An improved lower bound on the Shannon capacities of complements of odd cycles
Abstract
Improving a 2003 result of Bohman and Holzman, we show that for n ≥ 1, the Shannon capacity of the complement of the 2n+1-cycle is at least (2rn + 1)1/rn = 2 + (2-rn/rn), where rn = (O(( n)2)) is the number of partitions of 2(n-1) into powers of 2. We also discuss a connection between this result and work by Day and Johnson in the context of graph Ramsey numbers.
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