We observe that for any logarithmically concave finite sequence a(0), a(1), .... a(n) of positive integers there is a representation of the Lie algebra sl(2)(C) from which this logarithmic concavity follows. Thus, in applying this strategy to prove logarithmic concavity. the only issue is to construct such a representation naturally from given combinatorial data. As an example, we do this when cr, is the number of j-element stable sets in a claw-free graph. reproving a theorem of Hamidoune. (C) 2001 Academic Press. [References: 5]
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