Self-similarity on 4d cubic lattice

Abstract

A phenomenon of "algebraic self-similarity" on 3d cubic lattice, providing what can be called an algebraic analogue of Kadanoff--Wilson theory, is shown to possess a 4d version as well. Namely, if there is a 4× 4 matrix A whose entries are indeterminates over the field F2, then the 2× 2× 2× 2 block made of sixteen copies of A reveals the existence of four direct "block spin" summands corresponding to the same matrix A. Moreover, these summands can be written out in quite an elegant way. Somewhat strikingly, if the entries of A are just zeros and ones -- elements of F2 -- then there are examples where two more "block spins" split out, and this time with different A's.

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