AbstractMindlin’s (1965) second strain gradient theory due to its competency in capturing the effects of edges, corners, and surfaces is of particular interest. Formulation in this framework, in addition to the usual Lamé constants, requires the knowledge of sixteen additional materials constants. To date, there are no successful experimental techniques for measuring these material parameters which reflect the discrete nature of matter. The present work gives an accurate remedy for the atomistic calculations of these parameters by utilizing the first principles density functional theory (DFT) for the calculations of the atomic force constants combined with an analytical formulation. It will be shown that writing the consistency conditions o...
AbstractA physically motivated and thermodynamically consistent formulation of small strain higher-o...
In the present paper, a two-dimensional solid consisting of a linear elastic isotropic material, for...
Recently, people are confused with two opposite variations of elastic modulus with decreasing size o...
AbstractMindlin’s (1965) second strain gradient theory due to its competency in capturing the effect...
Surface/interface stresses, when notable, are closely associated with a surface/interface layer in w...
The fundamental equations for Form II of Mindlin's second strain gradient elasticity theory for isot...
International audienceMindlin's second strain gradient continuum theory for isotropic linear elastic...
Recent investigations into surface-energy density of nanomaterials lead to a ripe chance to propose,...
Recent investigations into surface-energy density of nanomaterials lead to a ripe chance to propose,...
Abstract-The strain energy of a deformed material with spatial interaction can be written either in ...
Strain-gradient elasticity is widely used as a suitable alternative to size-independent classical co...
The measurement of the lattice-parameter of silicon by x-ray interferometry assumes the use of strai...
The universal binding energy relation (UBER), derived earlier to describe the cohesion between two r...
Capture of the discrete nature of crystalline solids for the purpose of the determination of their m...
Elastic properties of crystal surfaces are useful in understanding mechanical properties of nanostru...
AbstractA physically motivated and thermodynamically consistent formulation of small strain higher-o...
In the present paper, a two-dimensional solid consisting of a linear elastic isotropic material, for...
Recently, people are confused with two opposite variations of elastic modulus with decreasing size o...
AbstractMindlin’s (1965) second strain gradient theory due to its competency in capturing the effect...
Surface/interface stresses, when notable, are closely associated with a surface/interface layer in w...
The fundamental equations for Form II of Mindlin's second strain gradient elasticity theory for isot...
International audienceMindlin's second strain gradient continuum theory for isotropic linear elastic...
Recent investigations into surface-energy density of nanomaterials lead to a ripe chance to propose,...
Recent investigations into surface-energy density of nanomaterials lead to a ripe chance to propose,...
Abstract-The strain energy of a deformed material with spatial interaction can be written either in ...
Strain-gradient elasticity is widely used as a suitable alternative to size-independent classical co...
The measurement of the lattice-parameter of silicon by x-ray interferometry assumes the use of strai...
The universal binding energy relation (UBER), derived earlier to describe the cohesion between two r...
Capture of the discrete nature of crystalline solids for the purpose of the determination of their m...
Elastic properties of crystal surfaces are useful in understanding mechanical properties of nanostru...
AbstractA physically motivated and thermodynamically consistent formulation of small strain higher-o...
In the present paper, a two-dimensional solid consisting of a linear elastic isotropic material, for...
Recently, people are confused with two opposite variations of elastic modulus with decreasing size o...