Asymptotics beyond All Orders [electronic resource] /
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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Boston, MA : Springer US,
1991
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Subjects: | Physics., Theoretical, Mathematical and Computational Physics., |
Online Access: | http://dx.doi.org/10.1007/978-1-4757-0435-8 |
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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 |
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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] / |
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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,. |
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) |
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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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1756265613146193920 |