SinCoTrap: A High-Order Locally Corrected Trapezoidal Rule for Periodic Singular Integrals in Arbitrary Dimensions
Abstract
We present SinCoTrap (Singularity-Corrected Trapezoidal Rule), a high-order locally corrected trapezoidal method for periodic singular integrals in arbitrary dimension $d$ with kernel $|\boldsymbol{x}|^{-s}$, $0<s<d$.
The scheme preserves the uniform tensor grid and modifies only a fixed, small stencil of weights near the singularity.
For a correction order $p$, the resulting quadrature attains the error rate $O(h^{2p+2+d-s})$.
We derive explicit, mesh-independent limiting correction weights via analytic continuation of a special generalization of the Riemann zeta function, yielding rapidly computable formulas that can be pretabulated for each $(d,s,p)$.
This makes SinCoTrap both efficient in application and robust for high-order accuracy across a broad class of periodic singular integrals.
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