Representations of knot groups in AGL1(C) and Alexander invariants
Abstract
This paper reinterprets Alexander-type invariants of knots via representation varieties of knot groups into the group AGL1(C) of affine transformations of the complex line. In particular, we prove that the coordinate ring of the AGL1(C)-representation variety is isomorphic to the symmetric algebra of the Alexander module. This yields a natural interpretation of the Alexander polynomial as the singular locus of a coherent sheaf over C*, whose fibres correspond to quandle representation varieties of the knot quandle. As a by-product, we construct Topological Quantum Field Theories that provide effective computational methods and recover the Burau representations of braids. This theory offers a new geometric perspective on classical Alexander invariants and their functorial quantization.
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