The least doubling constant of a path graph
Abstract
We study the least doubling constant CG among all possible doubling measures defined on a path graph G. We consider both finite and infinite cases and show that, if G= Z, C Z=3, while for G=Ln, the path graph with n vertices, one has 1+2(πn+1)≤ CLn<3, with equality on the lower bound if and only if n8. Moreover, we analyze the structure of doubling minimizers on Ln and Z, those measures whose doubling constant is the smallest possible.
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