A quadratic lower bound for the convergence rate in the one-dimensional Hegselmann-Krause bounded confidence dynamics

Edvin Wedin; Peter Hegarty

arxiv: 1406.0769 · v3 · pith:ARXNE56Dnew · submitted 2014-06-02 · 💻 cs.SY · cs.SY· math.CO

A quadratic lower bound for the convergence rate in the one-dimensional Hegselmann-Krause bounded confidence dynamics

Edvin Wedin , Peter Hegarty This is my paper

classification 💻 cs.SY cs.SYmath.CO

keywords boundboundedconfidencedynamicshegselmann-krauseloweromegaagents

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Let f_{k}(n) be the maximum number of time steps taken to reach equilibrium by a system of n agents obeying the k-dimensional Hegselmann-Krause bounded confidence dynamics. Previously, it was known that \Omega(n) = f_{1}(n) = O(n^3). Here we show that f_{1}(n) = \Omega(n^2), which matches the best-known lower bound in all dimensions k >= 2.

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A quadratic lower bound for the convergence rate in the one-dimensional Hegselmann-Krause bounded confidence dynamics

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