Self-similarity in cubic blocks of R-operators
Abstract
Cubic blocks are studied assembled from linear operators R acting in the tensor product of d linear "spin" spaces. Such operator is associated with a linear transformation A in a vector space over a field F of a finite characteristic p, like "permutation-type" operators studied by Hietarinta. One small difference is that we do not require A and, consequently, R to be invertible; more importantly, no relations on R are required of the type of Yang--Baxter or its higher analogues. It is shown that, in d=3 dimensions, a pn× pn× pn block decomposes into the tensor product of operators similar to the initial R. One generalization of this involves commutative algebras over F and allows to obtain, in particular, results about spin configurations determined by a four-dimensional R. Another generalization deals with introducing Boltzmann weights for spin configurations; it turns out that there exists a non-trivial self-similarity involving Boltzmann weights as well.
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