Default: Journal of Computational Physics

ISSN: 0021-9991

Journal Home

Journal Guideline

Journal of Computational Physics Q1 Unclaimed

Academic Press Inc. United States
Unfortunately this journal has not been claimed yet. For this reason, some information may be unavailable.

Journal of Computational Physics is a journal indexed in SJR in Physics and Astronomy (miscellaneous) and Computer Science Applications with an H index of 256. It has an SJR impact factor of 1,882 and it has a best quartile of Q1. It is published in English. It has an SJR impact factor of 1,882.

Journal of Computational Physics focuses its scope in these topics and keywords: method, stochastic, application, multiscale, methods, schemes, finite, point, simulation, time, ...

Type: Journal

Type of Copyright:

Languages: English

Open Access Policy:

Type of publications:

Publication frecuency: -

Scopus WOS
Categories: Applied Mathematics (Q1) Computational Mathematics (Q1) Computer Science Applications (Q1) Modeling and Simulation (Q1) Numerical Analysis (Q1) Physics and Astronomy (miscellaneous) (Q1)
Price

- €

Inmediate OA

NPD

Embargoed OA

- €

Non OA

Metrics

Journal of Computational Physics

1,882

SJR Impact factor

256

H Index

683

Total Docs (Last Year)

2041

Total Docs (3 years)

33418

Total Refs

11051

Total Cites (3 years)

2034

Citable Docs (3 years)

5,52

Cites/Doc (2 years)

48,93

Ref/Doc

Aims and Scope


method, stochastic, application, multiscale, methods, schemes, finite, point, simulation, time, polynomial, flow, chaos, model, pdeconstrained, order, adaptation, adaptive, approximation, compressible, control, diffusion, energy, fast, framework, generalized, multigrid,



Best articles by citations

A surface marker algorithm coupled to an area-preserving marker redistribution method for three-dimensional interface tracking

View more

Corrigendum to "Dynamic LES of colliding vortex rings using a 3D vortex method" [J. Comp. Phys. 152 (1999) 305-345]

View more

Evaluation of conditional Wiener integrals by numerical integration of stochastic differential equations

View more

Absorbing boundary conditions for simulation of gravitational waves with spectral methods in spherical coordinates

View more

Spectral (finite) volume method for conservation laws on unstructured grids IV: extension to two-dimensional systems

View more

First-order system least squares (FOSLS) for coupled fluid-elastic problems

View more

Adjoint sensitivity analysis for time-dependent partial differential equations with adaptive mesh refinement

View more

The finite element method with weighted basis functions for singularly perturbed convection-diffusion problems

View more

Uncertainty estimation and prediction for interdisciplinary ocean dynamics

View more

Numerical methods for minimization problems constrained to S1 and S2

View more

Analysis of methods for calculating spectral properties in solids

View more

A three-dimensional adaptive method based on the iterative grid redistribution

View more
SHOW MORE ARTICLES

Interface conditions for wave propagation through mesh refinement boundaries

View more

Introduction to Harlow's scientific memoir

View more

Finite element approximation of the radiative transport equation in a medium with piece-wise constant refractive index

View more

Multigroup half space moment approximations to the radiative heat transfer equations

View more

Computational modeling of ultrashort powerful laser pulses in a nonlinear crystal

View more

Compact High-Order Accurate Nonlinear Schemes

View more

Space-time coupled spectral/hp least-squares finite element formulation for the incompressible Navier-Stokes equations

View more

The pressure-corrected ICE finite element method for compressible flows on unstructured meshes

View more

A fast solver for the Ornstein-Zernike equations

View more

Mesh stretch effects on convection in flow simulations

View more

Well-balanced finite volume schemes for pollutant transport by shallow water equations on unstructured meshes

View more

High-resolution exponential analysis via regularized numerical inversion of Laplace transforms

View more

Comments

No comments ... Be the first to comment!

FAQS