Add to ORKGIn this dissertation the author solves a series of mixed boundary value problems arising from crack problems in elasticity and thermoelasticity. Using integral transform techniques and separation of variables appropriately, it is shown that the solutions can be found by solving a corresponding set of triple or dual integral equations in some instances, while in others the solutions of triple or dual series relations are required. These in turn reduce to various singular integral equations which are solved in closed form, in two cases, or by numerical methods. The stress intensity factors at the crack tips, the physical parameters of interest, are found and the results are recorded in both tabular and graphical form
In this work an attempt has been made to derive a full finite element and boundary element theory f...
A general method based on the singular integral equations is developed to computationally dete...
summary:The presented method of integration of differential equations in elastostatics - the so-call...
In this dissertation the author solves a series of mixed boundary value problems arising from crack ...
The boundary value problems which are considered are the type that arise due to the presence of a Gr...
After the extensive research on the capabilities of the Boundary Integral Equation Method produced ...
The problems tackled in this thesis fall into two main sections. Part I deals with and develops a me...
AbstractUsing a well-known solution for steady temperature distribution in a rectangle, a boundary i...
This thesis presents an advanced quadratic formulation of the boundary element (BE) method for two-d...
We propose a dual approach in fracture mechanics based on complementary energy. The analysis of the ...
A general formulation by dual boundary integral equations and a computational solution algorithm for...
AbstractA formulation of the plane strain problem of the theory of elasticity in stresses, for simpl...
The purpose of the dissertation is to study the properties of solutions to Cauchy problems for a num...
The method of integral transforms can provide the solution of a differential equation satisfying pre...
The problem solved in this dissertation is that of finding the stresses in an isotropic, linear, the...
In this work an attempt has been made to derive a full finite element and boundary element theory f...
A general method based on the singular integral equations is developed to computationally dete...
summary:The presented method of integration of differential equations in elastostatics - the so-call...
In this dissertation the author solves a series of mixed boundary value problems arising from crack ...
The boundary value problems which are considered are the type that arise due to the presence of a Gr...
After the extensive research on the capabilities of the Boundary Integral Equation Method produced ...
The problems tackled in this thesis fall into two main sections. Part I deals with and develops a me...
AbstractUsing a well-known solution for steady temperature distribution in a rectangle, a boundary i...
This thesis presents an advanced quadratic formulation of the boundary element (BE) method for two-d...
We propose a dual approach in fracture mechanics based on complementary energy. The analysis of the ...
A general formulation by dual boundary integral equations and a computational solution algorithm for...
AbstractA formulation of the plane strain problem of the theory of elasticity in stresses, for simpl...
The purpose of the dissertation is to study the properties of solutions to Cauchy problems for a num...
The method of integral transforms can provide the solution of a differential equation satisfying pre...
The problem solved in this dissertation is that of finding the stresses in an isotropic, linear, the...
In this work an attempt has been made to derive a full finite element and boundary element theory f...
A general method based on the singular integral equations is developed to computationally dete...
summary:The presented method of integration of differential equations in elastostatics - the so-call...