Topologies on sets of polynomial knots and the homotopy types of the respective spaces

Abstract

A polynomial knot in Rn is a smooth embedding of R in Rn such that the component functions are real polynomials. In the earlier paper with Mishra, we have studied the space P of polynomial knots in R3 with the inductive limit topology coming from the spaces Od for d≥3, where Od is the space of polynomial knots in R3 with degree d and having some conditions on the degrees of the component polynomials. In the same paper, we have proved that the space of polynomial knots in R3 has the same homotopy type as S2. The homotopy type of the space is the mere consequence of the topology chosen. If we have another topology on P, the homotopy type may change. With this in mind, we consider in general the set Ln of polynomial knots in Rn with various topologies on it and study the homotopy type of the respective spaces. Let L be the union of the sets Ln for n≥1. We also explore the homotopy type of the space L with some natural topologies on it.