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Regular version of the site
Master 2024/2025

Elements of the theory of solitons

Type: Compulsory course (Mathematics)
Area of studies: Mathematics
When: 1 year, 3, 4 module
Mode of studies: offline
Open to: students of one campus
Master’s programme: Mathematics
Language: English
ECTS credits: 6

Course Syllabus

Abstract

Solitons – structurally stable wave objects in nonlinear dynamical systems — were discovered in the 1970s in a series of basic nonlinear equations of physics; the class of soliton-like solutions of integrable and non-integrable equations continues to broaden. Solitons are essential or even dominant parts of wave solutions in practically important problems of physics (for example, the data transmission by optical pulses, internal waves and rogue waves in the ocean, non-destructive diagnostics of composite materials) and much beyond. The elaboration of the theory of solitons and of the theory of integrable systems has yielded the appearance and ongoing development of the corresponding mathematical techniques, and also broadening of the field of practical applications. The course will give an introduction to the theory of solitons – as a part of nonlinear dynamics. The distinctive features of these structures among nonlinear waves, the variety of their manifestations (solitons, envelope solitons, breathers) will be shown. The key elements of the Inverse Scattering Technique, and also the basic examples will be discussed. On the basis of multisoliton solutions, the features of the nonlinear wave interaction and focusing will be considered. Actual problems of the scientific research in the fields of nonlinear optics and hydrodynamics will be emphasized.