Journal of Numerical Mathematics

Papers
(The TQCC of Journal of Numerical Mathematics is 3. The table below lists those papers that are above that threshold based on CrossRef citation counts [max. 250 papers]. The publications cover those that have been published in the past four years, i.e., from 2021-06-01 to 2025-06-01.)
ArticleCitations
Transformed primal–dual methods for nonlinear saddle point systems107
Frontmatter99
A posteriori error estimates for hierarchical mixed-dimensional elliptic equations62
Frontmatter15
Effective highly accurate time integrators for linear Klein–Gordon equations across the scales15
Optimal evaluation of symmetry-adapted n-correlations via recursive contraction of sparse symmetric tensors13
Error analysis of virtual element method for the Poisson–Boltzmann equation12
A posteriori error estimate for a WG method of H(curl)-elliptic problems11
Adaptive space–time finite element methods for parabolic optimal control problems11
Analysis and computation of a weak Galerkin scheme for solving the 2D/3D stationary Stokes interface problems with high-order elements10
Error analysis for a Crouzeix–Raviart approximation of the p-Dirichlet problem8
Acceleration of nonlinear solvers for natural convection problems8
Frontmatter7
Relative error analysis of matrix exponential approximations for numerical integration7
Mixed-hybrid and mixed-discontinuous Galerkin methods for linear dynamical elastic–viscoelastic composite structures6
A posteriori error analysis of Banach spaces-based fully-mixed finite element methods for Boussinesq-type models6
An all Mach number finite volume method for isentropic two-phase flow5
On rational Krylov and reduced basis methods for fractional diffusion5
Stability and convergence of relaxed scalar auxiliary variable schemes for Cahn–Hilliard systems with bounded mass source4
Diagonally implicit Runge–Kutta schemes: Discrete energy-balance laws and compactness properties4
Error analysis for a vorticity/Bernoulli pressure formulation for the Oseen equations4
Numerical analysis for a Cahn–Hilliard system modelling tumour growth with chemotaxis and active transport3
Obtaining higher-order Galerkin accuracy when the boundary is polygonally approximated3
Loosely coupled, non-iterative time-splitting scheme based on Robin–Robin coupling: Unified analysis for parabolic/parabolic and parabolic/hyperbolic problems3
0.029913902282715