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Bibliographic Details
Main Author: Landers, Jonathan
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2504.16706
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author Landers, Jonathan
author_facet Landers, Jonathan
contents We investigate how sorting algorithms efficiently overcome the exponential size of the permutation space. Our main contribution is a new continuous-time formulation of sorting as a gradient flow on the permutohedron, yielding an independent proof of the classical $Ω(n \log n)$ lower bound for comparison-based sorting. This formulation reveals how exponential contraction of disorder occurs under simple geometric dynamics. In support of this analysis, we present algebraic, combinatorial, and geometric perspectives, including decision-tree arguments and linear constraints on the permutohedron. The idea that efficient sorting arises from structure-guided logarithmic reduction offers a unifying lens for how comparisons tame exponential spaces. These observations connect to broader questions in theoretical computer science, such as whether the existence of structure can explain why certain computational problems permit efficient solutions.
format Preprint
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institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Sorting as Gradient Flow on the Permutohedron
Landers, Jonathan
Data Structures and Algorithms
We investigate how sorting algorithms efficiently overcome the exponential size of the permutation space. Our main contribution is a new continuous-time formulation of sorting as a gradient flow on the permutohedron, yielding an independent proof of the classical $Ω(n \log n)$ lower bound for comparison-based sorting. This formulation reveals how exponential contraction of disorder occurs under simple geometric dynamics. In support of this analysis, we present algebraic, combinatorial, and geometric perspectives, including decision-tree arguments and linear constraints on the permutohedron. The idea that efficient sorting arises from structure-guided logarithmic reduction offers a unifying lens for how comparisons tame exponential spaces. These observations connect to broader questions in theoretical computer science, such as whether the existence of structure can explain why certain computational problems permit efficient solutions.
title Sorting as Gradient Flow on the Permutohedron
topic Data Structures and Algorithms
url https://arxiv.org/abs/2504.16706