The Integral Closure of Subrings Associated to Graphs

This paper celebrates the enormous contributions of David Buchsbaum to commutative algebra, homological algebra, and representation theory, with grateful appreciation for the inspiration he has provided for myself and so many others. © 2000 Academic Press \* or \* . We shall write J for the integral

We provide a setting for analyzing the efficiency of algorithms that compute the integral closure of affine rings. It gives quadratic (cubic in the non-homogeneous case) multiplicity-based but dimension-independent bounds for the number of passes the basic construction will make. An approach that do

## Abstract Let __G__ be a simple graph of order __n__ with Laplacian spectrum {λ~__n__~, λ~__n__−1~, …, λ~1~} where 0=λ~__n__~≤λ~__n__−1~≤⋅≤λ~1~. If there exists a graph whose Laplacian spectrum is __S__={0, 1, …, __n__−1}, then we say that __S__ is Laplacian realizable. In 6, Fallat et al. posed

We prove a Mehler representation for Jacobi functions t with respect to the dual variable . We exploit this representation to define a pair of dual integral transforms and its transposed t . We define two second order difference . operators P and Q such that t is an eigenfunction of P with respect