Perturbed-Alexander Invariants via Quantum Cluster Algebras

Abstract

A perturbative expansion of knot invariants is derived using quantum cluster algebras. By interpreting the R-matrix of Uq(sl2) as a cluster transformation and introducing an auxiliary parameter ε, we derive a perturbed R-matrix expressed in terms of Heisenberg algebra generators arising from the representation theory of the quantum cluster algebra. The resulting knot invariant has a zeroth-order term equal to ΔK(T)-1, the reciprocal of the Alexander polynomial, while higher-order terms in ε produce perturbed-Alexander invariants in line with the construction by Bar-Natan and Van der Veen. Our construction combines the Schrödinger representation of the quantum torus algebra with cluster mutation combinatorics and is illustrated with a Mathematica implementation and explicit examples.