Search of fractal space-filling curves with minimal dilation

Abstract

We introduce an algorithm for a search of extremal fractal curves in large curve classes. It heavily uses SAT-solvers~ -- heuristic algorithms that find models for CNF boolean formulas. Our algorithm was implemented and applied to the search of fractal surjective curves γ[0,1][0,1]d with minimal dilation t1<t2\|γ(t2)-γ(t1)\|dt2-t1. We report new results of that search in the case of Euclidean norm. We have found a new curve that we call "YE", a self-similar (monofractal) plane curve of genus 5× 5 with dilation 54373=5.5890…. In dimension 3 we have found facet-gated bifractals (that we call "Spring") of genus 2×2× 2 with dilation <17. In dimension 4 we obtained that there is a curve with dilation <62. Some lower bounds on the dilation for wider classes of cubically decomposable curves are proved.