6533b7d5fe1ef96bd1265080

RESEARCH PRODUCT

Generalized countable iterated function systems

Adrian Nicolae Secelean

subject

Hutchinson operatorDiscrete mathematicsMetric spaceIterated function systemCollage theoremGeneral MathematicsCountable setContraction mappingLipschitz continuityCosmic spaceMathematics

description

One of the most common and most general way to generate fractals is by using iterated function systems which consists of a finite or infinitely many maps. Generalized countable iterated function systems (GCIFS) are a generalization of countable iterated function systems by considering contractions from X ? X into X instead of contractions on the metric space X to itself, where (X, d) is a compact metric space. If all contractions of a GCIFS are Lipschitz with respect to a parameter and the supremum of the Lipschitz constants is finite, then the associated attractor depends continuously on the respective parameter.

yearjournalcountryeditionlanguage
2011-01-01Filomat
https://doi.org/10.2298/fil1101021s