Andre Henriques
Published 2006-04-12, updated 2006-10-26Version 2
We investigate a variant of the octahedron recurrence which lives in a 3-dimensional lattice contained in [0,n] x [0,m] x R. Generalizing results of David Speyer math.CO/0402452, we give an explicit non-recursive formula for the values of this recurrence in terms of perfect matchings. We then use it to prove that the octahedron recurrence is periodic of period n+m. This result is reminiscent of Fomin and Zelevinsky's theorem about the periodicity of Y-systems.
Comments: 22 pages, (a few pictures added, section 3 has been reorganized)
Perfect Matchings and the Octahedron Recurrence
Bessenrodt-Stanley polynomials and the octahedron recurrence
Interlacing networks: birational RSK, the octahedron recurrence, and Schur function identities
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