Polynomial Ergodic Averages Converge Rapidly: Variations on a Theorem of Bourgain
Abstract
Let L2(X,,μ,τ) be a measure-preserving system, with τ a Z-action. In this note, we prove that the ergodic averages along integer-valued polynomials, P(n), \[ MN(f):= 1NΣn ≤ N τP(n) f \] converge pointwise for f ∈ L2(X). We do so by proving that, for r>2, the r-variation, Vr(MN(f)), extends to a bounded operator on L2. We also prove that our result is sharp, in that V2(MN(f)) is an unbounded operator on L2.
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