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Main Authors: Cohen, David A., Jeavons, Peter G., Kaznatcheev, Artem, Alferez, Sofia Vazquez
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2605.12425
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author Cohen, David A.
Jeavons, Peter G.
Kaznatcheev, Artem
Alferez, Sofia Vazquez
author_facet Cohen, David A.
Jeavons, Peter G.
Kaznatcheev, Artem
Alferez, Sofia Vazquez
contents Local search in combinatorial optimisation can be viewed as an uphill climb on a corresponding fitness landscape, where the assignments visited by a strict local search follow an ascent in the landscape. This hill-climbing is sometimes surprisingly efficient, but not always. Since fitness landscapes can be succinctly represented by valued constraint satisfaction problems (VCSPs), it is natural to ask: what properties of VCSPs ensure that all ascents are polynomial? Or alternatively, what are the ``simplest'' VCSPs with exponential ascents? Prior examples of VCSPs with long ascents were built up as a chain of gadgets of constraints. Here we give a simpler star of gadgets construction by gluing 2n triangles of constraints at a common centre variable. We obtain a binary VCSP on 4n + 1 Boolean variables with an exponential ascent of length 10*2^n - 9. The variable at the centre of our construction intertwines two sublandscapes with only linear ascents into one with exponential ascents. The VCSP that we construct is significantly simpler than prior constructions in terms of treedepth (reducing Ω(log n) to 3) and feedback vertex set number (reducing Ω(n) to 1). We discuss the consequences of this simplicity for the parameterized complexity of local search.
format Preprint
id arxiv_https___arxiv_org_abs_2605_12425
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Binary constraints on one additional variable can create exponential ascents
Cohen, David A.
Jeavons, Peter G.
Kaznatcheev, Artem
Alferez, Sofia Vazquez
Discrete Mathematics
Local search in combinatorial optimisation can be viewed as an uphill climb on a corresponding fitness landscape, where the assignments visited by a strict local search follow an ascent in the landscape. This hill-climbing is sometimes surprisingly efficient, but not always. Since fitness landscapes can be succinctly represented by valued constraint satisfaction problems (VCSPs), it is natural to ask: what properties of VCSPs ensure that all ascents are polynomial? Or alternatively, what are the ``simplest'' VCSPs with exponential ascents? Prior examples of VCSPs with long ascents were built up as a chain of gadgets of constraints. Here we give a simpler star of gadgets construction by gluing 2n triangles of constraints at a common centre variable. We obtain a binary VCSP on 4n + 1 Boolean variables with an exponential ascent of length 10*2^n - 9. The variable at the centre of our construction intertwines two sublandscapes with only linear ascents into one with exponential ascents. The VCSP that we construct is significantly simpler than prior constructions in terms of treedepth (reducing Ω(log n) to 3) and feedback vertex set number (reducing Ω(n) to 1). We discuss the consequences of this simplicity for the parameterized complexity of local search.
title Binary constraints on one additional variable can create exponential ascents
topic Discrete Mathematics
url https://arxiv.org/abs/2605.12425