On alternating dynamical systems and percolation

Consider independent bond percolation with retention probability p on a Ž . spherically symmetric tree ⌫. Write p for the probability that the root is in an infinite ⌫ Ä Ž . 4 Ž . open cluster, and define the critical value p s inf p : p ) 0 . If p s 0, then the c ⌫ ⌫ c root may still percolate in t

This paper is concerned with dynamical stability of general dynamical systems. We discuss invariance properties of some limit sets, investigate connections between various notions and definitions related to stability and attraction properties, and establish existence results for invariant uniform at

Transformations of dynamical systems are discussed in terms of adjoint, simple adjoint and weak adjoint functors. The relevance of this approach to interpretations of nuclear transplant experiments is suggested, and three new theorems concerning the development of biological systems are presented. A

Space-time lattice (cellular automaton) models of pattern formation and growth are described. Suitable local rules for automaton evolution represent the spreading of wave fronts of activity in an excitable medium. A random distribution of seeds produces expanding rings that fuse and are annihilated.