Characterization of knots and links arising from site-specific recombination on twist knots

We develop a model characterizing all possible knots and links arising from recombination starting with a twist knot substrate, extending the previous work of Buck and Flapan. We show that all knot or link products fall into three well-understood families of knots and links, and prove that given a positive integer n, the number of product knots and links with minimal crossing number equal to n grows proportionally to n⁵. In the (common) case of twist knot substrates whose products have minimal crossing number one more than the substrate, we prove that the types of products are tightly prescribed. Finally, we give two simple examples to illustrate how this model can help determine previously uncharacterized experimental data. © 2011 IOP Publishing Ltd.

Duke Scholars

Author Dorothy Buck Mathematics