Litcius/Paper detail

A Yang–Baxter integrable cellular automaton with a four site update rule

Balázs Pozsgay

2021Journal of Physics A Mathematical and Theoretical33 citationsDOIOpen Access PDF

Abstract

Abstract We present a one dimensional reversible block cellular automaton, where the time evolution is dictated by a period 3 cycle of update rules. At each time step a subset of the cells is updated using a four site rule with two control bits and two action bits. The model displays rich dynamics. There are three types of stable particles, left movers, right movers and ‘frozen’ bound states that only move as an effect of scattering with the left and right movers. Multi-particle scattering in the system is factorized. We embed the model into the canonical framework of Yang–Baxter integrability by rigorously proving the existence of a commuting set of diagonal-to-diagonal transfer matrices. The construction involves a new type of Lax operator.

Topics & Concepts

DiagonalCellular automatonIntegrable systemOperator (biology)Block (permutation group theory)Reversible cellular automatonType (biology)Set (abstract data type)MathematicsAutomatonPure mathematicsComputer scienceDiscrete mathematicsPhysicsAlgorithmCombinatoricsTheoretical computer scienceMobile automatonGeometryAutomata theoryChemistryEcologyProgramming languageBiochemistryTranscription factorGeneRepressorBiologyAlgebraic structures and combinatorial modelsQuantum many-body systemsQuantum chaos and dynamical systems