Recoverable systems and the maximal hard-core model on the triangular lattice
Abstract
In a previous paper (arXiv:2510.19746), we have studied the maximal hard-code model on the square lattice Z2 from the perspective of recoverable systems. Here we extend this study to the case of the triangular lattice A. The following results are obtained: (1) We derive bounds on the capacity of the associated recoverable system on A; (2) We show non-uniqueness of Gibbs measures in the high-activity regime; (3) We characterize extremal periodic Gibbs measures for sufficiently low values of activity.
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