Nonlinear Systems and Their Remarkable Mathematical Structures (eBook, ePUB)
Volume 1
Redaktion: Euler, Norbert
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Nonlinear Systems and Their Remarkable Mathematical Structures (eBook, ePUB)
Volume 1
Redaktion: Euler, Norbert
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The book aims to describe some recent progress in nonlinear differential equations and nonlinear dynamical systems (both continuous and discrete).
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- Größe: 3.94MB
The book aims to describe some recent progress in nonlinear differential equations and nonlinear dynamical systems (both continuous and discrete).
Dieser Download kann aus rechtlichen Gründen nur mit Rechnungsadresse in A, B, BG, CY, CZ, D, DK, EW, E, FIN, F, GR, HR, H, IRL, I, LT, L, LR, M, NL, PL, P, R, S, SLO, SK ausgeliefert werden.
Produktdetails
- Produktdetails
- Verlag: Taylor & Francis
- Seitenzahl: 598
- Erscheinungstermin: 19. November 2018
- Englisch
- ISBN-13: 9780429893803
- Artikelnr.: 67489990
- Verlag: Taylor & Francis
- Seitenzahl: 598
- Erscheinungstermin: 19. November 2018
- Englisch
- ISBN-13: 9780429893803
- Artikelnr.: 67489990
Norbert Euler is a professor of mathematics at Luleå University of Technology in Sweden. He is teaching a wide variety of mathematics courses at both the undergraduate and postgraduate level and has done so at several universities worldwide for more than 25 years. He is an active researcher and has to date published over 70 peer reviewed research articles in the subject of nonlinear systems and he is a co-author of several books. He is also involved in editorial work for some international journals, and he is the Editor-in-Chief of the Journal of Nonlinear Mathematical Physics since 1997.
Part A: Nonlinear Integrable Systems A1. Systems of nonlinearly-coupled
differential equations solvable A2. Integrable nonlinear PDEs on the
half-line A3. Detecting discrete integrability: the singularity approach
A4. Elementary introduction to discrete soliton equations A5. New results
on integrability of the Kahan-Hirota-Kimura discretizations Part B:
Solution Methods and Solution Structures B1. Dynamical systems satisfied by
special polynomials and related isospectral matrices defined in terms of
their zeros B2. Singularity methods for meromorphic solutions of
differential equations B3. Pfeiffer-Sato solutions of Buhl's problem and a
Lagrange-D'Alembert principle for Heavenly equations B4. Superposition
formulae for nonlinear integrable equations in bilinear form B5. Matrix
solutions for equations of the AKNS system B6. Algebraic traveling waves
for the generalized KdV-Burgers equation and the Kuramoto-Sivashinsky
equation Part C: Symmetry Methods for Nonlinear Systems C1. Nonlocal
invariance of the multipotentialisations of the Kupershmidt equation and
its higher-order hierarchies C2. Geometry of normal forms for dynamical
systems C3. Computing symmetries and recursion operators of evolutionary
super-systems using the SsTools environment C4. Symmetries of It^o
stochastic differential equations and their applications C5. Statistical
symmetries of turbulence Part D: Nonlinear Systems in Applications D1.
Integral transforms and ordinary differential equations of infinite order
D2. The role of nonlinearity in geostrophic ocean flows on a sphere D3.
Review of results on a system of type many predators - one prey D4.
Ermakov-type systems in nonlinear physics and continuum mechanics
differential equations solvable A2. Integrable nonlinear PDEs on the
half-line A3. Detecting discrete integrability: the singularity approach
A4. Elementary introduction to discrete soliton equations A5. New results
on integrability of the Kahan-Hirota-Kimura discretizations Part B:
Solution Methods and Solution Structures B1. Dynamical systems satisfied by
special polynomials and related isospectral matrices defined in terms of
their zeros B2. Singularity methods for meromorphic solutions of
differential equations B3. Pfeiffer-Sato solutions of Buhl's problem and a
Lagrange-D'Alembert principle for Heavenly equations B4. Superposition
formulae for nonlinear integrable equations in bilinear form B5. Matrix
solutions for equations of the AKNS system B6. Algebraic traveling waves
for the generalized KdV-Burgers equation and the Kuramoto-Sivashinsky
equation Part C: Symmetry Methods for Nonlinear Systems C1. Nonlocal
invariance of the multipotentialisations of the Kupershmidt equation and
its higher-order hierarchies C2. Geometry of normal forms for dynamical
systems C3. Computing symmetries and recursion operators of evolutionary
super-systems using the SsTools environment C4. Symmetries of It^o
stochastic differential equations and their applications C5. Statistical
symmetries of turbulence Part D: Nonlinear Systems in Applications D1.
Integral transforms and ordinary differential equations of infinite order
D2. The role of nonlinearity in geostrophic ocean flows on a sphere D3.
Review of results on a system of type many predators - one prey D4.
Ermakov-type systems in nonlinear physics and continuum mechanics
Part A: Nonlinear Integrable Systems A1. Systems of nonlinearly-coupled
differential equations solvable A2. Integrable nonlinear PDEs on the
half-line A3. Detecting discrete integrability: the singularity approach
A4. Elementary introduction to discrete soliton equations A5. New results
on integrability of the Kahan-Hirota-Kimura discretizations Part B:
Solution Methods and Solution Structures B1. Dynamical systems satisfied by
special polynomials and related isospectral matrices defined in terms of
their zeros B2. Singularity methods for meromorphic solutions of
differential equations B3. Pfeiffer-Sato solutions of Buhl's problem and a
Lagrange-D'Alembert principle for Heavenly equations B4. Superposition
formulae for nonlinear integrable equations in bilinear form B5. Matrix
solutions for equations of the AKNS system B6. Algebraic traveling waves
for the generalized KdV-Burgers equation and the Kuramoto-Sivashinsky
equation Part C: Symmetry Methods for Nonlinear Systems C1. Nonlocal
invariance of the multipotentialisations of the Kupershmidt equation and
its higher-order hierarchies C2. Geometry of normal forms for dynamical
systems C3. Computing symmetries and recursion operators of evolutionary
super-systems using the SsTools environment C4. Symmetries of It^o
stochastic differential equations and their applications C5. Statistical
symmetries of turbulence Part D: Nonlinear Systems in Applications D1.
Integral transforms and ordinary differential equations of infinite order
D2. The role of nonlinearity in geostrophic ocean flows on a sphere D3.
Review of results on a system of type many predators - one prey D4.
Ermakov-type systems in nonlinear physics and continuum mechanics
differential equations solvable A2. Integrable nonlinear PDEs on the
half-line A3. Detecting discrete integrability: the singularity approach
A4. Elementary introduction to discrete soliton equations A5. New results
on integrability of the Kahan-Hirota-Kimura discretizations Part B:
Solution Methods and Solution Structures B1. Dynamical systems satisfied by
special polynomials and related isospectral matrices defined in terms of
their zeros B2. Singularity methods for meromorphic solutions of
differential equations B3. Pfeiffer-Sato solutions of Buhl's problem and a
Lagrange-D'Alembert principle for Heavenly equations B4. Superposition
formulae for nonlinear integrable equations in bilinear form B5. Matrix
solutions for equations of the AKNS system B6. Algebraic traveling waves
for the generalized KdV-Burgers equation and the Kuramoto-Sivashinsky
equation Part C: Symmetry Methods for Nonlinear Systems C1. Nonlocal
invariance of the multipotentialisations of the Kupershmidt equation and
its higher-order hierarchies C2. Geometry of normal forms for dynamical
systems C3. Computing symmetries and recursion operators of evolutionary
super-systems using the SsTools environment C4. Symmetries of It^o
stochastic differential equations and their applications C5. Statistical
symmetries of turbulence Part D: Nonlinear Systems in Applications D1.
Integral transforms and ordinary differential equations of infinite order
D2. The role of nonlinearity in geostrophic ocean flows on a sphere D3.
Review of results on a system of type many predators - one prey D4.
Ermakov-type systems in nonlinear physics and continuum mechanics