A surprising observation in the quarter-plane diffraction problem
Published version
Peer-reviewed
Repository URI
Repository DOI
Change log
Authors
Assier, RC
Abrahams, ID
Abstract
In this paper, we revisit Radlow's highly original attempt at a double Wiener-Hopf solution to the canonical problem of wave diffraction by a quarter-plane. Using a constructive approach, we reduce the problem to two equations, one containing his somewhat controversial ansatz, and an additional compatibility equation. We then show that despite Radlow's ansatz being erroneous, it gives surprisingly accurate results in the far-field, particularly for the spherical diffraction coefficient. This unexpectedly good result is established by comparing it to results obtained by the recently established modified Smyshlyaev formulae.
Description
Keywords
wave diffraction, quarter-plane, Wiener-Hopf, diffraction coefficient
Journal Title
SIAM Journal on Applied Mathematics
Conference Name
Journal ISSN
0036-1399
1095-712X
1095-712X
Volume Title
81
Publisher
Society for Industrial & Applied Mathematics (SIAM)
Publisher DOI
Sponsorship
Engineering and Physical Sciences Research Council (EP/K032208/1)
Engineering and Physical Sciences Research Council (EP/R014604/1)
Engineering and Physical Sciences Research Council (EP/R014604/1)
The first author was supported by EPSRC/UKRI grant EP/N013719/1. The second author was supported by EPSRC/UKRI grants EP/K032208/1 and EP/R014604/1.