Invariant patterns for replicator dynamics on a hexagonal lattice

K. Ikeda, Y. Kogure, H. Aizawa, Yuki Takayama

研究成果: Article査読

3 被引用数 (Scopus)

抄録

A hexagonal lattice is a promising and plausible spatial platform for economic agglomeration in spatial economic models. This paper aims at the elucidation of agglomeration mechanisms for the replicator dynamics on this lattice. Attention is paid to the existence of invariant solutions that retain their spatial patterns when the bifurcation parameter changes. Such existence is a special feature of the replicator dynamics, which is widely used in economics. A theoretical procedure to find invariant patterns is proposed and possible invariant patterns are advanced and classified. Among a plethora of theoretically possible invariant patterns, those which actually become stable for a spatial economic model are investigated numerically. The major finding of this paper, is the demonstration of equilibrium curves of invariant patterns that are connected by those of noninvariant ones to form a complicated mesh-like structure, just like the threads of warp and weft. It would be an important scientific mission to elucidate the mechanism of this complicated structure, and contribute to the study in economic geography.

本文言語English
論文番号1930014
ジャーナルInternational Journal of Bifurcation and Chaos
29
6
DOI
出版ステータスPublished - 2019 6月 15

ASJC Scopus subject areas

  • モデリングとシミュレーション
  • 工学(その他)
  • 一般
  • 応用数学

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