Journal of Mathematical Physics

Papers
(The H4-Index of Journal of Mathematical Physics is 19. 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 2022-06-01 to 2026-06-01.)
ArticleCitations
Long-time dynamics of the wave equation with nonlocal weak damping and super-cubic nonlinearity in three-dimensional domains60
Linear criterion for an upper bound on the Bardeen-Cooper-Schrieffer critical temperature32
Strongly global topological equivalence on time scales31
Two types of Witten zeta functions30
Mutual averaged non-commutativity of quantum operator algebras26
Self-intersection local time derivative for systems of non-linear stochastic heat equations26
Semiclassical perturbations of single-degree–of–freedom Hamiltonian systems I: Separatrix splitting24
Computational explorations of a deformed fuzzy sphere23
A constrained variational problem for an existence theorem of steady vortex rings in Poiseuille flow23
Minimal wave speed for a two-group epidemic model with nonlocal dispersal and spatial-temporal delay23
Edge currents for the time-fractional, half-plane, Schrödinger equation with constant magnetic field23
Local spectral optimisation for Robin problems with negative boundary parameter on quadrilaterals23
Degenerate response tori in Hamiltonian systems with higher zero-average perturbation21
Pointwise modulus of continuity of the Lyapunov exponent and integrated density of states for analytic multi-frequency quasi-periodic M(2,C) cocycles21
Structure and representations of the coset vertex operator algebra C(Losp(1|2)̂(2,0),Losp(1|2)̂(1,0)⊗2)21
Inverse localization and global approximation for some Schrödinger operators on hyperbolic spaces20
Conformal r-matrix-Nijenhuis structures, symplectic-Nijenhuis structures, and ON-structures20
Various variational approximations of quantum dynamics20
Hebbian learning from first principles20
Hermitian Kirkwood–Dirac-real operators for discrete Fourier transformations19
A new class of approximate analytical solutions of the Pridmore-Brown equation19
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