We propose a numerical method that combines the finite difference (FD) and strong form (collocation) meshless method (MM) for solving linear elasticity equations. We call this new method FDMCM. The FDMCM scheme uses a uniform Cartesian grid embedded in complex geometries and applies both methods to calculate spatial derivatives. The spatial domain is represented by a set of nodes categorized as (i) boundary and near boundary nodes, and (ii) interior nodes. For boundary and near boundary nodes, where the finite difference stencil cannot be defined, the Discretization Corrected Particle Strength Exchange (DC PSE) scheme is used for derivative evaluation, while for interior nodes standard second order finite differences are used. FDMCM method ...
AbstractMany fluid-dynamics applications require solutions in complex geometries. In these cases, me...
The present study is related to the utilization of the mixed Meshless Local PetrovGalerkin (MLPG) me...
AbstractA meshfree collocation method with intrinsic enrichment for solving elastic crack problems i...
Traditional finite element methods (FEM) and boundary element methods (BEM) have been based on weak-...
Meshless methods (MMs) were introduced in the late 1970s to solve problems in astrophysics. In MMs t...
Mesh free methods can be largely categorized into two main categories: mesh free methods based on st...
For solving a partial different equation by a numerical method, a possible alternative may be either...
A boundary-type meshless method named dual reciprocity hybrid boundary node method (DRHBNM) is prese...
Strong-form meshless methods received much attention in recent years and are being extensively resea...
Many practical applications in civil, mechanical and aerospace engineering are difficult to perform ...
When it comes to numerical methods a huge amount of methodologies and techniques comes out. Since se...
In the present work, as an improvement of the previous proposed methods, the author studies an h and...
Strong-form meshless methods received much attention in recent years and are being extensively resea...
AbstractThe finite difference element method (FDEM) is a black-box solver for the solution of nonlin...
In meshfree methods, partial differential equations are solved on an unstructured cloud of points di...
AbstractMany fluid-dynamics applications require solutions in complex geometries. In these cases, me...
The present study is related to the utilization of the mixed Meshless Local PetrovGalerkin (MLPG) me...
AbstractA meshfree collocation method with intrinsic enrichment for solving elastic crack problems i...
Traditional finite element methods (FEM) and boundary element methods (BEM) have been based on weak-...
Meshless methods (MMs) were introduced in the late 1970s to solve problems in astrophysics. In MMs t...
Mesh free methods can be largely categorized into two main categories: mesh free methods based on st...
For solving a partial different equation by a numerical method, a possible alternative may be either...
A boundary-type meshless method named dual reciprocity hybrid boundary node method (DRHBNM) is prese...
Strong-form meshless methods received much attention in recent years and are being extensively resea...
Many practical applications in civil, mechanical and aerospace engineering are difficult to perform ...
When it comes to numerical methods a huge amount of methodologies and techniques comes out. Since se...
In the present work, as an improvement of the previous proposed methods, the author studies an h and...
Strong-form meshless methods received much attention in recent years and are being extensively resea...
AbstractThe finite difference element method (FDEM) is a black-box solver for the solution of nonlin...
In meshfree methods, partial differential equations are solved on an unstructured cloud of points di...
AbstractMany fluid-dynamics applications require solutions in complex geometries. In these cases, me...
The present study is related to the utilization of the mixed Meshless Local PetrovGalerkin (MLPG) me...
AbstractA meshfree collocation method with intrinsic enrichment for solving elastic crack problems i...