ACTA MATHEMATICA UNIVERSITATIS COMENIANAE
Vol. LXXII, 2 (2003)
p. 245 – 251
Triangular Maps with the Chain Recurent Points Periodic
J. Kupka
Abstract.
Forti and Paganoni [Grazer Math. Ber. {\bf 339} (1999), 125--140]
found a triangular map $F(x,y)=(f(x),g_x (y))$ from $I\times I$
into itself for which closed set of~periodic points is a proper
subset of the set of chain recurrent points. We asked whether
there is a characterization of triangular maps for which every
chain recurrent point is periodic. We answer this question in
positive by showing that, for a triangular map with closed set of
periodic points and any posi\-tive real~$\varepsilon$, every
$\varepsilon$-chain from a chain recurrent point to itself may be
represented as a finite union of $\varepsilon$-chains whose all
points either are periodic or form a nontrivial
$\varepsilon$-chain of some one-dimensional map~$g_x$.
AMS subject classification:
37E99, 37B20, 26A18, 54H20;
Keywords:
Triangular maps, periodic points, chain recurrent
points
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