Add to ORKGpeer reviewedThe extent of application of meshfree methods based on point collocation (PC) techniques with adaptive support domain for strong form Partial Differential Equations (PDE) is investigated. The basis functions are constructed using the Moving Least Square (MLS) approximation. The weak-form description of PDEs is used in most MLS methods to circumvent problems related to the increased level of resolution necessary near natural (Neumann) boundary conditions (BCs), dislocations, or regions of steep gradients. Alternatively, one can adopt Radial Basis Function (RBF) approximation on the strong-form of PDEs using meshless PC methods, due to the delta function behavior (exact solution on nodes). The present approach is one of the few s...
In this talk, I present a robust moving mesh finite difference method for the simulation of fourth o...
AbstractThis paper presents a truly meshfree method referred to as radial point interpolation colloc...
In this dissertation, we formulate and implement p- adaptive and hp-adaptive finite element methods ...
The extent of application of meshfree methods based on point collocation (PC) techniques with adapti...
Mesh free methods can be largely categorized into two main categories: mesh free methods based on st...
There are many types of adaptive methods that have been developed with different algorithm schemes a...
Conventional mesh-based methods for solid mechanics problems suffer from issues resulting from the u...
AbstractMany phenomena in the applied and natural sciences occur on surfaces. To solve accurately th...
This dissertation focuses on meshfree methods for solving surface partial differential equations (PD...
Meshless methods have long been a topic of interest in computational modelling in solid mechanics an...
Meshless methods are relatively new numerical methods which have gained popularity in computational ...
In this thesis our primary interest is in developing adaptive solution methods for parabolic and ell...
4noWe investigate adaptivity issues for the approximation of Poisson equations via radial basis fun...
Meshless Local Petrov Galerkin (MLPG) methods are pure meshless techniques for solving Partial Diffe...
The truly meshless local Petrov-Galerkin (MLPG) method holds a great promise in solving boundary val...
In this talk, I present a robust moving mesh finite difference method for the simulation of fourth o...
AbstractThis paper presents a truly meshfree method referred to as radial point interpolation colloc...
In this dissertation, we formulate and implement p- adaptive and hp-adaptive finite element methods ...
The extent of application of meshfree methods based on point collocation (PC) techniques with adapti...
Mesh free methods can be largely categorized into two main categories: mesh free methods based on st...
There are many types of adaptive methods that have been developed with different algorithm schemes a...
Conventional mesh-based methods for solid mechanics problems suffer from issues resulting from the u...
AbstractMany phenomena in the applied and natural sciences occur on surfaces. To solve accurately th...
This dissertation focuses on meshfree methods for solving surface partial differential equations (PD...
Meshless methods have long been a topic of interest in computational modelling in solid mechanics an...
Meshless methods are relatively new numerical methods which have gained popularity in computational ...
In this thesis our primary interest is in developing adaptive solution methods for parabolic and ell...
4noWe investigate adaptivity issues for the approximation of Poisson equations via radial basis fun...
Meshless Local Petrov Galerkin (MLPG) methods are pure meshless techniques for solving Partial Diffe...
The truly meshless local Petrov-Galerkin (MLPG) method holds a great promise in solving boundary val...
In this talk, I present a robust moving mesh finite difference method for the simulation of fourth o...
AbstractThis paper presents a truly meshfree method referred to as radial point interpolation colloc...
In this dissertation, we formulate and implement p- adaptive and hp-adaptive finite element methods ...