cp's OEIS Frontend

This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.

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A223870 Number of 7Xn 0..3 arrays with rows and antidiagonals unimodal and columns nondecreasing.

Original entry on oeis.org

120, 14400, 857696, 30627033, 740441932, 13140481520, 181330154458, 2031375254570, 19103100564953, 154879319818086, 1106319655331310, 7088499061347994, 41355557480132029, 222496813189773094
Offset: 1

Views

Author

R. H. Hardin Mar 28 2013

Keywords

Comments

Row 7 of A223864

Examples

			Some solutions for n=3
..0..0..0....0..0..0....0..0..0....0..0..0....0..0..0....0..0..0....0..0..0
..0..0..0....0..0..0....0..0..0....0..0..2....0..0..0....0..2..0....0..0..0
..0..0..1....0..0..1....0..0..3....1..2..3....2..0..0....0..2..1....0..0..1
..1..1..2....0..0..2....0..1..3....1..3..3....2..0..0....1..2..1....2..3..1
..2..2..2....0..2..3....0..1..3....1..3..3....3..1..0....3..2..2....3..3..1
..3..2..2....1..2..3....1..1..3....1..3..3....3..1..0....3..2..2....3..3..1
..3..3..2....2..3..3....1..3..3....3..3..3....3..3..2....3..2..2....3..3..3

Links

Formula

Empirical: a(n) = (1/731743016283032599871082788290560000000)*n^42 + (1/4977843648183895237218250260480000000)*n^41 + (928393/46001848566932971411483888975872000000000)*n^40 + (105277/73145796479098389325092394893312000000)*n^39 + (1194875887417/14630003285779052077202999275526553600000000)*n^38 + (2989034162869/770000172935739583010684172396134400000000)*n^37 + (253954581560803/1578153507593520316530906749730816000000000)*n^36 + (5354203220243/901802004339154466589089571274752000000)*n^35 + (294541461227512613/1487973307159604869871997792603340800000000)*n^34 + (3283448634973867/543651190047352893632443475558400000000)*n^33 + (1695440335227801901/9946345636093615440320840859648000000000)*n^32 + (3573106388063476091/795707650887489235225667268771840000000)*n^31 + (199763950144059168991/1796759211681427305348280929484800000000)*n^30 + (74264834838952433551/28519987487006782624575887769600000000)*n^29 + (22508587327587010087/388203096465609563855388672000000000)*n^28 + (6487713317681801287/5268470594890415509465989120000000)*n^27 + (5879724305315631273143/236027482651090614824076312576000000)*n^26 + (2274008762771343921151/4777884264192117708989399040000000)*n^25 + (1433958075984913204598868559/170382339038756037576130088140800000000)*n^24 + (171994077476794008378711763/1298151154580998381532419719168000000)*n^23 + (4807317857591109327659320591/2616826438088178555658237378560000000)*n^22 + (1168312336634046874744823561/53404621185473031748127293440000000)*n^21 + (3267005930489620041151124845704799/14294414418056675360283121680384000000000)*n^20 + (6168875562195824331118939779649/3009350403801405339006972985344000000)*n^19 + (1421349779115626568528007952265121/87772720110874322387703378739200000000)*n^18 + (443650330465794505186411456583/4008618930894881365898035200000000)*n^17 + (231458296026946241960005215879167/345743382789683517808705536000000000)*n^16 + (2781803526486270651769956719311/790270589233562326419898368000000)*n^15 + (180518342530030480992731139435779501/11029213910990904218097706598400000000)*n^14 + (112422850223626902402310801373206057/1696802140152446802784262553600000000)*n^13 + (256455030218680186741984545055085811457/1087881553947739188785091969024000000000)*n^12 + (10923760852985777320434335065266037/15015618411977076449759723520000000)*n^11 + (88612710087482886643695234551735533/45442003088877994519009689600000000)*n^10 + (5132272050632981323250919168852481/1142060924191378169128550400000000)*n^9 + (176762144080638309567478939777189963/19986066173349117959749632000000000)*n^8 + (12877453273843085031374115529301/876581849708294647357440000000)*n^7 + (93032030615999750514907250146925549/4583262987565425332123834880000000)*n^6 + (60616255337563316970152218520251/2645462041884805386507264000000)*n^5 + (94214291470099334061118441477637/4572870100972306453819699200000)*n^4 + (66435080638421714121718489/4652899980639302456064000)*n^3 + (385110153135599654276494759/50995582363565168801472000)*n^2 + (169896669668551379/73020063246530400)*n + 1

A223858 Number of n X n 0..3 arrays with rows and antidiagonals unimodal and columns nondecreasing.

Original entry on oeis.org

4, 100, 4884, 315124, 23738426, 1989679315, 181330154458, 17720685250743, 1838270364212150, 200766237618388230, 22925992371163981667, 2721355255765297425689
Offset: 1

Views

Author

R. H. Hardin Mar 28 2013

Keywords

Comments

Diagonal of A223864

Examples

			Some solutions for n=3
..0..1..2....0..0..2....0..0..1....1..0..0....3..0..0....0..1..3....0..1..1
..0..1..2....1..1..3....1..1..2....2..0..0....3..3..0....0..2..3....0..1..1
..0..3..2....1..2..3....1..3..2....3..2..2....3..3..0....0..2..3....3..3..3
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