On the Tur\'an Number of Generalized Theta Graphs
Abstract
Let k1,·s,k denote the generalized theta graph, which consists of internally disjoint paths with lengths k1,·s, k, connecting two fixed vertices. We estimate the corresponding extremal number ex(n,k1,·s,k). When the lengths of all paths have the same parity and at most one path has length 1, ex(n,k1,·s,k) is O(n1+1/k), where 2k is the length of the smallest cycle in k1,·s,k. We also establish matching lower bound in the particular case of ex(n,3,5,5).
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