Artikel
Open Access
Super Exponentially Convergent Approximation to the Solution of the Schrödinger Equation in Abstract Setting
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I.P. Gavrilyuk
Veröffentlicht/Copyright:
1. Januar 2010
Received: 2010-08-15
Revised: 2010-09-09
Accepted: 2010-09-28
Published Online: 2010
Published in Print: 2010
© Institute of Mathematics, NAS of Belarus
Artikel in diesem Heft
- Super Exponentially Convergent Approximation to the Solution of the Schrödinger Equation in Abstract Setting
- Approximate Solution of a Singular Integral Cauchy-Kernel Equation of the First Kind
- Derivative-Free Optimal Iterative Methods
- Quantics-TT Collocation Approximation of Parameter-Dependent and Stochastic Elliptic PDEs
- Well-Posedness and Blow Up for IBVP for Semilinear Parabolic Equations and Numerical Methods
- On Positivity and Maximum-Norm Contractivity in Time Stepping Methods for Parabolic Equations
- Lavrentiev Regularization and Balancing Principle for Solving Ill-Posed Problems with Monotone Operators
Schlagwörter für diesen Artikel
exact representation of the solution;
super exponentially convergent algorithms;
Cayley transform;
Schrödinger equation
Creative Commons
BY-NC-ND 4.0
Artikel in diesem Heft
- Super Exponentially Convergent Approximation to the Solution of the Schrödinger Equation in Abstract Setting
- Approximate Solution of a Singular Integral Cauchy-Kernel Equation of the First Kind
- Derivative-Free Optimal Iterative Methods
- Quantics-TT Collocation Approximation of Parameter-Dependent and Stochastic Elliptic PDEs
- Well-Posedness and Blow Up for IBVP for Semilinear Parabolic Equations and Numerical Methods
- On Positivity and Maximum-Norm Contractivity in Time Stepping Methods for Parabolic Equations
- Lavrentiev Regularization and Balancing Principle for Solving Ill-Posed Problems with Monotone Operators
