Regularity of symbolic powers of certain graphs
Abstract
Let Gn,r denote the graph with n vertices \x1,…,xn\ in cyclic order and for each vertex xi consider the set Ai=\xi-r,…,xi-1,xi+1,xi+2,…, xi+r\, where xi-j is the vertex xn+i-j, whenever i<j and 0≤ r≤ n2 -1. In Gn,r, every vertex xi is adjacent to all the vertices of V(Gn,r) Ai. Let I=I(Gn,r) be the edge ideal of Gn,r. We show that Minh's conjecture is true for I, i.e. regularity of ordinary powers and symbolic powers of I are equal. We compute the Waldschmidt constant and resurgence for the whole class.
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