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Ronald M. Caplan

Orcid: 0000-0002-2633-4290

According to our database1, Ronald M. Caplan authored at least 14 papers between 2011 and 2024.

Collaborative distances:
  • Dijkstra number2 of four.
  • Erdős number3 of four.

Timeline

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Links

On csauthors.net:

Bibliography

2024
Advancing parabolic operators in thermodynamic MHD models II: Evaluating a Practical Time Step Limit for Unconditionally Stable Methods.
[BibTeX]
[DOI]
Ronald M. Caplan
,
Craig D. Johnston
,
Lars K. S. Daldoff
,
Jon A. Linker
CoRR, 2024

Portability of Fortran's 'do concurrent' on GPUs.
[BibTeX]
[DOI]
Ronald M. Caplan
,
Miko M. Stulajter
,
Jon A. Linker
,
Jeff Larkin
,
Henry A. Gabb
,
Shiquan Su
,
Ivan Rodriguez
,
Zachary S. Tschirhart
,
Nicholas Malaya
Proceedings of the SC24-W: Workshops of the International Conference for High Performance Computing, 2024

2023
Acceleration of a production Solar MHD code with Fortran standard parallelism: From OpenACC to 'do concurrent'.
[BibTeX]
[DOI]
Ronald M. Caplan
,
Miko M. Stulajter
,
Jon A. Linker
Proceedings of the IEEE International Parallel and Distributed Processing Symposium, 2023

2021
Can Fortran's 'do concurrent' Replace Directives for Accelerated Computing?
[BibTeX]
[DOI]
Miko M. Stulajter
,
Ronald M. Caplan
,
Jon A. Linker
Proceedings of the Accelerator Programming Using Directives - 8th International Workshop, 2021

2018
GPU Acceleration of an Established Solar MHD Code using OpenACC.
[BibTeX]
[DOI]
Ronald M. Caplan
,
Jon A. Linker
,
Zoran Mikic
,
C. Downs
,
T. Török
,
V. S. Titov
CoRR, 2018

2017
From MPI to MPI+OpenACC: Conversion of a legacy FORTRAN PCG solver for the spherical Laplace equation.
[BibTeX]
[DOI]
Ronald M. Caplan
,
Zoran Mikic
,
Jon A. Linker
CoRR, 2017

2016
Advancing parabolic operators in thermodynamic MHD models: Explicit super time-stepping versus implicit schemes with Krylov solvers.
[BibTeX]
[DOI]
Ronald M. Caplan
,
Zoran Mikic
,
Jon A. Linker
,
Roberto Lionello
CoRR, 2016

2014
A Modulus-Squared Dirichlet Boundary Condition for Time-Dependent Complex Partial Differential Equations and Its Application to the Nonlinear Schrödinger Equation.
[BibTeX]
[DOI]
Ronald M. Caplan
,
Ricardo Carretero-González
SIAM J. Sci. Comput., 2014

2013
A two-step high-order compact scheme for the Laplacian operator and its implementation in an explicit method for integrating the nonlinear Schrödinger equation.
[BibTeX]
[DOI]
Ronald M. Caplan
,
Ricardo Carretero-González
J. Comput. Appl. Math., 2013

NLSEmagic: Nonlinear Schrödinger equation multi-dimensional Matlab-based GPU-accelerated integrators using compact high-order schemes.
[BibTeX]
[DOI]
Ronald M. Caplan
Comput. Phys. Commun., 2013

2012
Existence, stability, and scattering of bright vortices in the cubic-quintic nonlinear Schrödinger equation.
[BibTeX]
[DOI]
Ronald M. Caplan
,
Ricardo Carretero-González
,
Panayotis G. Kevrekidis
,
Boris A. Malomed
Math. Comput. Simul., 2012

NLSEmagic: Nonlinear Schrödinger
[BibTeX]
[DOI]
Ronald M. Caplan
CoRR, 2012

2011
A Modulus-Squared Dirichlet Boundary Condition for Time-Dependent Complex Partial Differential Equations and its Application to the Nonlinear Schödinger Equation.
[BibTeX]
[DOI]
Ronald M. Caplan
,
Ricardo Carretero-González
CoRR, 2011

Numerical Stability of Explicit Runge-Kutta Finite Difference Schemes for the Nonlinear Schrödinger Equation
[BibTeX]
[DOI]
Ronald M. Caplan
,
Ricardo Carretero-González
CoRR, 2011


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