The Resource Asymptotic perturbation theory of waves, Lev Ostrovsky, NOAA ETL, USA
Asymptotic perturbation theory of waves, Lev Ostrovsky, NOAA ETL, USA
Resource Information
The item Asymptotic perturbation theory of waves, Lev Ostrovsky, NOAA ETL, USA represents a specific, individual, material embodiment of a distinct intellectual or artistic creation found in University of Missouri Libraries.This item is available to borrow from 2 library branches.
Resource Information
The item Asymptotic perturbation theory of waves, Lev Ostrovsky, NOAA ETL, USA represents a specific, individual, material embodiment of a distinct intellectual or artistic creation found in University of Missouri Libraries.
This item is available to borrow from 2 library branches.
- Summary
- This book is an introduction to the perturbation theory for linear and nonlinear waves in dispersive and dissipative media. The main focus is on the direct asymptotic method which is based on the asymptotic expansion of the solution in series of one or more small parameters and demanding finiteness of the perturbations; this results in slow variation of the main-order solution. The method, which does not depend on integrability of basic equations, is applied to quasi-harmonic and non-harmonic periodic waves, as well as to localized waves such as solitons, kinks, and autowaves. The basic theore
- Language
- eng
- Extent
- 1 online resource
- Contents
-
- Perturbed oscillations and waves: introductory examples
- Perturbation method for quasi-harmonic waves
- Perturbation method for non-sinusoidal waves
- Nonlinear waves of modulation
- Perturbation methods for solitary waves and fronts
- Perturbed solitons
- Interaction and ensembles of solitons and kinks
- Dissipative and active systems. Autowaves
- Isbn
- 9781848162365
- Label
- Asymptotic perturbation theory of waves
- Title
- Asymptotic perturbation theory of waves
- Statement of responsibility
- Lev Ostrovsky, NOAA ETL, USA
- Subject
-
- Differential equations -- Asymptotic theory
- Electronic books
- Nonlinear wave equations
- Nonlinear wave equations
- Perturbation (Mathematics)
- SCIENCE -- Mechanics | General
- SCIENCE -- Mechanics | Solids
- Wave-motion, Theory of
- Wave-motion, Theory of
- Perturbation (Mathematics)
- Differential equations -- Asymptotic theory
- Language
- eng
- Summary
- This book is an introduction to the perturbation theory for linear and nonlinear waves in dispersive and dissipative media. The main focus is on the direct asymptotic method which is based on the asymptotic expansion of the solution in series of one or more small parameters and demanding finiteness of the perturbations; this results in slow variation of the main-order solution. The method, which does not depend on integrability of basic equations, is applied to quasi-harmonic and non-harmonic periodic waves, as well as to localized waves such as solitons, kinks, and autowaves. The basic theore
- Cataloging source
- N$T
- http://library.link/vocab/creatorName
- Ostrovskiĭ, L. A
- Dewey number
- 531/.113301
- Index
- index present
- LC call number
- QC157
- LC item number
- .O777 2014eb
- Literary form
- non fiction
- Nature of contents
-
- dictionaries
- bibliography
- http://library.link/vocab/subjectName
-
- Wave-motion, Theory of
- Perturbation (Mathematics)
- Nonlinear wave equations
- Differential equations
- SCIENCE
- SCIENCE
- Differential equations
- Nonlinear wave equations
- Perturbation (Mathematics)
- Wave-motion, Theory of
- Label
- Asymptotic perturbation theory of waves, Lev Ostrovsky, NOAA ETL, USA
- Antecedent source
- unknown
- Bibliography note
- Includes bibliographical references and index
- Carrier category
- online resource
- Carrier category code
-
- cr
- Carrier MARC source
- rdacarrier
- Color
- multicolored
- Content category
- text
- Content type code
-
- txt
- Content type MARC source
- rdacontent
- Contents
- Perturbed oscillations and waves: introductory examples -- Perturbation method for quasi-harmonic waves -- Perturbation method for non-sinusoidal waves -- Nonlinear waves of modulation -- Perturbation methods for solitary waves and fronts -- Perturbed solitons -- Interaction and ensembles of solitons and kinks -- Dissipative and active systems. Autowaves
- Control code
- 892911228
- Dimensions
- unknown
- Extent
- 1 online resource
- File format
- unknown
- Form of item
- online
- Isbn
- 9781848162365
- Level of compression
- unknown
- Media category
- computer
- Media MARC source
- rdamedia
- Media type code
-
- c
- Quality assurance targets
- not applicable
- Reformatting quality
- unknown
- Sound
- unknown sound
- Specific material designation
- remote
- System control number
- (OCoLC)892911228
- Label
- Asymptotic perturbation theory of waves, Lev Ostrovsky, NOAA ETL, USA
- Antecedent source
- unknown
- Bibliography note
- Includes bibliographical references and index
- Carrier category
- online resource
- Carrier category code
-
- cr
- Carrier MARC source
- rdacarrier
- Color
- multicolored
- Content category
- text
- Content type code
-
- txt
- Content type MARC source
- rdacontent
- Contents
- Perturbed oscillations and waves: introductory examples -- Perturbation method for quasi-harmonic waves -- Perturbation method for non-sinusoidal waves -- Nonlinear waves of modulation -- Perturbation methods for solitary waves and fronts -- Perturbed solitons -- Interaction and ensembles of solitons and kinks -- Dissipative and active systems. Autowaves
- Control code
- 892911228
- Dimensions
- unknown
- Extent
- 1 online resource
- File format
- unknown
- Form of item
- online
- Isbn
- 9781848162365
- Level of compression
- unknown
- Media category
- computer
- Media MARC source
- rdamedia
- Media type code
-
- c
- Quality assurance targets
- not applicable
- Reformatting quality
- unknown
- Sound
- unknown sound
- Specific material designation
- remote
- System control number
- (OCoLC)892911228
Subject
- Differential equations -- Asymptotic theory
- Electronic books
- Nonlinear wave equations
- Nonlinear wave equations
- Perturbation (Mathematics)
- SCIENCE -- Mechanics | General
- SCIENCE -- Mechanics | Solids
- Wave-motion, Theory of
- Wave-motion, Theory of
- Perturbation (Mathematics)
- Differential equations -- Asymptotic theory
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<div class="citation" vocab="http://schema.org/"><i class="fa fa-external-link-square fa-fw"></i> Data from <span resource="http://link.library.missouri.edu/portal/Asymptotic-perturbation-theory-of-waves-Lev/OAkIjlQREfU/" typeof="Book http://bibfra.me/vocab/lite/Item"><span property="name http://bibfra.me/vocab/lite/label"><a href="http://link.library.missouri.edu/portal/Asymptotic-perturbation-theory-of-waves-Lev/OAkIjlQREfU/">Asymptotic perturbation theory of waves, Lev Ostrovsky, NOAA ETL, USA</a></span> - <span property="potentialAction" typeOf="OrganizeAction"><span property="agent" typeof="LibrarySystem http://library.link/vocab/LibrarySystem" resource="http://link.library.missouri.edu/"><span property="name http://bibfra.me/vocab/lite/label"><a property="url" href="http://link.library.missouri.edu/">University of Missouri Libraries</a></span></span></span></span></div>
