Nonlinear Waves: An Introduction

Popivanov, Petar; Slavova, Angela

doi:10.1142/7867

Cited by 15 publications

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“…These relations are satisfied identically as a consequence of the NLEE (30). The third one also vanishes since tr [L, M ] = 0.…”

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confidence: 90%

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Riemann-Hilbert Problems with canonical normalization and families of commuting operators

Gerdjikov

2012

Preprint

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We start with a Riemann-Hilbert Problems (RHP) with canonical normalization whose sewing functions depends on several additional variables. Using Zakharov-Shabat theorem we are able to construct a family of ordinary differential operators for which the solution of the RHP is a common fundamental analytic solution. This family of operators obviously commute. Thus we are able to construct new classes of integrable nonlinear evolution equations.

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“…These relations are satisfied identically as a consequence of the NLEE (30). The third one also vanishes since tr [L, M ] = 0.…”

mentioning

confidence: 90%

“…The development of the soliton theory revealed an important class of NLEE (nonlinear evolution equations) that describe special types of wave-wave interactions [1,29,16,4,23,19,30] which play important role in various fields in physics.…”

Section: Introductionmentioning

confidence: 99%

Riemann-Hilbert Problems with canonical normalization and families of commuting operators

Gerdjikov

2012

Preprint

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“…In addition the Camassa-Holm equation also allows for the existence of breaking wave solutions, which are realised as solutions which remain bounded but whose gradient becomes unbounded in a finite time, cf. [3,4,9,10,7,53]. The presence of both peaked and breaking wave solutions for the system (CH) ensures the Camassa-Holm equation is a highly interesting physical model.…”

Section: Introductionmentioning

confidence: 99%

Camassa–Holm Cuspons, Solitons and Their Interactions via the Dressing Method

2019

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A dressing method is applied to a matrix Lax pair for the Camassa-Holm equation, thereby allowing for the construction of several global solutions of the system. In particular solutions of system of soliton and cuspon type are constructed explicitly. The interactions between soliton and cuspon solutions of the system are investigated. The geometric aspects of the Camassa-Holm equation ar re-examined in terms of quantities which can be explicitly constructed via the inverse scattering method.

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“…Nonlinear phenomena are usual for physics and especially for fluid mechanics [1] - [10]. One of the most interesting nonlinear phenomena are the nonlinear waves propagating in various media [11] - [17] and especially in fluids [18] - [21]. In this paper we shall discuss nonlinear waves connected to blood flow in large arteries [22] - [24].…”

Section: Introductionmentioning

confidence: 99%

Numerical Investigation Of Nonlinear Waves Connected To Blood Flow In An Elastic Tube With Variable Radius

Dimitrova

2015

Journal of Theoretical and Applied Mechanics

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Abstract. We investigate flow of incompressible fluid in a cylindrical tube with elastic walls. The radius of the tube may change along its length. The discussed problem is connected to the fluid-structure interaction in large human arteries and especially to nonlinear effects. The long-wave approximation is applied to solve model equations. The obtained model Korteweg-deVries equation possessing a variable coefficient is reduced to a nonlinear dynamical system of three first order differential equations. The low probability of a solitary wave arising is shown. Periodic wave solutions of the model system of equations are studied and it is shown that the waves, that are consequence of the irregular heart pulsations may be modelled by a sequence of parts of such periodic wave solutions.

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Nonlinear Waves: An Introduction

Cited by 15 publications

References 0 publications

Riemann-Hilbert Problems with canonical normalization and families of commuting operators

Riemann-Hilbert Problems with canonical normalization and families of commuting operators

Camassa–Holm Cuspons, Solitons and Their Interactions via the Dressing Method

Numerical Investigation Of Nonlinear Waves Connected To Blood Flow In An Elastic Tube With Variable Radius

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