Semiclassical Soliton Ensembles for the Focusing Nonlinear Schrodinger Equation (AM-154)

More About This Textbook

Overview
Editorial Reviews
Product Details
Related Subjects
Table of Contents

Overview

This book represents the first asymptotic analysis, via completely integrable techniques, of the initial value problem for the focusing nonlinear Schrödinger equation in the semiclassical asymptotic regime. This problem is a key model in nonlinear optical physics and has increasingly important applications in the telecommunications industry. The authors exploit complete integrability to establish pointwise asymptotics for this problem's solution in the semiclassical regime and explicit integration for the underlying nonlinear, elliptic, partial differential equations suspected of governing the semiclassical behavior. In doing so they also aim to explain the observed gradient catastrophe for the underlying nonlinear elliptic partial differential equations, and to set forth a detailed, pointwise asymptotic description of the violent oscillations that emerge following the gradient catastrophe.

To achieve this, the authors have extended the reach of two powerful analytical techniques that have arisen through the asymptotic analysis of integrable systems: the Lax-Levermore-Venakides variational approach to singular limits in integrable systems, and Deift and Zhou's nonlinear Steepest-Descent/Stationary Phase method for the analysis of Riemann-Hilbert problems. In particular, they introduce a systematic procedure for handling certain Riemann-Hilbert problems with poles accumulating on curves in the plane. This book, which includes an appendix on the use of the Fredholm theory for Riemann-Hilbert problems in the Hölder class, is intended for researchers and graduate students of applied mathematics and analysis, especially those with an interest in integrable systems, nonlinear waves, or complex analysis.

Editorial Reviews

Bulletin of the London Mathematical Society

Overall, this . . . book [gives] a deep insight into the application of inverse scattering to equation. . . . Most of the current books on solution theory tend to focus mainly on inverse scattering for the KdV equation, so a book that concentrates solely on the NLS equation is refreshing.
— Peter Clarkson

Bulletin of the London Mathematical Society - Peter Clarkson

Product Details

ISBN-13: 9780691114828
Publisher: Princeton University Press
Publication date: 8/18/2003
Series: Annals of Mathematics Studies Series , #154
Pages: 304
Product dimensions: 6.12 (w) x 9.18 (h) x 0.72 (d)

	List of Figures and Tables
	Preface
Ch. 1	Introduction and Overview	1
Ch. 2	Holomorphic Riemann-Hilbert Problems for Solitons	13
Ch. 3	Semiclassical Soliton Ensembles	23
3.1	Formal WKB Formulae for Even, Bell-Shaped, Real-Valued Initial Conditions	23
3.2	Asymptotic Properties of the Discrete WKB Spectrum	26
3.3	The Satsuma-Yajima Semiclassical Soliton Ensemble	34
Ch. 4	Asymptotic Analysis of the Inverse Problem	37
4.1	Introducing the Complex Phase	38
4.2	Representation as a Complex Single-Layer Potential. Passing to the Continum Limit. Conditions on the Complex Phase Leading to the Outer Model Problem	40
4.3	Exact Solution of the Outer Model Problem	51
4.4	Inner Approximations	69
4.5	Estimating the Error	106
Ch. 5	Direct Construction of the Complex Phase	121
5.1	Postponing the Inequalities. General Considerations	121
5.2	Imposing the Inequalities. Local and Global Continuation Theory	138
5.3	Modulation Equations	148
5.4	Symmetries of the Endpoint Equations	159
Ch. 6	The Genus-Zero Ansatz	163
6.1	Location of the Endpoints for General Data	163
6.2	Success of the Ansatz for General Data and Small Time. Rigorous Small-Time Asymptotics for Semiclassical Soliton Ensembles	164
6.3	Larger-Time Analysis for Soliton Ensembles	175
6.4	The Elliptic Modulation Equations and the Particular Solution of Akhmanov, Sukhorukov, and Khokhlov for the Satsuma-Yajima Initial Data	191
Ch. 7	The Transition to Genus Two	195
7.1	Matching the Critical G = 0 Ansatz with a Degenerate G = 2 Ansatz	196
7.2	Perturbing the Degenerate G = 2 Ansatz. Opening the Band I[subscript l][superscript +] by Varying x near x[subscript crit]	200
Ch. 8	Variational Theory of the Complex Phase	215
Ch. 9	Conclusion and Outlook	223
9.1	Generalization for Nonquantum Values of h	223
9.2	Effect of Complex Singularities in p[superscript 0(n)	224
9.3	Uniformity of the Error near t = 0	225
9.4	Errors Incurred by Modifying the Initial Data	225
9.5	Analysis of the Max-Min Variational Problem	226
9.6	Initial Data with S(x) [is not equal to] 0	227
9.7	Final Remarks	228
App. A	Holder Theory of Local Riemann-Hilbert Problems	229
App. B	Near-Identity Riemann-Hilbert Problems in L[superscript 2]	253
	Bibliography	255
	Index	259

Customer Reviews

Be the first to write a review

( 0 )

5 Star

(0)

4 Star

(0)

3 Star

(0)

2 Star

(0)

1 Star

(0)

Your Rating:

Poor

Below Average

Good

Very Good

Exceptional

Review Guidelines

Tell the world what you think of this product.

Add Recommendations

Your Name: Create a Pen Name or Leave Anonymously

Barnes & Noble.com Review Rules

Our reader reviews allow you to share your comments on titles you liked, or didn't, with others. By submitting an online review, you are representing to Barnes & Noble.com that all information contained in your review is original and accurate in all respects, and that the submission of such content by you and the posting of such content by Barnes & Noble.com does not and will not violate the rights of any third party. Please follow the rules below to help ensure that your review can be posted.

Reviews by Our Customers Under the Age of 13

We highly value and respect everyone's opinion concerning the titles we offer. However, we cannot allow persons under the age of 13 to have accounts at BN.com or to post customer reviews. Please see our Terms of Use for more details.

What to exclude from your review:

Please do not write about reviews, commentary, or information posted on the product page. If you see any errors in the information on the product page, please send us an email.

Reviews should not contain any of the following:

- HTML tags, profanity, obscenities, vulgarities, or comments that defame anyone
- Time-sensitive information such as tour dates, signings, lectures, etc.
- Single-word reviews. Other people will read your review to discover why you liked or didn't like the title. Be descriptive.
- Comments focusing on the author or that may ruin the ending for others
- Phone numbers, addresses, URLs
- Pricing and availability information or alternative ordering information
- Advertisements or commercial solicitation

Reminder:

- By submitting a review, you grant to Barnes & Noble.com and its sublicensees the royalty-free, perpetual, irrevocable right and license to use the review in accordance with the Barnes & Noble.com Terms of Use.
- Barnes & Noble.com reserves the right not to post any review -- particularly those that do not follow the terms and conditions of these Rules. Barnes & Noble.com also reserves the right to remove any review at any time without notice.
- See Terms of Use for other conditions and disclaimers.

If you find inappropriate content, please report it to Barnes & Noble