Effective equidistribution for generalized higher step nilflows

TL;DR

This paper establishes polynomial speed bounds for ergodic averages of higher step nilflows on nilmanifolds under Diophantine conditions, advancing understanding of equidistribution in complex dynamical systems.

Contribution

It provides new bounds for ergodic averages of nilflows on higher step nilmanifolds, linking decay speed to the nilpotent Lie algebra structure and Diophantine conditions.

Findings

Almost all orbits become equidistributed at polynomial speed

Bounds depend on the number of steps and algebra structure

Technique involves controlling scaling operators and measure estimation

Abstract

The main results of this paper are to prove bounds for ergodic averages for nilflows on general higher step nilmanifolds. Under Diophantine condition on the frequency of a toral projection of the flow, we prove that almost all orbits become equidistributed at the polynomial speed. We analyze the exponent with the speed of decay which is determined by the number of steps and structure of general nilpotent Lie algebras. The main result follows from the technique over controlling scaling operators in irreducible representations and measure estimation on close return orbit on general nilmanifolds.