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ERGODIC THEOREM FOR INFINITE ITERATED FUNCTION SYSTEMS

ERGODIC THEOREM FOR INFINITE ITERATED FUNCTION SYSTEMS
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摘要 A set of contraction maps of a metric space is called an iterated function systems. Iterated function systems with condensation, can be considered infinite iterated function systems. Infinite iterated function systems on compact metric spaces were studied. Using the properties of Banach limit and uniform contractiveness, it was proved that the random iterating algorithms for infinite iterated function systems on compact metric spaces-satisfy ergodicity. So the random iterating algorithms for iterated function systems with condensation satisfy ergodicity, too. A set of contraction maps of a metric space is called an iterated function systems. Iterated function systems with condensation, can be considered infinite iterated function systems. Infinite iterated function systems on compact metric spaces were studied. Using the properties of Banach limit and uniform contractiveness, it was proved that the random iterating algorithms for infinite iterated function systems on compact metric spaces-satisfy ergodicity. So the random iterating algorithms for iterated function systems with condensation satisfy ergodicity, too.
出处 《Applied Mathematics and Mechanics(English Edition)》 SCIE EI 2005年第4期465-469,共5页 应用数学和力学(英文版)
关键词 iterated function system invariant measure ergodic theorem random iterating algorithm iterated function system invariant measure ergodic theorem random iterating algorithm
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