Add to ORKGTwo advances in the numerical techniques of utilizing the BIE method are presented. The boundary unknowns are represented by parabolas over each interval which are integrated in closed form. These integrals are listed for easy use. For problems involving crack tip singularities, these singularities are included in the boundary integrals so that the stress intensity factor becomes just one more unknown in the set of boundary unknowns thus avoiding the uncertainties of plotting and extrapolating techniques. The method is applied to the problems of a notched beam in tension and bending, with excellent results
A two dimensional numerical study employing the multi-domain boundary element method with quarter-no...
A boundary element alternating method, denoted herein as BEAM, is presented for two dimensional frac...
The study of bi-material notches becomes a topical problem as they can model efficiently geometrical...
AbstractA strain energy approach (SEA) is developed to compute the general stress intensity factors ...
A semidirect boundary integral method, using Airy's stress function and its derivatives in Green's b...
The local smoothing scheme in conjunction with the modified crack closure integral technique has bee...
The boundary integral equation method was applied in the solution of the plane elastoplastic problem...
The boundary integral equation method was applied in the solution of the plane elastoplastic problem...
The Boundary Force Method (BFM) was formulated for the two-dimensional stress analysis of complex cr...
This paper presents the boundary integral equation method (BIEM) for the stress intensity factors an...
Stress-intensity factors for single-edge cracks in plate specimens subject to splitting force by bou...
Various analytical and numerical methods used to evaluate the stress intensity factors for cracks in...
We introduce an alternative method in computational fracture mechanics to evaluate Stress Intensity ...
Because of violently oscillating nature of stress and displacement fields near the crack tip, it is ...
The boundary integral equations (BIE) and displacement discontinuity methods (DDM) are formulated fo...
A two dimensional numerical study employing the multi-domain boundary element method with quarter-no...
A boundary element alternating method, denoted herein as BEAM, is presented for two dimensional frac...
The study of bi-material notches becomes a topical problem as they can model efficiently geometrical...
AbstractA strain energy approach (SEA) is developed to compute the general stress intensity factors ...
A semidirect boundary integral method, using Airy's stress function and its derivatives in Green's b...
The local smoothing scheme in conjunction with the modified crack closure integral technique has bee...
The boundary integral equation method was applied in the solution of the plane elastoplastic problem...
The boundary integral equation method was applied in the solution of the plane elastoplastic problem...
The Boundary Force Method (BFM) was formulated for the two-dimensional stress analysis of complex cr...
This paper presents the boundary integral equation method (BIEM) for the stress intensity factors an...
Stress-intensity factors for single-edge cracks in plate specimens subject to splitting force by bou...
Various analytical and numerical methods used to evaluate the stress intensity factors for cracks in...
We introduce an alternative method in computational fracture mechanics to evaluate Stress Intensity ...
Because of violently oscillating nature of stress and displacement fields near the crack tip, it is ...
The boundary integral equations (BIE) and displacement discontinuity methods (DDM) are formulated fo...
A two dimensional numerical study employing the multi-domain boundary element method with quarter-no...
A boundary element alternating method, denoted herein as BEAM, is presented for two dimensional frac...
The study of bi-material notches becomes a topical problem as they can model efficiently geometrical...