Asymptotics beyond All Orders [electronic resource] /

Asymptotics beyond All Orders [electronic resource] /

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An asymptotic expansion is a series that provides a sequence of increasingly accurate approximations to a function in a particular limit. The formal definition, given by Poincare (1886, Acta Math. 8:295), is as follows. Given a function,.

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Main Authors: Segur, Harvey. editor., Tanveer, Saleh. editor., Levine, Herbert. editor., SpringerLink (Online service)
Format: Texto biblioteca
Language:eng
Published: Boston, MA : Springer US, 1991
Subjects:Physics., Theoretical, Mathematical and Computational Physics.,
Online Access:http://dx.doi.org/10.1007/978-1-4757-0435-8
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id KOHA-OAI-TEST:187190
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spelling KOHA-OAI-TEST:1871902018-07-30T23:10:28ZAsymptotics beyond All Orders [electronic resource] / Segur, Harvey. editor. Tanveer, Saleh. editor. Levine, Herbert. editor. SpringerLink (Online service) textBoston, MA : Springer US,1991.engAn asymptotic expansion is a series that provides a sequence of increasingly accurate approximations to a function in a particular limit. The formal definition, given by Poincare (1886, Acta Math. 8:295), is as follows. Given a function,.Asymptotology and Borel Summation -- Asymptotics, Superasymptotics, Hyperasymptotics -- Computation of Transcendental Effects in Growth Problems: Linear Solvability Conditions and Nonlinear Methods- The Example of the Geometric Model -- The Geometric Model of Crystal Growth -- The Geometric Model of Crystal Growth: An Overview -- Numerical Analysis of the Geometric Model for Dendritic Growth of Crystals -- Dendritic Crystal Growth -- Dendritic Crystal Growth-Overview -- An Experimental Assessment of Continuum Models of Dendritic Growth -- A New Formulation for Dendritic Crystal Growth in Two Dimensions -- Directional Solidification of Solids -- Directional Growth of Dilute Mixtures and Lamellar Eutectics -- A Flat Interface and Its Unfolding Bifurcations -- Flow in a Hele-Shaw Cell (Also known as VISCOUS FINGERING) -- Viscous Displacement in a Hele-Shaw Cell -- Saffman-Taylor Viscous Fingering in a Wedge -- Saffman-Taylor Problem in a Sector Geometry -- The Rapidly Forced Pendulum -- Exponentially Small Estimate for Separatrix Splittings -- Exponentially Small Phenomena in the Rapidly Forced Pendulum -- Proof of An Asymptotic Symmetry of the Rapidly Forced Pendulum -- Ordinary Differential Equations -- Exponentially Small Oscillations in the Solution of an Ordinary Differential Equation -- Singular Perturbations of Solitons -- Reflection Coefficient Beyond All Orders for Singular Problems -- Laminar Flow in a Porous Channel -- Existence and Stability of Particle Channeling in Crystals on Time-Scales Beyond All Orders -- Solitary Water Waves in the Presence of Small Surface Tension -- Gravity-Capillary Free Surface Flows -- Solitary Waves With Ripples Beyond All Orders -- Generalized Solitary Waves in a Stratified Fluid -- Problems in Optics -- Bending Losses in Optical Fibers -- Exponential Asymptotics and Spectral Theory for Curved Optical Waveguides -- Solitary Waves in Self-Induced Transparency -- Potpourri -- Exponential Asymptotics for Partial Differential Equations -- Problems of Existence of Nontopological Solitons (Breathers) for Nonlinear Klein-Gordon Equations -- Exponentially Small Residues Near Analytic Invariant Circles -- Asymptotics of Partial Differential and the Renormalization Group.An asymptotic expansion is a series that provides a sequence of increasingly accurate approximations to a function in a particular limit. The formal definition, given by Poincare (1886, Acta Math. 8:295), is as follows. Given a function,.Physics.Physics.Theoretical, Mathematical and Computational Physics.Springer eBookshttp://dx.doi.org/10.1007/978-1-4757-0435-8URN:ISBN:9781475704358
institution COLPOS
collection Koha
country México
countrycode MX
component Bibliográfico
access En linea
En linea
databasecode cat-colpos
tag biblioteca
region America del Norte
libraryname Departamento de documentación y biblioteca de COLPOS
language eng
topic Physics.
Physics.
Theoretical, Mathematical and Computational Physics.
Physics.
Physics.
Theoretical, Mathematical and Computational Physics.
spellingShingle Physics.
Physics.
Theoretical, Mathematical and Computational Physics.
Physics.
Physics.
Theoretical, Mathematical and Computational Physics.
Segur, Harvey. editor.
Tanveer, Saleh. editor.
Levine, Herbert. editor.
SpringerLink (Online service)
Asymptotics beyond All Orders [electronic resource] /
description An asymptotic expansion is a series that provides a sequence of increasingly accurate approximations to a function in a particular limit. The formal definition, given by Poincare (1886, Acta Math. 8:295), is as follows. Given a function,.
format Texto
topic_facet Physics.
Physics.
Theoretical, Mathematical and Computational Physics.
author Segur, Harvey. editor.
Tanveer, Saleh. editor.
Levine, Herbert. editor.
SpringerLink (Online service)
author_facet Segur, Harvey. editor.
Tanveer, Saleh. editor.
Levine, Herbert. editor.
SpringerLink (Online service)
author_sort Segur, Harvey. editor.
title Asymptotics beyond All Orders [electronic resource] /
title_short Asymptotics beyond All Orders [electronic resource] /
title_full Asymptotics beyond All Orders [electronic resource] /
title_fullStr Asymptotics beyond All Orders [electronic resource] /
title_full_unstemmed Asymptotics beyond All Orders [electronic resource] /
title_sort asymptotics beyond all orders [electronic resource] /
publisher Boston, MA : Springer US,
publishDate 1991
url http://dx.doi.org/10.1007/978-1-4757-0435-8
work_keys_str_mv AT segurharveyeditor asymptoticsbeyondallorderselectronicresource
AT tanveersaleheditor asymptoticsbeyondallorderselectronicresource
AT levineherberteditor asymptoticsbeyondallorderselectronicresource
AT springerlinkonlineservice asymptoticsbeyondallorderselectronicresource
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