You're viewing papers too quickly. Please wait a moment.<br>This helps keep the archive available for everyone.

Quick Navigation

Topics

Quantum Algorithms

A permanent formula for the Jones polynomial

arXiv
Authors: Martin Loebl, Iain Moffatt

Year

2007

Paper ID

50116

Status

Preprint

Abstract Read

~2 min

Abstract Words

106

Citations

N/A

Abstract

The permanent of a square matrix is defined in a way similar to the determinant, but without using signs. The exact computation of the permanent is hard, but there are Monte-Carlo algorithms that can estimate general permanents. Given a planar diagram of a link L with n crossings, we define a 7n by 7n matrix whose permanent equals to the Jones polynomial of L. This result accompanied with recent work of Freedman, Kitaev, Larson and Wang provides a Monte-Carlo algorithm to any decision problem belonging to the class BQP, i.e. such that it can be computed with bounded error in polynomial time using quantum resources.

Why This Paper Matters

  • It adds a 2007 reference point for readers tracking recent quantum research.
  • The permanent of a square matrix is defined in a way similar to the determinant, but without using signs.

Paper Tools

Become a member to use research tools

Sign in to open papers, visit source links, share, cite, compare, copy DOI links, request category corrections, and build your reading list.

Show Paper arXiv Publisher Share Cite This Paper Copy URL Compare Copy DOI Add to Reading List Category Correction Request

References & Citation Signals

Local Citation Graph (Related-Paper Links)

Current Paper #50116 #69983 Spectral Leakage and Masking Ef... #69982 Dimensionality Reduction of QAO... #69981 A Hybrid Quantum-Classical Appr... #69980 Complexity Inequalities for Qua...

External citation index: OpenAlex citation signal

Community Reactions

Quick sentiment from readers on this paper.

Score: 0
Likes: 0 Dislikes: 0

Sign in to react to this paper.

Discussion & Reviews (Moderated)

Average Rating: 0.0 / 5 (0 ratings)

No written reviews yet.