English

Knots, Braids and First Order Logic

Logic 2012-09-18 v1 Geometric Topology

Abstract

Determining when two knots are equivalent (more precisely isotopic) is a fundamental problem in topology. Here we formulate this problem in terms of Predicate Calculus, using the formulation of knots in terms of braids and some basic topological results. Concretely, Knot theory is formulated in terms of a language with signature (,T,,1,σ,σˉ)(\cdot,T,\equiv, 1,\sigma,\bar\sigma), with \cdot a 2-function, TT a 1-function, \equiv a 2-predicate and 1, σ\sigma and σˉ\bar\sigma constants. We describe a finite set of axioms making the language into a (first order) theory. We show that every knot can be represented by a term bb in 1, σ\sigma, \bs\bs and TT, and knots represented by terms b1b_1 and b2b_2 are equivalent if and only if b1b2b_1\equiv b_2. Our formulation gives a rich class of problems in First Order Logic that are important in Mathematics.

Keywords

Cite

@article{arxiv.1209.3562,
  title  = {Knots, Braids and First Order Logic},
  author = {Siddhartha Gadgil and T. V. H. Prathamesh},
  journal= {arXiv preprint arXiv:1209.3562},
  year   = {2012}
}

Comments

12 pages; 9 figures

R2 v1 2026-06-21T22:06:03.070Z