2014, ISBN 3110321432, xvi, 354

Book

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

Book

2012, Use R!, ISBN 3642280706

eBook

2011, Graduate studies in mathematics, ISBN 0821852841, Volume 123, xvii, 410

Book

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

Book

2006, 1st ed., Mathematics in science and engineering, ISBN 9780444522009, Volume 205, 488

This book introduces the method of lower and upper solutions for ordinary differential equations. This method is known to be both easy and powerful to solve...

Boundary value problems | Functional differential equations

Boundary value problems | Functional differential equations

eBook

2006, 5th ed., ISBN 0125637381

Book

8.
Initial value methods for boundary value problems

: theory and application of invariant imbedding

1973, Mathematics in science and engineering, Volume 100, 220

Book

2011, Volume 559

Conference Proceeding

2016, De Gruyter studies in mathematics, ISBN 3110483394, Volume 64., ix, 516 pages

Book

2012, Graduate studies in mathematics, ISBN 9780821875766, Volume 135, xviii, 377

Book

1989, ISBN 9780444015112, viii, 210

Book

Journal of Mathematical Analysis and Applications, ISSN 0022-247X, 2011, Volume 382, Issue 1, pp. 426 - 447

We consider initial value/boundary value problems for fractional diffusion-wave equation: ∂ t α u ( x , t ) = L u ( x , t ) , where 0 < α ⩽ 2 , where L is a...

Fractional diffusion equation | Initial value/boundary value problem | Well-posedness | Inverse problem | MATHEMATICS | MATHEMATICS, APPLIED | INTEGRODIFFERENTIAL EQUATION | SPACES | HEAT-EQUATION | Universities and colleges

Fractional diffusion equation | Initial value/boundary value problem | Well-posedness | Inverse problem | MATHEMATICS | MATHEMATICS, APPLIED | INTEGRODIFFERENTIAL EQUATION | SPACES | HEAT-EQUATION | Universities and colleges

Journal Article

1983, Encyclopedia of Mathematics and its Applications, ISBN 9780201135176, Volume 18., xxii, 636

This volume deals with the Cauchy or initial value problem for linear differential equations. It treats in detail some of the applications of linear space...

Initial value problems | Cauchy problem | Functional differential equations

Initial value problems | Cauchy problem | Functional differential equations

Book

1967, 2nd ed., Interscience tracts in pure and applied mathematics, ISBN 0470720409, Volume no.4., xiv, 405

Book

1996, Classics in applied mathematics, ISBN 0898713536, Volume 14, x, 256

Book

17.
Full Text
Modified two‐step hybrid methods for the numerical integration of oscillatory problems

Mathematical Methods in the Applied Sciences, ISSN 0170-4214, 09/2017, Volume 40, Issue 14, pp. 5286 - 5294

The construction of modified two‐step hybrid methods for the numerical solution of second‐order initial value problems with periodic or oscillatory behavior is...

periodic or oscillatory behavior | modified two‐step hybrid methods | special second‐order initial‐value problems | special second-order initial-value problems | modified two-step hybrid methods | MATHEMATICS, APPLIED | NUMEROV-TYPE METHODS | Y''=F(X,Y) | STABILITY | FITTING METHODS | RADIAL SCHRODINGER-EQUATION | INITIAL-VALUE PROBLEMS | MINIMAL PHASE-LAG | KUTTA-NYSTROM METHODS | NOUMEROV-TYPE METHOD | EXPLICIT | Boundary value problems | Numerical methods | Numerical integration

periodic or oscillatory behavior | modified two‐step hybrid methods | special second‐order initial‐value problems | special second-order initial-value problems | modified two-step hybrid methods | MATHEMATICS, APPLIED | NUMEROV-TYPE METHODS | Y''=F(X,Y) | STABILITY | FITTING METHODS | RADIAL SCHRODINGER-EQUATION | INITIAL-VALUE PROBLEMS | MINIMAL PHASE-LAG | KUTTA-NYSTROM METHODS | NOUMEROV-TYPE METHOD | EXPLICIT | Boundary value problems | Numerical methods | Numerical integration

Journal Article

18.
The numerical solution of nonlinear stiff initial value problems

: an analysis of one step methods

1985, CWI tract., ISBN 9061962838, Volume 12, 138 p. --

Book

Computers and Mathematics with Applications, ISSN 0898-1221, 2011, Volume 61, Issue 11, pp. 3381 - 3390

An explicit optimized Runge–Kutta–Nyström method with four stages and fifth algebraic order is developed. The produced method has variable coefficients with...

Runge–Kutta–Nyström methods | Initial value problems | Phase-lag | Numerical solution | Explicit methods | Amplification factor | RungeKuttaNystrm methods | Runge-Kutta-Nystrom methods | MATHEMATICS, APPLIED

Runge–Kutta–Nyström methods | Initial value problems | Phase-lag | Numerical solution | Explicit methods | Amplification factor | RungeKuttaNystrm methods | Runge-Kutta-Nystrom methods | MATHEMATICS, APPLIED

Journal Article

1992, ISBN 3528064218, Volume E19., viii, 259

Book

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