Clifford algebra approach of 3D Ising model
Zhidong Zhang, Osamu Suzuki, Norman H. March

TL;DR
This paper introduces a Clifford algebra framework for the 3D Ising model, enabling linearization and topological analysis of transfer matrices through novel theorems and transformations.
Contribution
It develops a new algebraic approach using Clifford algebra, expanding transfer matrices and applying topological and gauge transformations to analyze the 3D Ising model.
Findings
Transfer matrices are expanded without changing their trace.
A linearization process for sub-transfer matrices is established.
Topological structures are trivialized via local transformations.
Abstract
We develop a Clifford algebra approach for 3D Ising model. By utilizing some mathematical facts of the direct product of matrices and their trace, we expand the dimension of the transfer matrices V of the 3D Ising system by adding unit matrices I (with compensation of a factor) and adjusting their sequence, which do not change the trace of the transfer matrices V (Theorem I: Trace Invariance Theorem). It allows us to perform a linearization process on sub-transfer-matrices (Theorem II: Linearization Theorem). It is found that locally for each site j, the internal factor Wj in the transfer matrices can be treated as a boundary factor, which can be dealt with by a procedure similar to the Onsager-Kaufman approach for the boundary factor U in the 2D Ising model. This linearization process splits each sub-transfer matrix into 2n sub-spaces (and the whole system into 2nl sub-spaces).…
Peer Reviews
No public reviews on file for this paper yet. If you reviewed it on a platform where reviews are public (OpenReview, ICLR, NeurIPS, ICML), you can paste yours below so the community can read it here.
Videos
No videos yet. Explain this paper in a talk, walkthrough, or lecture? Add one.
