Entropy of full covering of the kagome lattice by straight trimers

Abstract

We consider the number of ways all the sites of a kagome lattice can be covered by non-overlapping linear rigid rods where each rod covers 3 sites. We establish a 2-to-1 correspondence between the configurations of trimers on the kagome lattice to the covering by dimers of a related hexagonal lattice to show that entropy of coverings per trimer stri,kag equals the entropy per dimer sdim,hex , and is given by stri,kag = sdim,hex = 12 π ∫0 2 π/3 ( 2 + 2 k) dk ≈ 0.323065947….

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