A206981 -id:A206981 - cp's OEIS frontend

A245869 T(n,k)=Number of length n+2 0..k arrays with some pair in every consecutive three terms totalling exactly k.

6, 19, 10, 36, 45, 16, 61, 100, 103, 26, 90, 193, 256, 239, 42, 127, 318, 549, 676, 553, 68, 168, 493, 960, 1629, 1764, 1281, 110, 217, 712, 1579, 3102, 4753, 4624, 2967, 178, 270, 993, 2368, 5515, 9726, 13961, 12100, 6873, 288, 331, 1330, 3433, 8840, 18505, 30900

Offset: 1

R. H. Hardin, Aug 04 2014

Table starts
.....6.......19........36.........61..........90..........127..........168
....10.......45.......100........193.........318..........493..........712
....16......103.......256........549.........960.........1579.........2368
....26......239.......676.......1629........3102.........5515.........8840
....42......553......1764.......4753........9726........18505........31176
....68.....1281......4624......13961.......30900........63241.......113024
...110.....2967.....12100......40901.......97602.......214315.......404264
...178.....6873.....31684.....119953......309078.......729097......1455496
...288....15921.....82944.....351649......977664......2475985......5223552
...466....36881....217156....1031057.....3094038......8415217.....18775816
...754....85435....568516....3022933.....9789654.....28590415.....67437448
..1220...197911...1488400....8863117....30977796.....97151683....242306240
..1974...458463...3896676...25986061....98020170....330100459....870461352
..3194..1062035..10201636...76189749...310161870...1121650903...3127322696
..5168..2460217..26708224..223384017...981426624...3811203385..11235107264
..8362..5699123..69923044..654949861..3105480558..12950003383..40363689352
.13530.13202089.183060900.1920277409..9826505742..44002376953.145010699592
.21892.30582803.479259664.5630150189.31093507092.149514426895.520968428032

			Some solutions for n=6 k=4
..1....4....0....4....0....1....2....3....1....2....0....3....3....0....2....4
..4....2....1....1....4....2....4....1....0....3....1....0....3....4....1....3
..0....2....4....0....3....2....0....3....3....1....3....1....1....2....3....1
..4....0....0....4....0....1....4....0....1....1....1....3....0....0....4....3
..4....2....4....4....4....2....1....4....4....3....2....1....4....4....1....2
..0....2....0....0....3....2....0....0....0....3....2....2....4....3....0....2
..2....0....4....4....0....1....4....4....3....1....4....3....0....1....4....2
..4....4....0....1....1....2....3....0....1....4....0....1....0....2....1....2

R. H. Hardin, Table of n, a(n) for n = 1..9999
Robert Israel, Proof of recurrences for columns
Robert Israel et al, A Pattern for OEIS Sequence A245869, Mathematics StackExchange, Jul 29-30, 2024.

Column 1 is A006355(n+4)
Column 3 is A206981(n+2)
Row 1 is A090381.

Empirical for column k:
k=1: a(n) = a(n-1) +a(n-2)
k=2: a(n) = 2*a(n-1) +a(n-2) -a(n-4) -a(n-5)
k=3: a(n) = 2*a(n-1) +2*a(n-2) -a(n-3)
k=4: a(n) = 3*a(n-1) +a(n-2) -a(n-3) -5*a(n-4) -8*a(n-5) +3*a(n-6)
k=5: a(n) = 2*a(n-1) +4*a(n-2) -a(n-3)
k=6: a(n) = 3*a(n-1) +3*a(n-2) -a(n-3) -9*a(n-4) -24*a(n-5) +5*a(n-6)
k=7: a(n) = 2*a(n-1) +6*a(n-2) -a(n-3)
k=8: a(n) = 3*a(n-1) +5*a(n-2) -a(n-3) -13*a(n-4) -48*a(n-5) +7*a(n-6)
k=9: a(n) = 2*a(n-1) +8*a(n-2) -a(n-3)
Empirical for row n:
n=1: a(n) = 2*a(n-1) -2*a(n-3) +a(n-4)
n=2: a(n) = 3*a(n-1) -2*a(n-2) -2*a(n-3) +3*a(n-4) -a(n-5)
n=3: a(n) = 2*a(n-1) +a(n-2) -4*a(n-3) +a(n-4) +2*a(n-5) -a(n-6)
n=4: a(n) = 3*a(n-1) -a(n-2) -5*a(n-3) +5*a(n-4) +a(n-5) -3*a(n-6) +a(n-7)
n=5: a(n) = 2*a(n-1) +2*a(n-2) -6*a(n-3) +6*a(n-5) -2*a(n-6) -2*a(n-7) +a(n-8)
n=6: a(n) = 3*a(n-1) -8*a(n-3) +6*a(n-4) +6*a(n-5) -8*a(n-6) +3*a(n-8) -a(n-9)
n=7: a(n) = 2*a(n-1) +3*a(n-2) -8*a(n-3) -2*a(n-4) +12*a(n-5) -2*a(n-6) -8*a(n-7) +3*a(n-8) +2*a(n-9) -a(n-10)
From Robert Israel, Aug 06 2024: (Start) For odd k, T(n,k) = 2 T(n-1,k) + (k-1) T(n-2,k) - T(n-3,k).
For even k, T(n,k) = 3 T(n-1,k) + (k-3) T(n-2,k) - T(n-3,k) + (2 k - 3) T(n-4,k) - k (k-2) T(n-5,k) + (k-1) T(n-6,k).
See links. (End)

A207346 T(n,k)=Number of nXk 0..1 arrays avoiding 0 0 0 and 0 1 1 horizontally and 0 0 0 and 1 1 1 vertically.

Original entry on oeis.org

2, 4, 4, 6, 16, 6, 9, 36, 36, 10, 13, 81, 84, 100, 16, 18, 169, 192, 292, 256, 26, 25, 324, 426, 828, 912, 676, 42, 34, 625, 858, 2190, 3130, 2812, 1764, 68, 46, 1156, 1704, 5290, 9668, 11230, 8928, 4624, 110, 62, 2116, 3330, 12292, 27022, 41112, 43260, 28152

Offset: 1

R. H. Hardin Feb 17 2012

Table starts
..2....4.....6......9.....13......18.......25.......34........46........62
..4...16....36.....81....169.....324......625.....1156......2116......3844
..6...36....84....192....426.....858.....1704.....3330......6390.....12150
.10..100...292....828...2190....5290....12292....27978.....62574....136978
.16..256...912...3130...9668...27022....71344...185624....468864...1161400
.26..676..2812..11230..41112..128292...388134..1134282...3225374...9002616
.42.1764..8928..43260.186002..684324..2367656..8000806..26057006..82907430
.68.4624.28152.163710.828530.3524736.13950908.53882188.199473062.720751822

			Some solutions for n=4 k=3
..0..0..1....0..1..0....0..0..1....1..1..1....1..1..1....1..1..1....1..1..0
..0..0..1....0..0..1....1..1..1....1..1..0....0..0..1....1..1..0....1..1..1
..1..1..0....1..1..0....1..0..0....0..0..1....0..1..0....0..0..1....0..0..1
..1..1..0....1..0..0....0..0..1....1..1..0....1..0..0....0..1..0....1..1..0

R. H. Hardin, Table of n, a(n) for n = 1..391

Column 1 is A006355(n+2)
Column 2 is A206981
Row 1 is A171861(n+1)
Row 2 is A207025

A207589 T(n,k) = Number of n X k 0..1 arrays avoiding 0 0 0 and 0 0 1 horizontally and 0 0 1 and 1 1 1 vertically.

Original entry on oeis.org

2, 4, 4, 6, 16, 6, 10, 36, 36, 9, 16, 100, 60, 81, 13, 26, 256, 144, 144, 169, 18, 42, 676, 324, 432, 312, 324, 25, 68, 1764, 756, 1098, 1014, 612, 625, 34, 110, 4624, 1728, 3150, 3094, 2232, 1250, 1156, 46, 178, 12100, 3996, 8244, 9698, 7272, 5000, 2516, 2116, 62

Offset: 1

R. H. Hardin, Feb 19 2012

Table starts
..2....4....6....10....16.....26.....42......68......110......178.......288
..4...16...36...100...256....676...1764....4624....12100....31684.....82944
..6...36...60...144...324....756...1728....3996.....9180....21168.....48708
..9...81..144...432..1098...3150...8244...23202....61560...171468....458640
.13..169..312..1014..3094...9698..30056...93782...291304...908102...2822456
.18..324..612..2232..7272..25776..85536..300096..1004364..3501756..11782620
.25..625.1250..5000.18150..70800.263550.1018700..3824100.14714500..55475900
.34.1156.2516.11220.46716.204476.876860.3832616.16578128.72435844.314466680

			Some solutions for n=4, k=3
..0..1..1....1..0..0....1..0..1....1..1..1....1..0..1....0..1..0....1..0..0
..1..0..1....0..1..1....0..1..1....0..1..0....0..1..0....1..0..0....1..1..1
..0..1..0....1..1..0....1..0..0....1..0..0....1..0..1....0..1..0....0..1..1
..1..1..1....1..0..0....1..0..1....0..1..0....1..1..0....1..0..0....1..0..0

R. H. Hardin, Table of n, a(n) for n = 1..971

Column 1 is A171861(n+1).
Column 2 is A207025.
Row 1 is A006355(n+2).
Row 2 is A206981.

A207717 T(n,k)=Number of nXk 0..1 arrays avoiding 0 0 0 and 0 0 1 horizontally and 0 0 1 and 1 0 0 vertically.

Original entry on oeis.org

2, 4, 4, 6, 16, 6, 10, 36, 36, 9, 16, 100, 114, 81, 14, 26, 256, 450, 387, 196, 22, 42, 676, 1644, 2205, 1414, 484, 35, 68, 1764, 6186, 12015, 11970, 5302, 1225, 56, 110, 4624, 23010, 66339, 97580, 66946, 20265, 3136, 90, 178, 12100, 85992, 364869, 805154

Offset: 1

R. H. Hardin Feb 19 2012

Table starts
..2....4.....6......10.......16.........26..........42............68
..4...16....36.....100......256........676........1764..........4624
..6...36...114.....450.....1644.......6186.......23010.........85992
..9...81...387....2205....12015......66339......364869.......2009223
.14..196..1414...11970....97580.....805154.....6614706......54438356
.22..484..5302...66946...820820...10150118...125165018....1545006848
.35.1225.20265..383845..7070805..131365535..2433018665...45118588165
.56.3136.78120.2221688.61530000.1717508184.47808913432.1332236625328

			Some solutions for n=4 k=3
..1..1..1....1..1..1....1..0..1....0..1..0....1..0..0....1..0..1....1..0..1
..1..1..1....0..1..1....1..1..1....0..1..1....0..1..1....0..1..1....0..1..0
..1..1..1....1..1..1....0..1..0....0..1..1....1..1..0....1..0..0....1..1..1
..1..1..0....0..1..1....1..0..1....0..1..0....1..1..1....1..1..1....1..1..1

R. H. Hardin, Table of n, a(n) for n = 1..763

Column 1 is A001611(n+2)
Column 2 is A207436
Row 1 is A006355(n+2)
Row 2 is A206981

A207845 T(n,k)=Number of nXk 0..1 arrays avoiding 0 0 0 and 0 0 1 horizontally and 0 0 0 and 1 1 1 vertically.

Original entry on oeis.org

2, 4, 4, 6, 16, 6, 10, 36, 36, 10, 16, 100, 72, 100, 16, 26, 256, 180, 240, 256, 26, 42, 676, 432, 780, 704, 676, 42, 68, 1764, 1044, 2320, 2816, 2080, 1764, 68, 110, 4624, 2520, 7140, 10144, 9672, 6216, 4624, 110, 178, 12100, 6084, 21600, 38208, 41444, 35952

Offset: 1

R. H. Hardin Feb 21 2012

Table starts
..2....4.....6.....10.....16......26.......42........68........110.........178
..4...16....36....100....256.....676.....1764......4624......12100.......31684
..6...36....72....180....432....1044.....2520......6084......14688.......35460
.10..100...240....780...2320....7140....21600.....65980.....200400......610740
.16..256...704...2816..10144...38208...140032....524480....1928000.....7206080
.26..676..2080...9672..41444..181896...794768...3479268...15223104....66632488
.42.1764..6216..35952.185136.1006572..5346600..28935984..154692048...835671396
.68.4624.18496.130152.813824.5427216.35345040.235865752.1547212432.10330674512

			Some solutions for n=4 k=3
..1..0..0....1..1..1....1..1..1....1..0..1....1..0..1....1..1..1....1..0..1
..0..1..1....1..0..1....1..0..1....0..1..0....1..0..1....1..0..1....1..0..0
..0..1..0....0..1..0....0..1..0....1..0..0....0..1..0....0..1..0....0..1..1
..1..0..1....0..1..1....1..1..1....0..1..1....1..0..0....0..1..0....0..1..0

R. H. Hardin, Table of n, a(n) for n = 1..763

Column 1 is A006355(n+2)
Column 2 is A206981
Row 1 is A006355(n+2)
Row 2 is A206981

A207254 T(n,k)=Number of nXk 0..1 arrays avoiding 0 0 1 and 1 0 1 horizontally and 0 1 0 and 1 0 1 vertically.

Original entry on oeis.org

2, 4, 4, 6, 16, 6, 8, 36, 36, 10, 10, 64, 102, 100, 16, 12, 100, 216, 370, 256, 26, 14, 144, 390, 940, 1232, 676, 42, 16, 196, 636, 1950, 3776, 4238, 1764, 68, 18, 256, 966, 3560, 9072, 15652, 14406, 4624, 110, 20, 324, 1392, 5950, 18688, 43498, 64176, 49164

Offset: 1

R. H. Hardin Feb 16 2012

Table starts
..2....4.....6......8.....10......12......14.......16.......18.......20
..4...16....36.....64....100.....144.....196......256......324......400
..6...36...102....216....390.....636.....966.....1392.....1926.....2580
.10..100...370....940...1950....3560....5950.....9320....13890....19900
.16..256..1232...3776...9072...18688...34608....59264....95568...146944
.26..676..4238..15652..43498..101036..207298...388232...677898..1119716
.42.1764.14406..64176.206514..541380.1231650..2524704..4777290..8483748
.68.4624.49164.263976.982940.2906592.7328836.16436824.33693660.64313720

			Some solutions for n=4 k=3
..1..1..0....0..0..0....1..0..0....0..0..0....1..1..1....1..0..0....1..1..1
..1..0..0....0..0..0....0..0..0....0..1..1....1..1..1....1..0..0....1..1..1
..1..0..0....1..1..1....0..0..0....1..1..1....0..1..0....1..0..0....1..1..1
..0..1..1....1..1..1....0..1..1....1..0..0....0..1..0....1..0..0....1..1..1

R. H. Hardin, Table of n, a(n) for n = 1..1057

Column 1 is A006355(n+2)
Column 2 is A206981
Row 2 is A016742
Row 3 is A086113

Empirical for row n:
n=1: a(k) = 2*k
n=2: a(k) = 4*k^2
n=3: a(k) = 2*k^3 + 6*k^2 - 2*k
n=4: a(k) = (5/6)*k^4 + (35/3)*k^3 - (5/6)*k^2 - (5/3)*k
n=5: a(k) = (4/15)*k^5 + (32/3)*k^4 + (44/3)*k^3 - (32/3)*k^2 + (16/15)*k
n=6: a(k) = (13/180)*k^6 + (143/20)*k^5 + (1235/36)*k^4 - (39/4)*k^3 - (377/45)*k^2 + (13/5)*k
n=7: a(k) = (1/60)*k^7 + (77/20)*k^6 + (2527/60)*k^5 + (119/4)*k^4 - (644/15)*k^3 + (42/5)*k^2 + (4/5)*k

A207453 T(n,k) = Number of n X k 0..1 arrays avoiding 0 0 0 and 0 0 1 horizontally and 0 0 1 and 1 0 1 vertically.

Original entry on oeis.org

2, 4, 4, 6, 16, 6, 10, 36, 36, 8, 16, 100, 90, 64, 10, 26, 256, 330, 168, 100, 12, 42, 676, 1008, 760, 270, 144, 14, 68, 1764, 3354, 2560, 1450, 396, 196, 16, 110, 4624, 10710, 10088, 5200, 2460, 546, 256, 18, 178, 12100, 34884, 36456, 23530, 9216, 3850, 720

Offset: 1

R. H. Hardin, Feb 17 2012

Table starts
..2...4...6...10....16.....26.....42......68......110......178.......288
..4..16..36..100...256....676...1764....4624....12100....31684.....82944
..6..36..90..330..1008...3354..10710...34884...112530...364722...1179360
..8..64.168..760..2560..10088..36456..138176...509960..1910296...7096320
.10.100.270.1450..5200..23530..92610..396100..1610950..6754210..27799200
.12.144.396.2460..9216..46956.196812..932688..4086060.18819228..83939328
.14.196.546.3850.14896..84266.370734.1922564..8935850.44655394.212625504
.16.256.720.5680.22528.139984.640080.3599104.17556880.94358512.474439680

			Some solutions for n=5, k=3
..1..0..1....1..1..0....1..1..1....0..1..1....0..1..0....0..1..0....0..1..1
..1..0..1....1..0..0....0..1..1....0..1..1....0..1..1....1..0..0....1..0..1
..1..0..1....1..0..0....0..1..0....0..1..0....0..1..1....1..0..0....1..0..1
..1..0..1....1..0..0....0..1..0....0..1..0....0..1..0....1..0..0....1..0..1
..1..0..0....1..0..0....0..1..0....0..1..0....0..1..0....1..0..0....1..0..1

R. H. Hardin, Table of n, a(n) for n = 1..1573

Column 2 is A016742.
Column 3 is A152746.
Row 1 is A006355(n+2).
Row 2 is A206981.

Empirical for column k:
k=1: a(n) = 2*n;
k=2: a(n) = 4*n^2;
k=3: a(n) = 12*n^2 - 6*n;
k=4: a(n) = 10*n^3 + 10*n^2 - 10*n;
k=5: a(n) = 48*n^3 - 32*n^2;
k=6: a(n) = 26*n^4 + 78*n^3 - 104*n^2 + 26*n;
k=7: a(n) = 168*n^4 - 84*n^3 - 84*n^2 + 42*n;
k=8: a(n) = 68*n^5 + 408*n^4 - 612*n^3 + 204*n^2;
k=9: a(n) = 550*n^5 - 990*n^3 + 660*n^2 - 110*n;
k=10: a(n) = 178*n^6 + 1780*n^5 - 2670*n^4 + 534*n^3 + 534*n^2 - 178*n;
k=11: a(n) = 1728*n^6 + 1440*n^5 - 6912*n^4 + 5184*n^3 - 1152*n^2;
k=12: a(n) = 466*n^7 + 6990*n^6 - 9320*n^5 - 2796*n^4 + 8388*n^3 - 3728*n^2 + 466*n;
k=13: a(n) = 5278*n^7 + 10556*n^6 - 36946*n^5 + 27144*n^4 - 3016*n^3 - 3016*n^2 + 754*n;
k=14: a(n) = 1220*n^8 + 25620*n^7 - 25620*n^6 - 42700*n^5 + 73200*n^4 - 36600*n^3 + 6100*n^2;
k=15: a(n) = 15792*n^8 + 55272*n^7 - 165816*n^6 + 98700*n^5 + 39480*n^4 - 59220*n^3 + 19740*n^2 - 1974*n.
Empirical for row n:
n=1: a(k)=a(k-1)+a(k-2);
n=2: a(k)=2*a(k-1)+2*a(k-2)-a(k-3);
n=3: a(k)=a(k-1)+7*a(k-2)+2*a(k-3)-4*a(k-4);
n=4: a(k)=a(k-1)+10*a(k-2)+3*a(k-3)-9*a(k-4);
n=5: a(k)=a(k-1)+13*a(k-2)+4*a(k-3)-16*a(k-4);
n=6: a(k)=a(k-1)+16*a(k-2)+5*a(k-3)-25*a(k-4);
n=7: a(k)=a(k-1)+19*a(k-2)+6*a(k-3)-36*a(k-4);
apparently for row n>2: a(k)=a(k-1)+(3*n-2)*a(k-2)+(n-1)*a(k-3)+(n-1)^2*a(k-4).

A207467 T(n,k)=Number of nXk 0..1 arrays avoiding 0 0 0 and 0 1 1 horizontally and 0 1 0 and 1 0 1 vertically.

Original entry on oeis.org

2, 4, 4, 6, 16, 6, 9, 36, 36, 10, 13, 81, 98, 100, 16, 18, 169, 271, 358, 256, 26, 25, 324, 677, 1307, 1152, 676, 42, 34, 625, 1504, 4219, 5369, 3910, 1764, 68, 46, 1156, 3399, 11760, 21517, 23645, 12994, 4624, 110, 62, 2116, 7220, 33393, 71928, 119965, 101233

Offset: 1

R. H. Hardin Feb 18 2012

Table starts
..2....4.....6......9......13.......18........25........34.........46
..4...16....36.....81.....169......324.......625......1156.......2116
..6...36....98....271.....677.....1504......3399......7220......15184
.10..100...358...1307....4219....11760.....33393.....88198.....229458
.16..256..1152...5369...21517....71928....247631....778010....2406006
.26..676..3910..23645..119965...491948...2090927...7990970...29983194
.42.1764.12994.101233..644401..3205650..16675001..76629370..345252578
.68.4624.43596.439063.3523073.21396734.136803627.760840082.4139073950

			Some solutions for n=4 k=3
..0..1..0....1..1..0....0..0..1....1..1..1....0..1..0....0..0..1....0..0..1
..1..0..0....1..0..1....0..1..0....1..1..0....1..1..0....0..1..0....1..0..0
..1..0..1....1..0..1....0..1..0....1..0..0....1..1..1....1..1..0....1..1..0
..1..1..1....0..1..0....0..1..0....1..0..1....1..0..1....1..0..0....0..1..0

R. H. Hardin, Table of n, a(n) for n = 1..337

Column 1 is A006355(n+2)
Column 2 is A206981
Row 1 is A171861(n+1)
Row 2 is A207025
Row 3 is A207112

A207661 T(n,k)=Number of nXk 0..1 arrays avoiding 0 0 0 and 1 1 1 horizontally and 0 0 1 and 1 0 0 vertically.

Original entry on oeis.org

2, 4, 4, 6, 16, 6, 10, 36, 36, 9, 16, 100, 84, 81, 14, 26, 256, 292, 198, 196, 22, 42, 676, 912, 870, 474, 484, 35, 68, 1764, 2812, 3358, 2774, 1140, 1225, 56, 110, 4624, 8928, 12040, 13902, 9060, 2748, 3136, 90, 178, 12100, 28152, 47320, 55752, 60762, 30440

Offset: 1

R. H. Hardin Feb 19 2012

Table starts
..2....4....6.....10......16......26.......42.........68........110.........178
..4...16...36....100.....256.....676.....1764.......4624......12100.......31684
..6...36...84....292.....912....2812.....8928......28152......87972......277292
..9...81..198....870....3358...12040....47320.....182192.....676396.....2611234
.14..196..474...2774...13902...55752...284272....1391724....6009486....29516206
.22..484.1140...9060...60762..264568..1806676...11731102...56370696...366295198
.35.1225.2748..30440..284108.1296732.12327618..111194040..568720390..5097396968
.56.3136.6630.103838.1384420.6454684.87753008.1144562438.5955572036.76412972266

			Some solutions for n=4 k=3
..0..1..1....0..1..0....0..1..1....1..1..0....0..0..1....0..1..1....1..0..0
..1..0..0....1..1..0....1..0..0....1..0..1....1..1..0....1..1..0....0..1..1
..0..1..1....1..0..0....0..1..1....0..1..1....1..0..1....1..0..1....1..0..0
..1..1..0....0..1..0....1..0..1....1..1..0....1..1..0....0..1..1....0..1..1

R. H. Hardin, Table of n, a(n) for n = 1..420

Column 1 is A001611(n+2)
Column 2 is A207436
Row 1 is A006355(n+2)
Row 2 is A206981
Row 3 is A207341

A207928 T(n,k)=Number of nXk 0..1 arrays avoiding 0 0 0 and 0 1 0 horizontally and 0 0 0 and 1 1 1 vertically.

Original entry on oeis.org

2, 4, 4, 6, 16, 6, 9, 36, 36, 10, 15, 81, 72, 100, 16, 25, 225, 144, 240, 256, 26, 40, 625, 360, 576, 704, 676, 42, 64, 1600, 900, 1872, 1936, 2080, 1764, 68, 104, 4096, 2160, 6084, 7744, 6400, 6216, 4624, 110, 169, 10816, 5184, 18096, 30976, 29760, 21904

Offset: 1

R. H. Hardin Feb 21 2012

Table starts
..2....4.....6.....9.....15......25.......40........64.......104........169
..4...16....36....81....225.....625.....1600......4096.....10816......28561
..6...36....72...144....360.....900.....2160......5184.....12528......30276
.10..100...240...576...1872....6084....18096.....53824....165648.....509796
.16..256...704..1936...7744...30976...111584....401956...1513992....5702544
.26..676..2080..6400..29760..138384...592968...2540836..11151624...48944016
.42.1764..6216.21904.126688..732736..3773248..19430464.105642128..574369156
.68.4624.18496.73984.520608.3663396.22906752.143233024.955190016.6369955344

			Some solutions for n=9 k=3
..0..0..1....0..0..1....0..1..1....1..0..0....1..0..0....0..0..1....0..0..1
..0..1..1....1..1..1....0..0..1....1..0..0....0..0..1....1..1..1....0..0..1
..1..1..0....1..0..0....1..0..0....0..1..1....1..1..0....1..1..0....1..1..0
..1..0..0....0..1..1....0..1..1....0..0..1....0..1..1....0..0..1....0..1..1
..0..1..1....1..1..0....1..1..1....1..1..0....0..0..1....1..0..1....1..0..0
..0..1..1....0..0..1....1..0..0....1..0..0....1..1..0....1..1..0....0..1..1
..1..0..0....1..0..0....0..1..1....0..1..1....0..1..1....0..1..1....1..0..1
..1..1..0....1..1..1....1..1..1....1..0..0....0..0..1....0..0..1....1..0..0
..0..1..1....0..1..1....1..0..0....1..1..1....1..0..0....1..1..0....0..1..1

R. H. Hardin, Table of n, a(n) for n = 1..391

Column 1 is A006355(n+2)
Column 2 is A206981
Column 3 is A207840
Row 1 is A006498(n+2)
Row 2 is A189145(n+2)

cp's OEIS Frontend

A245869 T(n,k)=Number of length n+2 0..k arrays with some pair in every consecutive three terms totalling exactly k.

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

Formula

A207346 T(n,k)=Number of nXk 0..1 arrays avoiding 0 0 0 and 0 1 1 horizontally and 0 0 0 and 1 1 1 vertically.

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

A207589 T(n,k) = Number of n X k 0..1 arrays avoiding 0 0 0 and 0 0 1 horizontally and 0 0 1 and 1 1 1 vertically.

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

A207717 T(n,k)=Number of nXk 0..1 arrays avoiding 0 0 0 and 0 0 1 horizontally and 0 0 1 and 1 0 0 vertically.

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

A207845 T(n,k)=Number of nXk 0..1 arrays avoiding 0 0 0 and 0 0 1 horizontally and 0 0 0 and 1 1 1 vertically.

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

A207254 T(n,k)=Number of nXk 0..1 arrays avoiding 0 0 1 and 1 0 1 horizontally and 0 1 0 and 1 0 1 vertically.

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

Formula

A207453 T(n,k) = Number of n X k 0..1 arrays avoiding 0 0 0 and 0 0 1 horizontally and 0 0 1 and 1 0 1 vertically.

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

Formula

A207467 T(n,k)=Number of nXk 0..1 arrays avoiding 0 0 0 and 0 1 1 horizontally and 0 1 0 and 1 0 1 vertically.

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

A207661 T(n,k)=Number of nXk 0..1 arrays avoiding 0 0 0 and 1 1 1 horizontally and 0 0 1 and 1 0 0 vertically.

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

A207928 T(n,k)=Number of nXk 0..1 arrays avoiding 0 0 0 and 0 1 0 horizontally and 0 0 0 and 1 1 1 vertically.

Views

Author

Keywords