26
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Ido Schaefer, Hillel Tal-Ezer and Ronnie Kosloff.
Semi-global approach for propagation of the time-dependent Schrödinger equation for time-dependent and nonlinear problems, J. Comput. Phys., volume 343, pages 368–413, 2017.
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25
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Hillel Tal-Ezer.
EvArnoldi: A New Algorithm for Large-Scale Eigenvalue Problems, The Journal of Physical Chemistry A, volume 120, number 19, pages 3366–3371, March 25, 2016.
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24
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Hillel Tal-Ezer.
Nonperiodic Trigonometric Polynomial Approximation, J. Sci. Comput., volume 60, number 2, pages 345–362, 2014.
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23
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Hillel Tal-Ezer, Ronnie Kosloff and Ido Schaefer.
New, Highly Accurate Propagator for the Linear and Nonlinear Schrödinger Equation, J. Sci. Comput., volume 53, number 1, pages 211–221, 2012.
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22
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Dan Koslo, Reynam C. Pestana and Hillel Tal-Ezer.
Acoustic and elastic numerical wave simulations by recursive spatial derivative operators, Geophysics, volume 75, pages 167–174, 2010.
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21
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Mamadou Ndong, Hillel Tal-Ezer, Ronnie Kosloff and Christiane P. Koch.
A Chebychev propagator with iterative time ordering for explicitly time-dependent Hamiltonians, J. Chem. Phys., volume 132, 2010.
arxiv
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20
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Hillel Tal-Ezer and Eli Turkel.
The Iterative Solver RISOLV with Application to the Exterior Helmholtz Problem, SIAM J. Sci. Comput., volume 32, number 1, pages 463–475, 2010.
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19
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Hillel Tal-Ezer, Ronnie Kosloff and Christiane P. Koch.
A Chebychev propagator for inhomogeneous Schrodinger equations, J. Chem. Phys., volume 130, number 12, 2009.
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18
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Yaron Lipman, Daniel Cohen-Or, David Levin and Hillel Tal-Ezer.
Parameterization-free projection for geometry reconstruction, ACM Trans. Graph., volume 26, number 3, pages 22, 2007.
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17
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Hillel Tal-Ezer.
On Restart and Error Estimation for Krylov Approximation of w=f(A)v, SIAM J. Sci. Comput., volume 29, number 6, pages 2426–2441, 2007.
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16
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Guy Ashkenazi, Ronnie Kosloff, Sanford Ruhman and Hillel Tal-Ezer.
Newtonian propagation methods applied to the photodissociation dynamics of $I_3$, J. Chem. Phys., volume 103, December 1995.
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15
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J. M. Carcione and H. Tal-Ezer.
Viscoelastic Seismic modeling, in K. Helbig (eds.), Modeling the Earth for oil exploration, pages 471–479, Pergamon, 1994.
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14
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D. Kosloff and H. Tal-Ezer.
A Modified Chebyshev Pseudospectral Method with O(N) Time Step Restriction, Journal of Comp. Phys., volume 104, number 2, pages 457–469, 1993.
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13
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M. Berman, R. Kosloff and H. Tal-Ezer.
Solution of the Time-Dependent Liouville-von Neumann Equation: Dissipative Evolution, Journal Phys. A: Math. Gen., volume 25, pages 1283–1307, 1992.
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12
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H. Tal-Ezer, R. Kosloff and C. Cerjan.
Low Order Polynomial Approximation of Propagator to the Time-Dependent Schrodinger Equation, Journal of Comp. Phys., volume 100, number 1, pages 179–187, 1992.
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11
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Hillel Tal-Ezer.
High Degree Polynomial Interpolation in Newton Form, SIAM J. Sci. Comput., volume 12, number 3, pages 648–667, 1991.
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10
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H. Tal-Ezer, J. M. Carcione and D. Kosloff.
An Accurate and Efficient Scheme for Wave Propagation in Linear Viscoelastic Media, Geophysics, volume 55, number 10, pages 1366–1379, 1990.
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9
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H. Tal-Ezer.
Polynomial Approximation of Functions of Matrices and Applications, Journal of Scientific Computing, volume 4, number 1, pages 25–60, March 1989.
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8
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H. Tal-Ezer.
Spectral Methods in Time for Parabolic Equations, SIAM J. of Num. Anal., volume 26, number 1, February 1989.
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7
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H. Tal-Ezer, D. Kosloff and Z.Koren.
An Accurate Scheme for Seismic Forward Modeling, Geophysical Prospecting, volume 35, pages 479–490, 1987.
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6
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R. Kosloff and H. Tal-Ezer.
A Direct Relaxation Method for Calculating Eigenfunctions and Eigenvalues of the Schrodinger Equation on a Grid, Chemical Physics Letters, volume 127, number 3, pages 223–230, 1986.
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5
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H. Tal-Ezer.
Spectral Methods in Time for Hyperbolic Equations, SIAM J. of Num. Anal., volume 23, number 1, pages 11–26, 1986.
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4
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H. Tal-Ezer.
A Pseudospectral Legendre Method for Hyperbolic Equations with an Improved Stability Condition, J. of Comp. Phys., volume 7, number 1, November 1986.
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3
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H. Tal-Ezer and R. Kosloff.
An Accurate New and Highly Efficient Scheme for Propagating the Time-Dependent Schrodinger Equation, J. Of Chem. Phys., pages 3967–3971, 1984.
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2
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A. Harten and H. Tal-Ezer.
On a Fourth Order Accurate Implicit Finite Difference Scheme for Hyperbolic Conservation Laws: II. Five-Point Schemes, J. of Comp. Phys., volume 41, number 2, pages 329–356, 1981.
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1
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A. Harten and H. Tal-Ezer.
On a Fourth Order Accurate Implicit Finite Difference Scheme for Hyperbolic Conservation laws: I. Nonstiff Strongly Dynamic Problems, Math. of Comp., volume 36, number 54, pages 353–373, 1981.
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