2008, Lecture notes in physics, ISBN 9783540729945, Volume 728, vii, 301

Book

2.
Classical methods in ordinary differential equations

: with applications to boundary value problems

2012, Graduate studies in mathematics, ISBN 0821846949, Volume 129, xvii, 373

Book

2007, De Gruyter series in nonlinear analysis and applications, ISBN 9783110189421, Volume 11, xi, 303

Book

2007, Oxford Texts in Applied and Engineering Mathematics, ISBN 0199212031, vi, 587

An ideal companion to the student textbook Nonlinear Ordinary Differential Equations 4th Edition (OUP, 2007) this text contains over 500 problems and solutions...

Differential equations, Nonlinear | Nonlinear theories | Problems, exercises, etc

Differential equations, Nonlinear | Nonlinear theories | Problems, exercises, etc

Book

2010, ISBN 3527407995, x, 309

This is the only book available in English language to consider inverse and optimization problems in which phase field distributions are used as optimizing...

Nonlinear integral equations | Mathematical optimization | Field theory (Physics) | Wave mechanics

Nonlinear integral equations | Mathematical optimization | Field theory (Physics) | Wave mechanics

Book

2003, ISBN 3540443339, xiv, 961

Book

1992, Lecture notes in mathematics, ISBN 9783540562511, Volume 1528., vi, 297

The study of complementarity problems is now an interesting mathematical subject with many applications in optimization, game theory, stochastic optimal...

Calculus of variations | Variational inequalities (Mathematics) | Convex domains | Operations research | Economic theory | Systems Theory, Control | Calculus of Variations and Optimal Control; Optimization | Operations Research/Decision Theory | Economic Theory/Quantitative Economics/Mathematical Methods | Systems theory | Mathematical optimization

Calculus of variations | Variational inequalities (Mathematics) | Convex domains | Operations research | Economic theory | Systems Theory, Control | Calculus of Variations and Optimal Control; Optimization | Operations Research/Decision Theory | Economic Theory/Quantitative Economics/Mathematical Methods | Systems theory | Mathematical optimization

Book

Nonlinear boundary value problems, 1997

Journal

1972, Mathematics in science and engineering, ISBN 9780127424507, Volume 89., xi, 236

Book

2016, IET control, robotics and sensors series, ISBN 9781785611759, Volume 107, ix, 437 pages

This work presents a collection of exercises on dynamical systems, modelling and control for university students in the areas of engineering, applied,...

Differentiable dynamical systems | Dynamics | Technology | Differential equations | Automatic control

Differentiable dynamical systems | Dynamics | Technology | Differential equations | Automatic control

Book

2013, De Gruyter studies in mathematics, ISBN 3110258609, Volume 47, xiii, 341

Book

2013, ISBN 9780691156491, x, 176 pages

The P-NP problem is the most important open problem in computer science, if not all of mathematics. Simply stated, it asks whether every problem whose solution...

Computer algorithms | NP-complete problems | Mathematics | Technology | MATHEMATICS | Programming | History & Philosophy | Algorithms | COMPUTERS

Computer algorithms | NP-complete problems | Mathematics | Technology | MATHEMATICS | Programming | History & Philosophy | Algorithms | COMPUTERS

Book

1998, English language ed., Applied mathematics and mathematical computation, ISBN 9780412786600, Volume 14, 2 v. (xxi, 387 p.)

Book

International Journal of Bifurcation and Chaos, ISSN 0218-1274, 01/2013, Volume 23, Issue 1, pp. 1330002 - 1330069

From a computational point of view, in nonlinear dynamical systems, attractors can be regarded as self-excited and hidden attractors. Self-excited attractors...

drilling system | quadratic system | induction motor | Aizerman conjecture | absolute stability | describing function method | Chua circuits | harmonic balance | Hidden oscillation | phase-locked loop (PLL) | Kalman conjecture | 16th Hilbert problem | Lienard equation | Lyapunov focus values (Lyapunov quantities Poincaré-Lyapunov constants Lyapunov coefficients) | large (normal amplitude) and small limit cycle | hidden attractor | nonlinear control system | SIZE LIMIT-CYCLES | BIFURCATIONS | ORDER 3 | ASYMPTOTIC STABILITY | COMPUTATION | LYAPUNOV QUANTITIES | MULTIDISCIPLINARY SCIENCES | 16TH PROBLEM | QUADRATIC DIFFERENTIAL-SYSTEMS | WEAK FOCUS | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | Lyapunov focus values (Lyapunov quantities, Poincare-Lyapunov constants, Lyapunov coefficients) | Control systems | Analysis | Crashes | Computation | Circuits | Chaos theory | Mathematical analysis | Oscillations | Dynamical systems | Standards

drilling system | quadratic system | induction motor | Aizerman conjecture | absolute stability | describing function method | Chua circuits | harmonic balance | Hidden oscillation | phase-locked loop (PLL) | Kalman conjecture | 16th Hilbert problem | Lienard equation | Lyapunov focus values (Lyapunov quantities Poincaré-Lyapunov constants Lyapunov coefficients) | large (normal amplitude) and small limit cycle | hidden attractor | nonlinear control system | SIZE LIMIT-CYCLES | BIFURCATIONS | ORDER 3 | ASYMPTOTIC STABILITY | COMPUTATION | LYAPUNOV QUANTITIES | MULTIDISCIPLINARY SCIENCES | 16TH PROBLEM | QUADRATIC DIFFERENTIAL-SYSTEMS | WEAK FOCUS | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | Lyapunov focus values (Lyapunov quantities, Poincare-Lyapunov constants, Lyapunov coefficients) | Control systems | Analysis | Crashes | Computation | Circuits | Chaos theory | Mathematical analysis | Oscillations | Dynamical systems | Standards

Journal Article

Inverse Problems, ISSN 0266-5611, 01/2019, Volume 35, Issue 3, p. 35004

The primary objective of this research is to investigate an inverse problem of parameter identification in nonlinear mixed quasi-variational inequalities posed...

nonlinear quasi-variational inequality | obstacle problem | p -Laplacian | inverse problems | regularization | EXISTENCE | MATHEMATICS, APPLIED | p-Laplacian | HEMIVARIATIONAL INEQUALITIES | IDENTIFICATION | PHYSICS, MATHEMATICAL | VALUED EQUILIBRIUM PROBLEMS

nonlinear quasi-variational inequality | obstacle problem | p -Laplacian | inverse problems | regularization | EXISTENCE | MATHEMATICS, APPLIED | p-Laplacian | HEMIVARIATIONAL INEQUALITIES | IDENTIFICATION | PHYSICS, MATHEMATICAL | VALUED EQUILIBRIUM PROBLEMS

Journal Article

1993, 1st ed., Mathematical research, ISBN 3055015843, Volume 71, 124

Book

2008, Oxford lecture series in mathematics and its applications, ISBN 0195334728, Volume 37, xvi, 298

Book

20.
Full Text
Numerical solution of the Optimal Transportation problem using the Monge–Ampère equation

Journal of Computational Physics, ISSN 0021-9991, 03/2014, Volume 260, Issue 1, pp. 107 - 126

A numerical method for the solution of the elliptic Monge–Ampère Partial Differential Equation, with boundary conditions corresponding to the Optimal...

Fully nonlinear elliptic partial differential equations | Monotone schemes | Numerical methods | Optimal Transportation | Monge Ampère equation | Convexity | Finite difference methods | Viscosity solutions | BOUNDARY-VALUE PROBLEM | HAMILTON-JACOBI EQUATIONS | Monge Ampere equation | PHYSICS, MATHEMATICAL | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | MASS-TRANSFER PROBLEM | CONSTRUCTION | FLOWS | FINITE-DIFFERENCE SOLVERS | SCHEMES | GEOMETRY | Transportation industry | Monge-Ampere equation | Computation | Disengaging | Boundary conditions | Mathematical models | Density | Optimization | Finite difference method | Mathematics

Fully nonlinear elliptic partial differential equations | Monotone schemes | Numerical methods | Optimal Transportation | Monge Ampère equation | Convexity | Finite difference methods | Viscosity solutions | BOUNDARY-VALUE PROBLEM | HAMILTON-JACOBI EQUATIONS | Monge Ampere equation | PHYSICS, MATHEMATICAL | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | MASS-TRANSFER PROBLEM | CONSTRUCTION | FLOWS | FINITE-DIFFERENCE SOLVERS | SCHEMES | GEOMETRY | Transportation industry | Monge-Ampere equation | Computation | Disengaging | Boundary conditions | Mathematical models | Density | Optimization | Finite difference method | Mathematics

Journal Article

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