PVTSI(m): A Novel Approach to Computation of Hadamard Finite Parts of Nonperiodic Singular Integrals

Abstract

We consider the numerical computation of I[f]=∫Barba f(x)\,dx, the Hadamard Finite Part of the finite-range singular integral ∫ba f(x)\,dx, f(x)=g(x)/(x-t)m with a<t<b and m∈\1,2,…\, assuming that (i)\,g∈ C∞(a,b) and (ii)\,g(x) is allowed to have arbitrary integrable singularities at the endpoints x=a and x=b. We first prove that ∫Barba f(x)\,dx is invariant under any suitable variable transformation x=(), :[α,β]→[a,b], hence there holds ∫Barβα F()\,d=∫Barba f(x)\,dx, where F()=f(())\,'(). Based on this result, we next choose () such that the transformed integrand F() is sufficiently periodic with period =β-α, and prove, with the help of some recent extension/generalization of the Euler--Maclaurin expansion, that we can apply to ∫Barβα F()\,d the quadrature formulas derived for periodic singular integrals developed in an earlier work of the author. We give a whole family of numerical quadrature formulas for ∫Barβα F()\,d for each m, which we denote T(s)m,n[ F], where F() is the -periodic extension of F().