Add to ORKGWhen given a very tangled but unknotted circular piece of string it is usually quite easy to move it around and tug on parts of it until it untangles. However, solving this problem by computer, either exactly or heuristically, is challenging. Various approaches have been tried, employing ideas from algebra, geometry, topology and optimization. This paper investigates the application of motion planning techniques to the untangling of mathematical knots. Such an approach brings together robotics and knotting at the intersection of these fields: rational manipulation of a physical model. In the past, simulated annealing and other energy minimization methods have been used to find knot untangling paths for physical models. Using a probabilistic...
We present Brownian dynamics simulations of initially knotted double-stranded DNA molecules untying ...
The goal of this paper is to discuss the possibility of finding an algorithm that can give all disti...
Abstract—We present a new approach to path planning for deformable linear (one-dimensional) objects ...
In mathematics, a knot is a single strand crossed over itself any number of times, and connected at ...
In this thesis, we present different approaches to tying knots using robots by enforcing different t...
Deciding whether a diagram of a knot can be untangled with a given number of moves (as a part of the...
The synthesis of molecular knots has been a major achievement in the field of chemical topology, but...
Abstract — This paper presents a technique for improving the efficiency of automated motion planners...
The properties of knotted and linked configurations in space have long been of interest to physicist...
This paper explores the problem of unknotting closed braids and classical knots in mathematical knot...
We introduce natural language processing into the study of knot theory, as made natural by the braid...
Knots are ubiquitous objects and decorative elements that have been studied since antiquity. During ...
The physical properties of knotted and linked configurations in space have long been of interest to ...
A mathematical knot is similar in concept to the everyday headphone cable, with the ends closed toge...
Abstract — Cut along the surface of a polyhedron and unfold it to a planar structure without overlap...
We present Brownian dynamics simulations of initially knotted double-stranded DNA molecules untying ...
The goal of this paper is to discuss the possibility of finding an algorithm that can give all disti...
Abstract—We present a new approach to path planning for deformable linear (one-dimensional) objects ...
In mathematics, a knot is a single strand crossed over itself any number of times, and connected at ...
In this thesis, we present different approaches to tying knots using robots by enforcing different t...
Deciding whether a diagram of a knot can be untangled with a given number of moves (as a part of the...
The synthesis of molecular knots has been a major achievement in the field of chemical topology, but...
Abstract — This paper presents a technique for improving the efficiency of automated motion planners...
The properties of knotted and linked configurations in space have long been of interest to physicist...
This paper explores the problem of unknotting closed braids and classical knots in mathematical knot...
We introduce natural language processing into the study of knot theory, as made natural by the braid...
Knots are ubiquitous objects and decorative elements that have been studied since antiquity. During ...
The physical properties of knotted and linked configurations in space have long been of interest to ...
A mathematical knot is similar in concept to the everyday headphone cable, with the ends closed toge...
Abstract — Cut along the surface of a polyhedron and unfold it to a planar structure without overlap...
We present Brownian dynamics simulations of initially knotted double-stranded DNA molecules untying ...
The goal of this paper is to discuss the possibility of finding an algorithm that can give all disti...
Abstract—We present a new approach to path planning for deformable linear (one-dimensional) objects ...