with nondecreasing sum of every two consecutive values in every row and column

%I #6 Dec 12 2014 20:55:14

%S 81,324,324,1296,2160,1296,3600,14400,14400,3600,10000,60000,160000,

%T 60000,10000,22500,250000,1000000,1000000,250000,22500,50625,787500,

%U 6250000,8750000,6250000,787500,50625,99225,2480625,27562500,76562500

%N T(n,k)=Number of (n+1)X(k+1) 0..2 arrays with nondecreasing sum of every two consecutive values in every row and column

%C Table starts

%C .....81......324.......1296.........3600.........10000...........22500

%C ....324.....2160......14400........60000........250000..........787500

%C ...1296....14400.....160000......1000000.......6250000........27562500

%C ...3600....60000....1000000......8750000......76562500.......450187500

%C ..10000...250000....6250000.....76562500.....937890625......7353062500

%C ..22500...787500...27562500....450187500....7353062500.....74118870000

%C ..50625..2480625..121550625...2647102500...57648010000....747118209600

%C ..99225..6482700..423536400..11859019200..332052537600...5379251109120

%C .194481.16941456.1475789056..53128406016.1912622616576..38730607985664

%C .345744.38723328.4337012736.195165573120.8782450790400.217365657062400

%H R. H. Hardin, <a href="/A250443/b250443.txt">Table of n, a(n) for n = 1..262</a>

%F Empirical for column k, apparently a recurrence of order 8*k+8, and a polynomial of degree 4*k+4 plus a quasipolynomial of degree 4*k+2 with period 2:

%F k=1: [linear recurrence of order 16; also a polynomial of degree 8 plus a quasipolynomial of degree 6 with period 2]

%F k=2: [order 24; also a polynomial of degree 12 plus a quasipolynomial of degree 10 with period 2]

%F k=3: [order 32; also a polynomial of degree 16 plus a quasipolynomial of degree 14 with period 2]

%F k=4: [order 40; also a polynomial of degree 20 plus a quasipolynomial of degree 18 with period 2]

%F k=5: [order 48; also a polynomial of degree 24 plus a quasipolynomial of degree 22 with period 2]

%F k=6: [order 56; also a polynomial of degree 28 plus a quasipolynomial of degree 26 with period 2]

%F k=7: [order 64; also a polynomial of degree 32 plus a quasipolynomial of degree 30 with period 2]

%e Some solutions for n=3 k=4

%e ..0..0..0..0..0....0..0..0..2..0....0..0..0..2..0....0..0..0..0..0

%e ..0..0..1..0..2....0..0..1..1..1....0..0..0..0..0....0..2..2..2..2

%e ..0..2..0..2..2....0..2..0..2..1....0..1..0..2..1....1..0..2..1..2

%e ..2..1..2..2..2....0..0..2..2..2....0..0..1..2..2....0..2..2..2..2

%Y Column 1 is A250427

%K nonn,tabl

%O 1,1

%A _R. H. Hardin_, Nov 22 2014