Maximum Modulus of Independence Roots of Graphs and Trees
Abstract
The independence polynomial of a graph is the generating polynomial for the number of independent sets of each size and its roots are called independence roots. We bound the maximum modulus, maxmod(n), of an independence root over all graphs on n vertices and the maximum modulus, maxmodT(n), of an independence root over all trees on n vertices in terms of n. In particular, we show that 3(maxmod(n))n=13+o(1) and 2(maxmodT(n))n=12+o(1).
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