Superpolynomials of algebraic links
Abstract
Theory of motivic superpolynomials is developed, including its extension to algebraic links colored by rows, relations to L-functions of plane curve singularities, the justification of the motivic versions of Weak Riemann Hypothesis, and recurrences for iterated torus links. The key theme is the conjectural coincidence of motivic superpolynomials with the DAHA ones, which can be interpreted as a far-reaching generalization of the Shuffle Conjecture. Applications include affine Springer fibers of type An and compactified Jacobians in the most general case (for arbitrary characteristic polynomials) and extended rho-invariants of algebraic knots. The 2nd connection conjecture relates the superpolynomials to the Galkin-St\"ohr L-functions, which is some counterpart of the ORS conjecture. The corresponding theory of plane curve singularities is systematically exposed and developed, which can be seen in the case of Hopf links as a generalized version of Schubert Calculus.
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