Application of peridynamics to granular media
Seamless multiphysics coupling with peridynamics enabled by nodal finite element approximation
Phase Field Models of the Growth of Tumors Embedded in an Evolving Vascular Network: Dynamic 1D-3D Models of Angiogenesis
Analysis and application of peridynamics to fracture in solids and granular media
This talk focuses on application of continuum mixture theory and phase-field methods in representing the growth of tumor in tissues.
Numerical fracture experiments using nonlinear nonlocal models
Convergence results for finite element and finite difference approximation of nonlocal fracture
Overview of peridynamics theory of fracture and some results on robustness of finite difference and finite element discretizations
Convergence results for finite element and finite difference approximation of nonlocal fracture models
This work introduces damage at a bond level in peridynamics
Presented my postodoctoral work on numerical methods for peridynamics and some convergence estimates
Presented my ongoing work on numerical methods for peridynamics and some convergence estimates
Numerical Analysis of Nonlocal Fracture Models
Presenting PhD work on coarse-graining of electrostatic interactions in ionic solids
