
Status:
Research groups:
Address
University of Oxford
Andrew Wiles Building
Radcliffe Observatory Quarter
Woodstock Road
Oxford
OX2 6GG
Recent Publications:
The Reidemeister graph is a complete knot invariant
Algebraic and Geometric Topology
(23 April 2020)
Full text available
$f$-distance of knotoids and protein structure
Full text available
Grid diagrams as tools to investigate knot spaces and
topoisomerase-mediated simplification of DNA topology
Science Advances
Double branched covers of knotoids
Research interests:
DNA topology, Knot Theory, Low-dimensional Topology, Protein entanglement
Further details:
My personal HomePage: https://poisson.phc.dm.unipi.it/~abarbensi/
Major / recent publications:
The Reidemeister Graph is a complete knot invariant (joint with Daniele Celoria), accepted by Algebraic & Geometric Topology
https://arxiv.org/abs/1801.03313
Double branched covers of knotoids (joint with Dorothy Buck, Heather Harrington and Marc Lackenby), accepted by Communications in Analysis and Geometry
https://arxiv.org/abs/1811.09121
Grid diagrams as tools to investigate knot spaces and topoisomerase-mediated simplification of DNA topology (joint with Daniele Celoria, Heather Harrington, Andrzej Stasiak and Dorothy Buck), accepted by Science Advances
https://arxiv.org/abs/1909.05937
f-distance of knotoids and protein structure (joint with Dimos Goundaroulis)