Add to ORKGPresents a unified treatment of the inhomogeneity theory using some of the tools of modern differential geometry. This book deals with the geometrical description of uniform bodies and their homogeneity conditions. It also develops a theory of material evolution and discusses its relevance in various applied contexts
While usually we don't know complete geometrical and physical information on the occurred inhomogene...
Within the narrowly defined context of a strictly continuum-mechanical formulation, a body is a diff...
summary:We present a general geometrical theory of uniform bodies which includes three-dimensional C...
The evolution of a distribution of material inhomogeneities is investigated by analyzing the evoluti...
The theory of continuous distributions of inhomogeneities is shown to be applicable beyond its origi...
This book presents the fundamental concepts of modern differential geometry within the framework of ...
The evolution of a distribution of material inhomogeneities is investigated by analyzing the evoluti...
This paper deals with one of the fundamental problems of the mathematical theory of inhemogeneities ...
The theory of material inhomogeneities, according to Noll's approach, is revisited in detail and its...
The evolution of a distribution of material inhomogeneities (defects, dislo-cations, etc.) is invest...
The mathematical theory of inhomogeneities in simple elastic materials is reformulated in terms of G...
The concept of material distribution is introduced as describing the geometric material structure of...
Working within the framework of a mathematical theory of continuous distribution of inhomogeneities ...
A Lie groupoid, called material Lie groupoid, is associated in a natural way to any elastic material...
The notion of the stress space, introduced by Schaefer, and further developed by Kröner in the conte...
While usually we don't know complete geometrical and physical information on the occurred inhomogene...
Within the narrowly defined context of a strictly continuum-mechanical formulation, a body is a diff...
summary:We present a general geometrical theory of uniform bodies which includes three-dimensional C...
The evolution of a distribution of material inhomogeneities is investigated by analyzing the evoluti...
The theory of continuous distributions of inhomogeneities is shown to be applicable beyond its origi...
This book presents the fundamental concepts of modern differential geometry within the framework of ...
The evolution of a distribution of material inhomogeneities is investigated by analyzing the evoluti...
This paper deals with one of the fundamental problems of the mathematical theory of inhemogeneities ...
The theory of material inhomogeneities, according to Noll's approach, is revisited in detail and its...
The evolution of a distribution of material inhomogeneities (defects, dislo-cations, etc.) is invest...
The mathematical theory of inhomogeneities in simple elastic materials is reformulated in terms of G...
The concept of material distribution is introduced as describing the geometric material structure of...
Working within the framework of a mathematical theory of continuous distribution of inhomogeneities ...
A Lie groupoid, called material Lie groupoid, is associated in a natural way to any elastic material...
The notion of the stress space, introduced by Schaefer, and further developed by Kröner in the conte...
While usually we don't know complete geometrical and physical information on the occurred inhomogene...
Within the narrowly defined context of a strictly continuum-mechanical formulation, a body is a diff...
summary:We present a general geometrical theory of uniform bodies which includes three-dimensional C...