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
On rational Krylov and reduced basis methods for fractional diffusion5
An all Mach number finite volume method for isentropic two-phase flow5
Error analysis for a vorticity/Bernoulli pressure formulation for the Oseen equations4
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
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
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