A c++ library with the purpose to calculate the decomposition of the Yukawa interactions invariants on SO(2N) groups in terms of the SU(N) subgroup.
-
Updated
Sep 25, 2023 - C++
A c++ library with the purpose to calculate the decomposition of the Yukawa interactions invariants on SO(2N) groups in terms of the SU(N) subgroup.
Notes on Lie algebras and their representation theory.
Gauge Fields Interactions Calculator
Algorithm I made accompanying my undergraduate thesis.
Tracking aggressive trajectories of a quadrotor on SO3/SE3 manifolds using geometric control strategies. Design-oriented project at BITS-PILANI (Goa Campus), 2021.
Implementation of banana shape distribution paper
Torch implementation of Marc Finzi's Equivariant MLP
Finite-dimensional Lie algebra package for SymPy
[CVPR 2024] Confronting Ambiguity in 6D Object Pose Estimation via Score-Based Diffusion on SE(3)
grg: Computer Algebra System for Differential Geometry, Gravitation and Field Theory, automatically mirrored from https://reduce-algebra.sourceforge.io/grg32/grg32.php
An exercise of Base Lie theory in "State Estimation for Robotics"
Obtaining Heisenberg Algebra from Heisenberg Group
dimsym: Geometric and algebraic techniques for differential equations (with modelling applications); Symmetry Determination and Linear Differential Equation Package, mirrored from https://www.latrobe.edu.au/mathematics-and-statistics/research/geometric-and-algebraic-techniques-for-differential-equations/dimsym/
Differential Equations' LIE symmetries Research InstrUMent
A python package using machine learning to study symmetry.
Solutions to problems in Gauge Fields, Knots and Gravity
Add a description, image, and links to the lie-algebra topic page so that developers can more easily learn about it.
To associate your repository with the lie-algebra topic, visit your repo's landing page and select "manage topics."