Addendum: ‘‘Computer graphics for solutions of time‐dependent Schrödinger equations’’: Note on the numerical solutions of the Schrödinger equation

1983 ◽  
Vol 51 (6) ◽  
pp. 570-570 ◽  
Author(s):  
Robert L. W. Chen
Keyword(s):  
Computer Graphics ◽  
Schrödinger Equation ◽  
Schrodinger Equation ◽  
Numerical Solutions ◽  
Time Dependent ◽  
Schrodinger Equations ◽  
Schrödinger Equations

EQUIVALENCE OF TIME-DEPENDENT SCHRÖDINGER EQUATIONS WITH CONSTANT AND TIME-DEPENDENT MASS

2003 ◽  
Vol 18 (39) ◽  
pp. 2829-2835 ◽  
Author(s):  
AXEL SCHULZE-HALBERG
Keyword(s):  
Schrödinger Equation ◽  
Explicit Formula ◽  
Schrodinger Equation ◽  
Time Dependent ◽  
Schrodinger Equations ◽  
Schrödinger Equations ◽  
Constant Mass ◽  
Dependent Mass

We show that the time-dependent Schrödinger equation (TDSE) for a potential of the form V(x,t)=A(t)x2+B(t)x+C(t) and time-dependent mass can be transformed into the same TDSE with constant mass. We obtain an explicit formula relating solutions of the TDSE for time-dependent mass and for constant mass to each other.

MORAWETZ AND INTERACTION MORAWETZ ESTIMATES FOR A QUASILINEAR SCHRÖDINGER EQUATION

2012 ◽  
Vol 09 (04) ◽  
pp. 613-639 ◽  
Author(s):  
ALESSANDRO SELVITELLA ◽  
YUN WANG
Keyword(s):  
Schrödinger Equation ◽  
Plasma Physics ◽  
Schrodinger Equation ◽  
Energy Space ◽  
Schrodinger Equations ◽  
Schrödinger Equations ◽  
Quasilinear Schrödinger Equation

We extend the classical Morawetz and interaction Morawetz machinery to a class of quasilinear Schrödinger equations coming from plasma physics. As an application of our main results we ensure the absence of pseudosolitons in the defocusing case. Our estimates are the first step to a scattering result in the energy space for this equation.

scholarly journals AN UNCERTAINTY PRINCIPLE FOR SOLUTIONS OF THE SCHRÖDINGER EQUATION ON -TYPE GROUPS

2020 ◽  
pp. 1-16
Author(s):  
AINGERU FERNÁNDEZ-BERTOLIN ◽  
PHILIPPE JAMING ◽  
SALVADOR PÉREZ-ESTEVA
Keyword(s):  
Schrödinger Equation ◽  
Uncertainty Principle ◽  
Schrodinger Equation ◽  
Schrodinger Equations ◽  
Nilpotent Lie Groups ◽  
Schrödinger Equations ◽  
Uncertainty Principles ◽  
Uniqueness Of Solutions ◽  
Free Case ◽  
Formula Type

In this paper we consider uncertainty principles for solutions of certain partial differential equations on $H$ -type groups. We first prove that, on $H$ -type groups, the heat kernel is an average of Gaussians in the central variable, so that it does not satisfy a certain reformulation of Hardy’s uncertainty principle. We then prove the analogue of Hardy’s uncertainty principle for solutions of the Schrödinger equation with potential on $H$ -type groups. This extends the free case considered by Ben Saïd et al. [‘Uniqueness of solutions to Schrödinger equations on H-type groups’, J. Aust. Math. Soc. (3)95 (2013), 297–314] and by Ludwig and Müller [‘Uniqueness of solutions to Schrödinger equations on 2-step nilpotent Lie groups’, Proc. Amer. Math. Soc.142 (2014), 2101–2118].

Solitary Waves for Quasilinear Schrödinger Equations Arising in Plasma Physics

2009 ◽  
Vol 9 (3) ◽  
Author(s):  
João Marcos do Ó ◽  
Abbas Moameni
Keyword(s):  
Schrödinger Equation ◽  
Plasma Physics ◽  
Solitary Waves ◽  
Schrodinger Equation ◽  
Schrodinger Equations ◽  
Schrödinger Equations ◽  
Quasilinear Schrödinger Equation

AbstractWe study the quasilinear Schrödinger equationizwhere W : ℝ

scholarly journals Schrödinger equations in noncylindrical domains: exact controllability

2006 ◽  
Vol 2006 ◽  
pp. 1-29
Author(s):  
G. O. Antunes ◽  
M. D. G. da Silva ◽  
R. F. Apolaya
Keyword(s):  
Schrödinger Equation ◽  
Schrodinger Equation ◽  
Exact Controllability ◽  
Schrodinger Equations ◽  
Lateral Boundary ◽  
Schrödinger Equations ◽  
Orthogonal Matrices ◽  
Noncylindrical Domain ◽  
Bounded Set

We consider an open bounded setΩ⊂ℝnand a family{K(t)}t≥0of orthogonal matrices ofℝn. SetΩt={x∈ℝn;x=K(t)y,for all y∈Ω}, whose boundary isΓt. We denote byQ^the noncylindrical domain given byQ^=∪0<t<T{Ωt×{t}}, with the regular lateral boundaryΣ^=∪0<t<T{Γt×{t}}. In this paper we investigate the boundary exact controllability for the linear Schrödinger equationu′−iΔu=finQ^(i2=−1),u=wonΣ^,u(x,0)=u0(x)inΩ0, wherewis the control.

NUMERICAL SOLUTIONS OF QUANTUM MECHANICAL PROBLEMS USING THE BASIS-SPLINE COLLOCATION METHOD

2001 ◽  
Vol 12 (07) ◽  
pp. 1093-1108 ◽  
Author(s):  
D. O. ODERO ◽  
J. L. PEACHER ◽  
D. H. MADISON
Keyword(s):  
Collocation Method ◽  
Analytical Solutions ◽  
Numerical Solutions ◽  
Time Dependent ◽  
Quantum Mechanical ◽  
Schrodinger Equations ◽  
Schrödinger Equations ◽  
Spline Collocation ◽  
Spline Collocation Method

The time-dependent and time-independent Schrödinger equations have been numerically solved for several quantum mechanical problems with known analytical solutions using the basis-spline collocation algorithm. This algorithm has been demonstrated to be efficient and versatile. The results from these calculations illustrate the necessary numerical considerations required for solving both time-independent and time-dependent Schrödinger equations and form a basis that could be used for solving these and similar problems.

A Sign-Changing Solution for an Asymptotically Linear Schrödinger Equation

2015 ◽  
Vol 58 (3) ◽  
pp. 697-716 ◽  
Author(s):  
Liliane A. Maia ◽  
Olimpio H. Miyagaki ◽  
Sergio H. M. Soares
Keyword(s):  
Variational Principle ◽  
Schrödinger Equation ◽  
Schrodinger Equation ◽  
Ekeland Variational Principle ◽  
Schrodinger Equations ◽  
Schrödinger Equations ◽  
Asymptotically Linear ◽  
Deformation Lemma

AbstractThe aim of this paper is to present a sign-changing solution for a class of radially symmetric asymptotically linear Schrödinger equations. The proof is variational and the Ekeland variational principle is employed as well as a deformation lemma combined with Miranda’s theorem.

RELATED OPERATORS AND EXACT SOLUTIONS OF SCHRÖDINGER EQUATIONS

1998 ◽  
Vol 13 (28) ◽  
pp. 4913-4929 ◽  
Author(s):  
J. F. CARIÑENA ◽  
G. MARMO ◽  
A. M. PERELOMOV ◽  
M. F. RAÑADA
Keyword(s):  
Differential Equation ◽  
Differential Operator ◽  
Meromorphic Function ◽  
Schrödinger Equation ◽  
Exact Solutions ◽  
Riccati Equation ◽  
Physical Interpretation ◽  
Schrodinger Equation ◽  
Schrodinger Equations ◽  
Schrödinger Equations

We consider the Schrödinger equation just as a differential equation, disregarding the physical interpretation associated with solutions. By introducing the notion of A-related equations, A being a differential operator, we associate with it a Riccati equation and study the solutions when the potential is a meromorphic function.

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