Abstract
Recently Yeomans and Fisher (1982) established the existence of two infinite sequences of commensurate phases near the multiphase point of the p-state asymmetric clock model for p=3. In this paper the author describes the low-temperature behaviour of the model for general p showing that, as p increases, new stable phases appear in a surprisingly regular manner. The results are obtained using a technique developed by Fisher and Selke (1981) which uses the ideas of linear programming theory to extend low-temperature series expansions to indefinitely high order.
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