Mathematics and Mechanics of Solids

Papers
(The H4-Index of Mathematics and Mechanics of Solids is 16. 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
On the representation of fourth- and higher-order anisotropic elasticity tensors in generalized continuum models41
Addendum to “A formulation of volumetric growth as a mechanical problem subjected to non-holonomic and rheonomic constraint”34
The mathematics and mechanics of tug of war29
Basic errors in couple-stress hyperelasticity articles29
Sliding frictional contact problem of a layer indented by a rigid punch in couple stress elasticity28
Exponential stability for a porous thermoelastic system of type II27
A theory of coupled strain-gradient plasticity with species transport at small deformations26
Green’s functions of steady-state transversely isotropic hygro-thermo-magneto-piezoelectric cones22
Damped Normal Compliance (DNC) and the restitution coefficient22
Effects of intracorneal ring segments on the biomechanical response of the ectatic cornea to air-puff: A patient-specific numerical analysis21
On governing equations for a nanoplate derived from the 3D gradient theory of elasticity20
Remarks on bifurcation of an inflated and extended swellable isotropic tube20
On the Rayleigh wave velocity in n -type piezoelectric semiconductors with enhanced flexoelectricity18
The effect of pore shape on the Poisson ratio of porous materials18
Retraction Notice: Thermal mechanical coupling analysis of two-dimensional decagonal quasicrystals with elastic elliptical inclusion17
Mechanical attributes of fractal dragons17
Buckling of a column made of the functionally graded material with high-order polynomial mode shape16
Model anisotropic materials with ellipsoidal wave surfaces and their application to determination of elastic constants by acoustical methods16
Nonlocal vibration of functionally graded nanoplates using a layerwise theory16
A general theory for anisotropic Kirchhoff–Love shells with in-plane bending of embedded fibers16
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