The Gonihedric Paradigm Extensions of the Ising Model

TL;DR

This paper introduces the gonihedric model, a generalization of the Ising model involving random surfaces and complex interactions, with exact solutions and phase transition analysis in three and four dimensions.

Contribution

It extends the Ising model to a gonihedric spin system with novel interactions, dual formulations, and exact solutions in three dimensions.

Findings

Exact spectrum of the transfer matrix in 3D

Second order phase transitions in 3D and 4D

Exponential degeneracy of vacuum states

Abstract

We suggest a generalization of the Feynman path integral to an integral over random surfaces. The proposed action is proportional to the linear size of the random surfaces and is called gonihedric. The convergence and the properties of the partition function are analysed. The model can also be formulated as a spin system with identical partition function. The spin system represents a generalisation of the Ising model with ferromagnetic, antiferromagnetic and quartic interactions. Higher symmetry of the model allows to construct dual spin systems in three and four dimensions. In three dimensions the transfer matrix describes the propagation of closed loops and we found its exact spectrum. It is a unique exact solution of the tree-dimensional statistical spin system. In three and four dimensions the system exhibits the second order phase transitions. The gonihedric spin systems have exponentially degenerated vacuum states separated by the potential barriers and can be used as a storage of binary information.