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Table Of Integrals Series And Products

to be done in this area. Face recognition is a problem that scarcely clamoured for attention before the computer age but, having surfaced, has involved a wide range of techniques and has attracted the attention of some fine minds (David Mumford was a Fields Medallist in 1974). This singular application of mathematical modelling to a messy applied problem of obvious utility and importance but with no unique solution is a pretty one to share with students: perhaps, returning to the source of our opening quotation, we may invert Duncan's earlier observation, 'There is an art to find the mind's construction in the face!'.

Linear and nonlinear waves, by G. B. Whitham. Pp.636. £50. 1999. ISBN 0 471 35942 4 (Wiley).

Lectures on Cauchy’s Problem in Linear Partial Differential Equations. By J. Hadamard. Pp. viii+316. 15s.net. 1923. (Per Oxford University Press.)

Advanced Mathematical Methods for Scientists and Engineers

From the Publisher: 
For this inexpensive paperback edition of a groundbreaking classic, the author has extensively rearranged, rewritten and enlarged the material. Book is unique in its emphasis on the frequency approach and its use in the solution of problems. Contents include: Fundamentals and Algorithms; Polynomial Approximation Classical Theory; Fourier ApproximationModern Therory; Exponential Approximation.

Numerical Methods for Scientists and Engineers

Corrigendum to “On angular-spectrum representations for scattering by infinite rough surfaces” [Wave Motion 24 (1996) 421–433]☆

https://inside.mines.edu/~pamartin/ref-paps/R064_WMw.pdf

G.R. Wickham: an appreciation

Variation in foraging strategies of New Zealand albatross species within a dominance hierarchy

Mirzade [J Appl Phys 110, 064906 (2011)] developed a linear theory for the propagation of waves in an elastic solid with atomic point defects, and then sought time-harmonic solutions It is shown that Mirzade’s analysis is incomplete: substantial corrections are required

/pdf/comment-on-elastic-wave-propagation-in-a-solid-layer-with-2mkqkhc35p.pdf

Comment on “Elastic wave propagation in a solid layer with laser-induced point defects” [J. Appl. Phys. 110, 064906 (2011)]

Acoustic scattering by small obstacles in the frequency domain has an extensive literature, going back to Lord Rayleigh in the 19th century. However, analogous results in the time domain are rare. A typical problem concerns the interaction of a sound pulse with a small obstacle. The beginning of a theory for such problems is outlined, using time domain boundary integral equations. A key question is "What does it mean for an obstacle to be 'small'?"

Acoustic scattering by a small obstacle in the time domain.

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