English

Strongly Rigid Flows

Dynamical Systems 2021-11-30 v2

Abstract

We consider flows (X,T)(X,T), given by actions (t,x)tx(t, x) \to tx, on a compact metric space XX with a discrete TT as an acting group. We study a new class of flows - the \textsc{Strongly Rigid} (SR \mathbf {SR} ) \ flows, that are properly contained in the class of distal (D \mathbf D ) flows and properly contain the class of all equicontinuous (EQ \mathbf {EQ} ) flows. Thus, EQ flowsSR flowsD flows\mathbf {EQ} \ \text{flows} \subsetneqq \mathbf {SR} \ \text{flows} \subsetneqq \mathbf{ D} \ \text{flows}. The concepts of equicontinuity, strong rigidity and distality coincide for the induced flow (2X,T)(2^X,T). We observe that strongly rigid (X,T)(X,T) gives distinct properties for the induced flow (2X,T)(2^X,T) and its enveloping semigroup E(2X)E(2^X). We further study strong rigidity in case of particular semiflows (X,S)(X,S), with SS being a discrete acting semigroup.

Keywords

Cite

@article{arxiv.2103.15067,
  title  = {Strongly Rigid Flows},
  author = {Anima Nagar and Manpreet Singh},
  journal= {arXiv preprint arXiv:2103.15067},
  year   = {2021}
}
R2 v1 2026-06-24T00:37:13.322Z