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The following pages link to A phenomenological constitutive theory for polycrystalline ferroelectric ceramics based on orientation distribution functions (Q2190098):

Displaying 17 items.

Inhomogeneity and material configurational forces in three-dimensional ferroelectric polycrystals (Q388405) (← links)
A phenomenological multi-axial constitutive law for switching in polycrystalline ferroelectric ceramics (Q532838) (← links)
Dispersion of the permittivity of a uniaxial ferroelectric solid solution in the morphotropic region (Q663840) (← links)
Micromechanical model of a polycrystalline ferroelectrelastic material with consideration of defects (Q826506) (← links)
A continuum theory of deformable, semiconducting ferroelectrics (Q934907) (← links)
Phenomenological model for the macroscopical material behavior of ferroelectric ceramics (Q1027088) (← links)
Effective electroelastic properties of polycrystalline ferroelectric ceramics predicted by a statistical model (Q1973741) (← links)
An evaluation of a class of phenomenological theories of ferroelectricity in polycrystalline ceramics (Q2324422) (← links)
Normally distributed free energy model and creep behavior of ferroelectric polycrystals at room and high temperatures (Q2392459) (← links)
Simulation of hysteresis loops for polycrystalline ferroelectrics by an extensive Landau-type model (Q2429312) (← links)
A phenomenological constitutive model for ferroelastic and ferroelectric hysteresis effects in ferroelectric ceramics (Q2456305) (← links)
Simulation of polycrystalline ferroelectrics based on discrete orientation distribution functions (Q3176846) (← links)
A polycrystal hysteresis model for ferroelectric ceramics (Q3503328) (← links)
Fully coupled, multi-axial, symmetric constitutive laws for polycrystalline ferroelectric ceramics (Q5958031) (← links)
Scale transition and residual fields in modeling of polycrystalline ferroelectrics based on the internal energy potential and a Voigt-Reuss approximation (Q6141108) (← links)
FEM-CM as a hybrid approach for multiscale modeling and simulation of ferroelectric boundary value problems (Q6145125) (← links)
Effect of compressive stress on piezoelectric coefficients: a multiscale modeling approach (Q6658536) (← links)