Search
Search Funnelback University
- Refined by:
- Date: Uncertain
21 -
30 of
1,593
search results for watson
Fully-matching results
-
WAVE-NUMBER-EXPLICIT BOUNDS IN TIME-HARMONICSCATTERING ∗ SIMON N.…
https://api.newton.ac.uk/website/v0/events/preprints/NI07044WAVE-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 -
Norms.dvi
https://api.newton.ac.uk/website/v0/events/preprints/NI07067Condition 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 -
Sparse random graphs with clustering Béla Bollobás∗†‡ Svante…
https://api.newton.ac.uk/website/v0/events/preprints/NI08030It 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.xxc©American…
https://api.newton.ac.uk/website/v0/events/preprints/NI09034JOURNAL 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 ...
https://api.newton.ac.uk/website/v0/events/preprints/NI09071ELLIPTIC 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 -
TRANSVERSAL MULTILINEAR RADON-LIKE TRANSFORMS: LOCAL AND GLOBAL…
https://api.newton.ac.uk/website/v0/events/preprints/NI11029Amer. Math. Soc.16 (2003), 605–638. Jonathan Bennett, Neal Bez and Susana Gutiérrez, School of Mathematics, The Watson. -
GSinCE-revision-withnames.dvi
https://api.newton.ac.uk/website/v0/events/preprints/NI11060Dorfman (1943) for blood screening and later adapted to physical experiments by Watson. -
Screening Strategies in the Presence of Interactions Danel…
https://api.newton.ac.uk/website/v0/events/preprints/NI12002and was extended to factor screening by Watson (1961); Morris (2006) has given a review of. -
UNIQUENESS RESULTS FOR ONE-DIMENSIONAL SCHRÖDINGER OPERATORS WITH…
https://api.newton.ac.uk/website/v0/events/preprints/NI12015N. Watson, A Course of Modern Analysis, 4th ed., CambridgeUniversity Press, Cambridge, 1927. -
The Expected Total Curvature of Random Polygons Jason Cantarella,∗ ...
https://api.newton.ac.uk/website/v0/events/preprints/NI12084The 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.
Search history
Recently clicked results
Recently clicked results
Your click history is empty.
Recent searches
Recent searches
Your search history is empty.