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#13 by Alois P. Heinz at Fri Aug 14 11:44:39 EDT 2020
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#12 by Alois P. Heinz at Fri Aug 14 11:43:49 EDT 2020
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The number of n-step self-avoiding walks in two connected octants on a cubic lattice where the walk starts at the origin. - Scott R. Shannon, Aug 1514 2020
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| EXTENSIONS
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a(16)-a(20) from Scott R. Shannon, Aug 1514 2020
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| STATUS
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proposed
editing
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Discussion
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| Fri Aug 14
| 11:44
| Alois P. Heinz: ... at Fri Aug 14 11:43:49 EDT 2020
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#11 by Michel Marcus at Fri Aug 14 11:03:20 EDT 2020
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Discussion
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| Fri Aug 14
| 11:31
| Scott R. Shannon: yeah thanks
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| 11:37
| Michel Marcus: Aug 15 2020 ??
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#10 by Michel Marcus at Fri Aug 14 11:03:10 EDT 2020
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| COMMENTS
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The number of n-step self-avoiding walks in two connected octants on a cubic lattice where the walk starts at the origin.. - _Scott R. Shannon_, Aug 15 2020
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| REFERENCES
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A. J. Guttmann and G. M. Torrie, Critical behavior at an edge for the SAW and Ising model, J. Phys. A 17 (1984), 3539-3552.
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| LINKS
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A. J. Guttmann and G. M. Torrie, <a href="https://doi.org/10.1088/0305-4470/17/18/023">Critical behavior at an edge for the SAW and Ising model</a>, J. Phys. A 17 (1984), 3539-3552.
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| KEYWORD
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nonn,more,changed
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proposed
editing
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Discussion
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| Fri Aug 14
| 11:03
| Michel Marcus: ok ?
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#9 by Scott R. Shannon at Fri Aug 14 10:54:03 EDT 2020
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#8 by Scott R. Shannon at Fri Aug 14 10:53:46 EDT 2020
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| EXTENSIONS
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a(16)-a(20) from Scott R. Shannon, Aug 15 2020
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| STATUS
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proposed
editing
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#7 by Scott R. Shannon at Fri Aug 14 10:42:54 EDT 2020
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#6 by Scott R. Shannon at Fri Aug 14 10:41:31 EDT 2020
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| DATA
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4, 14, 56, 226, 958, 4052, 17508, 75634, 330804, 1448830, 6397288, 28293338, 125845174, 560617586, 2507890716, 11234741560, 50489990570, 227190742034, 1024878998006, 4628430595232
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| COMMENTS
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The number of n-step self-avoiding walks in two connected octants on a cubic lattice where the walk starts at the origin.
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| STATUS
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approved
editing
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Discussion
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| Fri Aug 14
| 10:42
| Scott R. Shannon: Adding some more terms and a bit of an explanation of what the numbers are.
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#5 by N. J. A. Sloane at Mon Jul 06 22:43:27 EDT 2015
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#4 by N. J. A. Sloane at Mon Jul 06 22:43:23 EDT 2015
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| NAME
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q1
Guttmann-Torrie simple cubic lattice series coefficients c_n^{2}(Pi/2).
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| REFERENCES
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A. J. Guttmann and G. M. Torrie, Critical behavior at an edge for the SAW and Ising model, J. Phys. A 17 (1984), 3539-3552.
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| STATUS
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approved
editing
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