Applications of tensor functions to the formulation of yield criteria for anisotropic materials

The concept of an anisotropic vector space with a tensor basis which is invariant under a symmetry transformations of a threedimensional Euclidean vector space is introduced using the example of symmetric second-and fourth-rank Euclidean tensors. In addition to the traditional operation of summation

In this paper some results of the tensor function theory are applied to the formulation of constitutive equations of isotropic and anisotropic materials in the secondary and tertiary creep stage. The creep process, in its tertiary phase, is characterized by a damage tensor. Because of its microscopi

A yield criterion for elastic pure-plastic polycrystalline materials is generated under simplified conditions by assuming that for yielding a certain fraction Qe of the total number of slip planes in the material has to be active. This fraction Qe is called the critical active quantity. We suppose Q

The three Barnett-Lothe tensors S, H, and L appear frequently in the real form solutions of two-dimensional anisotropic elasticity problems. Explicit expressions for the components of these tensors are presented for general anisotropic materials. The special cases of monoclinic materials with the pl

A concise formulation is presented for the derivatives of Green's functions of three-dimensional generally anisotropic elastic materials. Direct calculation for derivatives of the Green's function on the Cartesian coordinate system is a common practice, which, however, usually leads to a complicated