Hyperdeterminants as integrable discrete systems
arXiv:0903.3864 · doi:10.1088/1751-8113/42/45/454023
Abstract
We give the basic definitions and some theoretical results about hyperdeterminants, introduced by A. Cayley in 1845. We prove integrability (understood as 4d-consistency) of a nonlinear difference equation defined by the 2x2x2-hyperdeterminant. This result gives rise to the following hypothesis: the difference equations defined by hyperdeterminants of any size are integrable. We show that this hypothesis already fails in the case of the 2x2x2x2-hyperdeterminant.
Standard LaTeX, 11 pages. v2: corrected a small misprint in the abstract