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WAVE-NUMBER-EXPLICIT BOUNDS IN TIME-HARMONICSCATTERING. SIMON N. CHANDLER-WILDE † AND PETER MONK ‡. Abstract. In this paper we consider the problem of scattering of time-harmonic acoustic wavesby a bounded sound soft obstacle in two and three

Condition Number Estimates forCombined Potential Boundary Integral. Operators in Acoustic Scattering. Simon N. Chandler-Wilde‡, Ivan G. Graham‡†,. Stephen Langdon‡, and Marko Lindner‡. Dedicated to Rainer Kress on the occasion of his 65th

It is tempting to think that the result is‘obvious’, and indeed that a corresponding result should hold for any Galton–Watson process. ... Consider the ‘forward process’ given by ignoring backward children.This is simply a Poisson

JOURNAL OF GEOMETRIC MECHANICS doi:10.3934/jgm.2009.1.xxcAmerican Institute of Mathematical SciencesVolume 1, Number 1, March 2009 pp. 1–XX. THREE-DIMENSIONAL DISCRETE SYSTEMS OF. HIROTA-KIMURA TYPE. AND DEFORMED LIE-POISSON ALGEBRAS. Andrew N. W.

ELLIPTIC SOLUTIONS OF ABS LATTICE EQUATIONS. FRANK W NIJHOFF AND JAMES ATKINSON. Abstract. Elliptic N -soliton-type solutions, i.e. solutions emerging from the application ofN consecutive Bäcklund transformations to an elliptic seed solution, are

Amer. Math. Soc.16 (2003), 605–638. Jonathan Bennett, Neal Bez and Susana Gutiérrez, School of Mathematics, The Watson.

Dorfman (1943) for blood screening and later adapted to physical experiments by Watson.

and was extended to factor screening by Watson (1961); Morris (2006) has given a review of.

N. Watson, A Course of Modern Analysis, 4th ed., CambridgeUniversity Press, Cambridge, 1927.

The Expected Total Curvature of Random Polygons. Jason Cantarella, Alexander Y. Grosberg,† Robert Kusner,‡ and Clayton Shonkwiler. (Dated: October 24, 2012). We consider the expected value for the total curvature of a random closed polygon.