A PRACTICAL GUIDE TO USES OF LANTHANIDE NMR SHIFT REAGENTS. KA Kime | 90 | 1977 |
Boundary controllability of Maxwell’s equations in a spherical region KA Kime SIAM journal on control and optimization 28 (2), 294-319, 1990 | 39 | 1990 |
Simultaneous control of a rod equation and a simple Schrödinger equation K Kime Systems & control letters 24 (4), 301-306, 1995 | 27 | 1995 |
Deuterium contents of storm inflow and hailstone growth layers CA Knight, NC Knight, KA Kime Journal of Atmospheric Sciences 38 (11), 2485-2499, 1981 | 19 | 1981 |
Control of transition probabilities of the quantum-mechanical harmonic oscillator K Kime Applied mathematics letters 6 (3), 11-15, 1993 | 15 | 1993 |
Finite difference approximation of control via the potential in a 1-D Schrodinger equation K Kime Southwest Texas State University, Department of Mathematics, 2000 | 13 | 2000 |
From two stochastic optimal control problems to the Schrodinger equation K Kime, A Blaquiere Modeling and Control of Systems: in Engineering, Quantum Mechanics …, 1989 | 13 | 1989 |
Control lie algebras of semi-discretizations of the schroedinger equation KA Kime International Design Engineering Technical Conferences and Computers and …, 2007 | 2 | 2007 |
Solving for quantum controls KA Kime ASME 2011 International Design Engineering Technical Conferences and …, 2011 | 1 | 2011 |
Numerical approximation of bilinear control of the schroedinger equation KA Kime International Design Engineering Technical Conferences and Computers and …, 2005 | 1 | 2005 |
Control of matter waves in adjacent potential wells K Kime Mathematical methods in the applied sciences 20 (4), 369-381, 1997 | 1 | 1997 |
Palindromic control and mirror symmetries in finite difference discretizations of 1-D Schrödinger equations KA Kime Discrete and Continuous Dynamical Systems-B 23 (4), 1601-1621, 2018 | | 2018 |
The hydrogen molecular ion with time-dependent magnetic field strength as control KA Kime ASME 2014 International Design Engineering Technical Conferences and …, 2014 | | 2014 |
Finite difference approximation of quantum mechanical wave packets KA Kime Advances in Analysis: Problems of Integration, 283-305, 2012 | | 2012 |
Effect of the spatial extent of the control in a bilinear control problem for the schroedinger equation KA Kime International Design Engineering Technical Conferences and Computers and …, 2009 | | 2009 |
Implementation of Numerical Approximations of Control of the Schrodinger Equation with MATLAB K Kime | | |
Control of Electronic Materials K Kime | | |
Spatial Restriction of Bilinear Control of a Schrödinger Equation KA Kime | | |