The extended displacement discontinuity boundary integral-differential equation method is
adapted to analyze a three-dimensional interface crack of arbitrary shape in a one …

Piezoelectric quasicrystals have a broad spectrum of promising applications and research
value due to their unique atomic arrangement and multi-field coupling effects. This paper …

Quasicrystal materials have aroused extensive attentions of researchers due to their
excellent properties. In this paper, for the first time, functionally graded two-dimensional …

A plane problem is analysed for an electrically permeable crack in a bi-material composed
of two semi-infinite 1D piezoelectric quasicrystals bonded together. The polarization …

A set of finite number collinear cracks along the interface of two 1D piezoelectric hexagonal
quasicrystals is considered. The cracks can have arbitrary lengths and distances between …

Based on the nonlocal elasticity theory, the static bending deformation of one-dimensional
(1D) hexagonal piezoelectric quasicrystal (PQC) nanoplates is investigated under surface …

Quasicrystals have aroused great interest and argument among researchers due to their
unique atomic configurations. In this paper, based on the Stroh formalism and Barnett-Lothe …

The displacement discontinuity method is extended to study the fracture behavior of
interface cracks in one-dimensional hexagonal quasicrystal coating subjected to anti-plane …

The extended displacement discontinuity boundary integral equation and boundary element
method are extended to analyze a three-dimensional (3D) arbitrarily shaped interface crack …

An interface crack in 1D piezoelectric quasicrystalline space is considered. Both conducting
and mixed conducting-permeable electric conditions at the crack faces are studied. The …