Monomial reduction of knot polynomials
Abstract
For all natural numbers N and prime numbers p, we find a knot K whose skein polynomial PK(a,z) evaluated at z=N has trivial reduction modulo p. An interesting consequence of our construction is that all polynomials PK(a,N) (mod~p) with bounded a-span are realised by knots with bounded braid index. As an application, we classify all polynomials of the form PK(a,1) (mod 2) with a-span ≤ 10.
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