Journal of Scientific Computing
Overview
The Journal of Scientific Computing is a peer-reviewed publication dedicated to advancing the field of computational science and engineering. It covers a wide range of topics including numerical algorithms, mathematical modeling, high-performance computing, and software development. The journal provides a platform for researchers and practitioners to share their innovative approaches and applications in scientific computing, fostering collaboration and knowledge exchange in this rapidly evolving field.
Details
Details
Abbr.
J Sci Comput
Start
1986
End
Continuing
Frequency
Quarterly, 1987-
p-ISSN
0885-7474
e-ISSN
1573-7691
Country
United States
Language
English
Metrics
Metrics
h-index / Ranks: 3550
92
SJR / Ranks: 2663
1248
CiteScore / Ranks: 6529
4.10
JIF / Ranks: 4316
2.5
Recent Articles
1.
Fumagalli I, Parolini N, Verani M
J Sci Comput
. 2025 Mar;
103(1):22.
PMID: 40065827
The computational effort entailed in the discretization of fluid-poromechanics systems is typically highly demanding. This is particularly true for models of multiphysics flows in the brain, due to the geometrical...
2.
Hao W, Hong Q, Jin X
J Sci Comput
. 2024 Dec;
100(1).
PMID: 39726935
The numerical solution of differential equations using machine learning-based approaches has gained significant popularity. Neural network-based discretization has emerged as a powerful tool for solving differential equations by parameterizing a...
3.
Nonino M, Torlo D
J Sci Comput
. 2024 Oct;
101(3):60.
PMID: 39463488
We propose a novel Model Order Reduction framework that is able to handle solutions of hyperbolic problems characterized by multiple travelling discontinuities. By means of an optimization based approach, we...
4.
Altmann R, Peterseim D, Stykel T
J Sci Comput
. 2024 Sep;
101(1):6.
PMID: 39309294
This paper is devoted to the numerical solution of constrained energy minimization problems arising in computational physics and chemistry such as the Gross-Pitaevskii and Kohn-Sham models. In particular, we introduce...
5.
Dolejsi V, Shin H, Vlasak M
J Sci Comput
. 2024 Sep;
101(1):11.
PMID: 39309293
We present a higher-order space-time adaptive method for the numerical solution of the Richards equation that describes a flow motion through variably saturated media. The discretization is based on the...
6.
Sutti M, Vandereycken B
J Sci Comput
. 2024 Aug;
101(1):3.
PMID: 39148670
We propose two implicit numerical schemes for the low-rank time integration of stiff nonlinear partial differential equations. Our approach uses the preconditioned Riemannian trust-region method of Absil, Baker, and Gallivan,...
7.
Lederer P, Merdon C
J Sci Comput
. 2024 Jul;
100(2):54.
PMID: 38974937
This paper studies two hybrid discontinuous Galerkin (HDG) discretizations for the velocity-density formulation of the compressible Stokes equations with respect to several desired structural properties, namely provable convergence, the preservation...
8.
Houston P, Hubbard M, Radley T, Sutton O, Widdowson R
J Sci Comput
. 2024 Jul;
100(2):52.
PMID: 38966341
We introduce an -version discontinuous Galerkin finite element method (DGFEM) for the linear Boltzmann transport problem. A key feature of this new method is that, while offering arbitrary order convergence...
9.
Duh U, Shankar V, Kosec G
J Sci Comput
. 2024 Jul;
100(2):51.
PMID: 38966340
We present an algorithm for fast generation of quasi-uniform and variable-spacing nodes on domains whose boundaries are represented as computer-aided design (CAD) models, more specifically non-uniform rational B-splines (NURBS). This...
10.
Chen X, Tran A, Elkin R, Benveniste H, Tannenbaum A
J Sci Comput
. 2024 Jun;
97(2).
PMID: 38938875
The regularized optimal mass transport (rOMT) problem adds a diffusion term to the continuity equation in the original dynamic formulation of the optimal mass transport (OMT) problem proposed by Benamou...