A367765 -id:A367765 - cp's OEIS frontend

A367760 a(n) is the numerator of the probability that the free polyomino with binary code A246521(n+1) appears in the Eden growth model on the square lattice, when n square cells have been added.

1, 1, 2, 1, 1, 1, 1, 1, 1, 2, 1, 1, 1, 7, 1, 1, 7, 7, 1, 1, 1, 23, 49, 1, 1, 53, 1, 107, 1, 49, 1, 107, 1, 23, 1, 1, 1, 1, 137, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 11, 7, 1, 2797, 70037, 70037, 31, 31, 2797, 3517, 1, 41, 653, 49541, 1, 3517, 71, 67, 41, 899, 2797, 653, 1, 1, 1, 1, 653, 1, 1

Offset: 1

Pontus von Brömssen, Dec 02 2023

In the Eden growth model, there is a single initial unit square cell in the plane and more squares are added one at a time, selected randomly among those squares that share an edge with one of the already existing squares, with probabilities proportional to the number of already existing squares with which the new square shares an edge. This seems to be the version described in Eden (1961). See A367671 for another version.

Can be read as an irregular triangle, whose n-th row contains A000105(n) terms, n >= 1.

			As an irregular triangle:
  1;
  1;
  2, 1;
  1, 1, 1, 1, 1;
  2, 1, 1, 1, 7, 1, 1, 7, 7, 1, 1, 1;
  ...
For n = 7, the T-tetromino has binary code A246521(n+1) = 27. It can be obtained either via the straight tromino (probability 1/3 * 1/4) or via the L-tromino (probability 2/3 * 1/4), so the probability of obtaining the T-tetromino is 1/12 + 1/6 = 1/4 and a(7) = 1.

Murray Eden, A two-dimensional growth process, in: 4th Berkeley Symposium on Mathematical Statistics and Probability (Berkeley 1960), vol. 4, pp. 223-239, University of California Press, Berkeley, 1961.
Index entries for sequences related to polyominoes.

Cf. A000105, A246521, A335573, A367671, A367761 (denominators), A367762, A367764, A367765.

a(n)/A367761(n) = (A367764(n)/A367765(n))*A335573(n+1).

A367676 a(n) is the denominator of the probability that a particular one of the A335573(n+1) fixed polyominoes corresponding to the free polyomino with binary code A246521(n+1) appears in the version of the Eden growth model described in A367671 when n square cells have been added.

Original entry on oeis.org

1, 2, 6, 6, 112, 21, 336, 21, 24, 8064, 504, 84, 2520, 40320, 1008, 504, 8064, 8064, 504, 672, 120, 399168, 39916800, 1155, 30240, 18144, 528, 241920, 26880, 36288, 4435200, 1814400, 480, 181440, 480, 2217600, 3991680, 528, 20736, 36288, 362880, 378, 110880, 4435200, 36960, 201600, 5040, 13860, 295680, 5702400, 4435200, 13860, 103680, 50400, 1814400, 720

Offset: 1

Pontus von Brömssen, Nov 26 2023

Can be read as an irregular triangle, whose n-th row contains A000105(n) terms, n >= 1.

Terms on the n-th row are (2*n-1)-smooth.

			As an irregular triangle:
     1;
     2;
     6,   6;
   112,  21, 336,   21,    24;
  8064, 504,  84, 2520, 40320, 1008, 504, 8064, 8064, 504, 672, 120;
  ...

Index entries for sequences related to polyominoes.

Cf. A000105, A246521, A335573, A367671, A367672, A367675 (numerators), A367678, A367765.

A367675(n)/a(n) = (A367671(n)/A367672(n))/A335573(n+1).

A367761 a(n) is the denominator of the probability that the free polyomino with binary code A246521(n+1) appears in the Eden growth model on the square lattice, when n square cells have been added.

Original entry on oeis.org

1, 1, 3, 3, 3, 6, 4, 6, 12, 5, 30, 30, 15, 60, 15, 30, 120, 60, 30, 40, 60, 450, 600, 90, 90, 600, 90, 900, 48, 600, 48, 1800, 90, 450, 90, 40, 48, 90, 1800, 80, 48, 180, 90, 48, 90, 80, 180, 180, 96, 40, 48, 180, 40, 480, 360, 360, 151200, 756000, 756000, 10080, 10080, 151200, 151200, 630, 10080

Offset: 1

Pontus von Brömssen, Dec 02 2023

Can be read as an irregular triangle, whose n-th row contains A000105(n) terms, n >= 1.

			As an irregular triangle:
  1;
  1;
  3,  3;
  3,  6,  4,  6, 12;
  5, 30, 30, 15, 60, 15, 30, 120, 60, 30, 40, 60;
  ...

Index entries for sequences related to polyominoes.

Cf. A000105, A246521, A335573, A367672, A367760 (numerators), A367763, A367764, A367765.

A367760(n)/a(n) = (A367764(n)/A367765(n))*A335573(n+1).

A367764 a(n) is the numerator of the probability that a particular one of the A335573(n+1) fixed polyominoes corresponding to the free polyomino with binary code A246521(n+1) appears in the Eden growth model on the square lattice (see A367760), when n square cells have been added.

Original entry on oeis.org

1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 7, 1, 1, 7, 7, 1, 1, 1, 23, 49, 1, 1, 53, 1, 107, 1, 49, 1, 107, 1, 23, 1, 1, 1, 1, 137, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 11, 7, 1, 2797, 70037, 70037, 31, 31, 2797, 3517, 1, 41, 653, 49541, 1, 3517, 71, 67, 41, 899, 2797, 653, 1, 1, 1, 1, 653, 1, 1

Offset: 1

Pontus von Brömssen, Dec 02 2023

Apparently, the probabilities a(n)/A367765(n) are given in Eden (1958) for polyominoes up to 8 cells.

Can be read as an irregular triangle, whose n-th row contains A000105(n) terms, n >= 1.

			As an irregular triangle:
  1;
  1;
  1, 1;
  1, 1, 1, 1, 1;
  1, 1, 1, 1, 7, 1, 1, 7, 7, 1, 1, 1;
  ...

Murray Eden, A probabilistic model for morphogenesis, in: Symposium on Information Theory in Biology (Gatlinburg 1956), pp. 359-370, Pergamon Press, New York, 1958.

Murray Eden, A two-dimensional growth process, in: 4th Berkeley Symposium on Mathematical Statistics and Probability (Berkeley 1960), vol. 4, pp. 223-239, University of California Press, Berkeley, 1961.
Index entries for sequences related to polyominoes.

Cf. A000105, A246521, A335573, A367675, A367760, A367761, A367765 (denominators), A367766.

a(n)/A367765(n) = (A367760(n)/A367761(n))/A335573(n+1).

A368001 a(n) is the denominator of the probability that a particular one of the A335573(n+1) fixed polyominoes corresponding to the free polyomino with binary code A246521(n+1) appears as the image of a simple random walk on the square lattice.

Original entry on oeis.org

1, 2, 6, 6, 21, 21, 28, 21, 21, 2002, 77, 77, 77, 1001, 77, 77, 1001, 1001, 77, 91, 77, 89089, 785603, 286, 286, 48594, 286, 25924899, 194194, 785603, 194194, 25924899, 286, 89089, 286, 388388, 194194, 286, 51849798, 388388, 194194, 286, 286, 194194, 286, 388388, 286, 286, 194194, 388388, 194194, 286, 388388, 1165164, 291291, 286

Offset: 1

Pontus von Brömssen, Dec 09 2023

In a simple random walk on the square lattice, draw a unit square around each visited point. A368000(n)/a(n) is the probability that, when the appropriate number of distinct points have been visited, the drawn squares form a particular one of the fixed polyominoes corresponding to the free polyomino with binary code A246521(n+1).

Can be read as an irregular triangle, whose n-th row contains A000105(n) terms, n >= 1.

			As an irregular triangle:
     1;
     2;
     6,  6;
    21, 21, 28, 21,   21;
  2002, 77, 77, 77, 1001, 77, 77, 1001, 1001, 77, 91, 77;
  ...

Index entries for sequences related to polyominoes.

Cf. A000105, A246521, A335573, A367676, A367765, A367994, A367995, A368000 (numerators), A368003, A368005.

A368000(n)/a(n) = (A367994(n)/A367995(n))/A335573(n+1).

A367766 Numerator of the greatest probability that a particular fixed polyomino with n cells appears in the Eden growth model (see A367760).

Original entry on oeis.org

1, 1, 1, 1, 1, 53, 49541, 813359, 59243701, 18007129909, 26754412658849, 922373240806979, 42709276740325681463, 5698447182281913432980459

Offset: 1

Pontus von Brömssen, Dec 02 2023

a(n) is the numerator of the maximum of A367764/A367765 over the n-th row.

			For 1 <= n <= 14, the following are all polyominoes, up to reflections and rotations, that have the maximum probabilities for their respective sizes. Except for n = 3, there is just one such polyomino (again, up to reflections and rotations).
                    _           _      _ _
        _    _     | |   _ _   | |_   |   |
   _   | |  | |_   | |  |   |  |   |  |   |
  |_|  |_|  |_ _|  |_|  |_ _|  |_ _|  |_ _|
                                _
   _ _      _ _      _ _ _    _| |_
  |   |_   |   |_   |     |  |     |
  |    _|  |     |  |     |  |     |
  |_ _|    |_ _ _|  |_ _ _|  |_ _ _|
   _ _      _ _ _      _ _      _ _ _
  |   |_   |     |   _|   |_   |     |_
  |     |  |     |  |       |  |       |
  |     |  |     |  |      _|  |      _|
  |_ _ _|  |_ _ _|  |_ _ _|    |_ _ _|

Index entries for sequences related to polyominoes.

Cf. A367677, A367760, A367762, A367764, A367765, A367767 (denominators).

A367767 Denominator of the greatest probability that a particular fixed polyomino with n cells appears in the Eden growth model (see A367760).

Original entry on oeis.org

1, 2, 6, 6, 20, 1200, 3024000, 63504000, 5334336000, 4779565056000, 9635603152896000, 404695332421632000, 44071321700715724800000, 7329942225263039348736000000

Offset: 1

Pontus von Brömssen, Dec 02 2023

a(n) is the denominator of the maximum of A367764/A367765 over the n-th row.

Index entries for sequences related to polyominoes.

Cf. A367678, A367760, A367763, A367764, A367765, A367766 (numerators).

A368393 a(n) is the denominator of the probability that a particular one of the A335573(n+1) fixed polyominoes corresponding to the free polyomino with binary code A246521(n+1) appears in internal diffusion-limited aggregation on the square lattice.

Original entry on oeis.org

1, 2, 6, 6, 35, 35, 140, 35, 35, 1232, 1848, 1848, 1848, 3696, 1848, 1848, 3696, 3696, 1848, 7, 1848, 7386288, 3940584648, 38038, 38038, 5073, 38038, 7217188, 59034976, 3940584648, 59034976, 7217188, 38038, 7386288, 38038, 22138116, 59034976, 38038, 985146162, 22138116, 59034976, 38038, 38038, 59034976, 38038, 22138116, 38038, 38038, 59034976, 22138116, 59034976, 38038, 22138116, 177104928, 3689686, 38038

Offset: 1

Pontus von Brömssen, Dec 22 2023

See A368386 for details.

Can be read as an irregular triangle, whose n-th row contains A000105(n) terms, n >= 1.

			As an irregular triangle:
     1;
     2;
     6,    6;
    35,   35,  140,   35,   35;
  1232, 1848, 1848, 1848, 3696, 1848, 1848, 3696, 3696, 1848, 7, 1848;
  ...

Index entries for sequences related to polyominoes.

Cf. A000105, A246521, A335573, A367676, A367765, A368001, A368386, A368387, A368392 (numerators), A368395, A368863 (external diffusion-limited aggregation).

A368392(n)/a(n) = (A368386(n)/A368387(n))/A335573(n+1).

cp's OEIS Frontend

A367760 a(n) is the numerator of the probability that the free polyomino with binary code A246521(n+1) appears in the Eden growth model on the square lattice, when n square cells have been added.

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A367676 a(n) is the denominator of the probability that a particular one of the A335573(n+1) fixed polyominoes corresponding to the free polyomino with binary code A246521(n+1) appears in the version of the Eden growth model described in A367671 when n square cells have been added.

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A367761 a(n) is the denominator of the probability that the free polyomino with binary code A246521(n+1) appears in the Eden growth model on the square lattice, when n square cells have been added.

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A367764 a(n) is the numerator of the probability that a particular one of the A335573(n+1) fixed polyominoes corresponding to the free polyomino with binary code A246521(n+1) appears in the Eden growth model on the square lattice (see A367760), when n square cells have been added.

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A368001 a(n) is the denominator of the probability that a particular one of the A335573(n+1) fixed polyominoes corresponding to the free polyomino with binary code A246521(n+1) appears as the image of a simple random walk on the square lattice.

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A367766 Numerator of the greatest probability that a particular fixed polyomino with n cells appears in the Eden growth model (see A367760).

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A367767 Denominator of the greatest probability that a particular fixed polyomino with n cells appears in the Eden growth model (see A367760).

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Author

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A368393 a(n) is the denominator of the probability that a particular one of the A335573(n+1) fixed polyominoes corresponding to the free polyomino with binary code A246521(n+1) appears in internal diffusion-limited aggregation on the square lattice.

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