Location via proxy:   [ UP ]   [Report a bug]   [Manage cookies]    No cookies    No scripts    No ads    No referrer    Show this form

login

The OEIS is supported by the many generous donors to the OEIS Foundation.

 

Hints (Greetings from The On-Line Encyclopedia of Integer Sequences!) A259808 Guttmann-Torrie simple cubic lattice series coefficients c_n^{2}(Pi/2). 5 4, 14, 56, 226, 958, 4052, 17508, 75634, 330804, 1448830, 6397288, 28293338, 125845174, 560617586, 2507890716, 11234741560, 50489990570, 227190742034, 1024878998006, 4628430595232 (list; graph; refs; listen; history; text; internal format) OFFSET 1,1 COMMENTS 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 14 2020 LINKS Table of n, a(n) for n=1..20. 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. CROSSREFS Sequence in context: A329777 A323787 A132837 * A149491 A073155 A365114 Adjacent sequences: A259805 A259806 A259807 * A259809 A259810 A259811 KEYWORD nonn,more AUTHOR N. J. A. Sloane, Jul 06 2015 EXTENSIONS a(16)-a(20) from Scott R. Shannon, Aug 14 2020 STATUS approved

Lookup | Welcome | Wiki | Register | Music | Plot 2 | Demos | Index | Browse | More | WebCam
Contribute new seq. or comment | Format | Style Sheet | Transforms | Superseeker | Recents
The OEIS Community | Maintained by The OEIS Foundation Inc.

License Agreements, Terms of Use, Privacy Policy. .

Last modified August 18 23:05 EDT 2024. Contains 375284 sequences. (Running on oeis4.)