Related papers: Exactly solvable multicomponent spinless fermions

Exactly solvable multicomponent spinless fermions

URL: http://arxiv.org/abs/2502.05455v1
Date: Sat, 08 Feb 2025 05:29:24 GMT
Title: Exactly solvable multicomponent spinless fermions
Authors: Ryu Sasaki,
Abstract summary: Generalising the one to one correspondence between exactly solvable hermitian matrices $mathcalH=mathcalHdagger$ and exactly solvable spinless fermion systems. Four types of exactly solvable multicomponent fermion systems are constructed explicitly.
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Abstract: By generalising the one to one correspondence between exactly solvable hermitian matrices $\mathcal{H}=\mathcal{H}^\dagger$ and exactly solvable spinless fermion systems $\mathcal{H}_f=\sum_{x,y}c_x^\dagger\mathcal{H}(x,y)c_y$, four types of exactly solvable multicomponent fermion systems are constructed explicitly. They are related to the multivariate Krawtcouk, Meixner and two types of Rahman like polynomials, constructed recently by myself. The Krawtchouk and Meixner polynomials are the eigenvectors of certain real symmetric matrices $\mathcal{H}$ which are related to the difference equations governing them. The corresponding fermions have nearest neighbour interactions. The Rahman like polynomials are eigenvectors of certain reversible Markov chain matrices $\mathcal{K}$, from which real symmetric matrices $\mathcal{H}$ are uniquely defined by the similarity transformation in terms of the square root of the stationary distribution. The fermions have wide range interactions.

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