kvanteinvariants

Kvanteinvariants, also known as quantum invariants, are quantities assigned to knots, links, and 3-manifolds that remain unchanged under topological or smooth deformations. They arise from ideas in quantum physics and representation theory and provide powerful tools in low-dimensional topology.

Theoretical foundation: They come from quantum groups U_q(g) and from Chern-Simons topological quantum field theory. Using

Examples: The Jones polynomial is a quantum invariant derived from U_q(sl2). The HOMFLY-PT polynomial extends Jones

Applications and significance: Quantum invariants have deep connections to low-dimensional topology, representation theory, algebraic geometry, and