👉 Bra math, or Bra-KRAHMA, is a branch of mathematics that extends the concepts of differential geometry and Lie groups to non-commutative algebras, providing a framework for studying geometric structures in abstract settings. It generalizes classical differential geometry by allowing the use of non-commutative algebras, which are essential in quantum mechanics and quantum field theory. Bra math introduces the notion of "braiding" or intertwining, crucial for understanding topological quantum field theories and knot invariants. It employs tools like the Burau representation, R-matrices, and quantum groups to describe symmetries and transformations in non-commutative spaces, offering insights into the geometric and algebraic properties of quantum systems and their symmetries.
