论文信息 - Invariant Measures for Set-Valued Dynamical Systems

Invariant Measures for Set-Valued Dynamical Systems

A continuous map on a compact metric space, regarded as a dynamical system by iteration, admits invariant measures. For a closed relation on such a space, or, equivalently, an upper semicontinuous set-valued map, there are several concepts which extend this idea of invariance for a measure. We prove that four such are equivalent. In particular, such relation invariant measures arise as projections from shift invariant measures on the space of sample paths. There is a similarly close relationship between the ideas of chain recurrence for the set-valued system and for the shift on the sample path space.

Ethan Akin | E. Akin | Walter M. Miller

[1] Poincaré's recurrence theorem for set-valued dynamical systems , 1991 .

[2] Walter M. Miller. Frobenius-Perron operators and approximation of invariant measures for set-valued dynamical systems , 1995 .

[3] Ethan Akin,et al. The general topology of dynamical systems , 1993 .

[4] I. I. Gikhman,et al. The Theory of Stochastic Processes III , 1979 .

[5] Richard McGehee,et al. Attractors for closed relations on compact Hausdorff spaces , 1992 .

[6] Steven Vajda,et al. The Theory of Linear Economic Models , 1960 .

[7] David R. Cox,et al. The Theory of Stochastic Processes , 1967, The Mathematical Gazette.

[8] R. Brualdi. Convex Sets of Non-Negative Matrices , 1968, Canadian Journal of Mathematics.