Kac's lemma is a classical result in ergodic theory. It asserts that the expected number of iterates that it takes a point from a measurable set A to return to the set A under an ergodic probability- preserving transformation is equal to the inverse of the measure of A. As we will discuss in this seminar, there is a natural generalization of Kac's lemma that applies to probability preserving actions of an arbitrary countable group (and beyond). As an application, we will show that any ergodic action of a countable group admits a countable generator. The content of this work is based on a joint article with Benjamin Weiss.
Meeting ID: 852 4277 3200 Passcode: 103121