Name: Ghanendra K Das
Type: User
Company: Dept of Aerospace Engineering, Georgia Tech
Bio: PhD student in Aerospace Engineering.
Interested in Aircraft MDO, Aeroelasticity, Topology Optimization.
Location: Atlanta, Georgia
Ghanendra K Das's Projects
Note of Youtube lecture, "2017 Numerical methods of PDE", given by Qiqi Wang
Classical Aerodynamics of potential flow using Python and Jupyter Notebooks
ARCHER2 C++ course
Massively parallel rigidbody physics simulation on accelerator hardware.
Structure and Appearance Optimization for Controllable Shape Design
Convert fluid pressure from CFD analysis into a boundary condition of Finite Element model.
A sequence of Jupyter notebooks featuring the "12 Steps to Navier-Stokes" http://lorenabarba.com/
Official Matplotlib cheat sheets
Source material for Parallel Scientific Computing II given as part of the MEng in Computer Science at Durham University.
Companion code for "Modern Computational Finance: AAD and Parallel Simulations" (Antoine Savine, Wiley, 2018)
Materials from the coursera course on Finite Element Methods in Physics with programming assignments written in Deal ii
Homepage for CSC417: Physics-based Animation
CU-BEN serial version: geometric and material nonlinear static and transient dynamic structural analysis/ linear acoustic fluid structure interaction
Finite Element Method CUDA implementation
Academic CVs that you can emulate
The development repository for the deal.II finite element library.
Resources for the book "Finite Difference Computing with Exponential Decay Models" by H. P. Langtangen
A repository for publicly available documents and presentations related to libMesh
DynELA Finite Element code v. 4.0
DynELA Finite Element code v.3.0
Cell centred code for explicit solid dynamics in OpenFOAM
Multibody Dynamics Simulation: Rigid and flexible multibody systems
Resources for "The Craft of Finite Difference Computing with Partial Differential Equations" by H. P. Langtangen
C++ MPI implementation of a 2D FEM solver. Mesh is constructed in FEniCS.
a finite element solver based on Taichi, being parallel (CPU/GPU), portable and open-source
This project implements FEM using implicit and explicit integration on both the CPU and the GPU