Abstract
A set of fixed points is given in a space and we determine for each point a zone of influence such that these sets form a partition of the space. The relation between the existence of such partitions and a transitivity property is proved. A construction of partitions by pnfercnce functions is studied. Finally some geometrical examples are presented.
Original language | American English |
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Pages (from-to) | 1061-1068 |
Journal | Computers and Operations Research |
Volume | 21 |
State | Published - 1994 |