English

Variational Estimates for Bilinear Ergodic Averages Along Sublinear Sequences

Dynamical Systems 2024-11-13 v1 Classical Analysis and ODEs

Abstract

We prove long variational estimates for the bilinear ergodic averages AN;X(f,g)(x)=1Nn=1Nf(Tnx)g(Tnx) A_{N;X}(f,g)(x) = \frac{1}{N} \sum_{n=1}^N f(T^{\lfloor \sqrt{n} \rfloor}x) g(T^nx) on an arbitrary measure preserving system (X,μ,T)(X,\mu,T) for the full expected range, i.e. whenever fLp1(X)f \in L^{p_1}(X) and gLp2(X)g \in L^{p_2}(X) with 1<p1,p2<1<p_1,p_2<\infty. In particular, if 1p=1p1+1p2\frac{1}{p}=\frac{1}{p_1}+\frac{1}{p_2} we show that the long rr-variation of AN;XA_{N;X} maps Lp1(X)×Lp2(X)L^{p_1}(X) \times L^{p_2}(X) into Lp(X)L^p(X) for any p>12p>\frac{1}{2}, which is sharp up to the endpoint. If p1p \geq 1 we obtain long variational estimates for the full expected range r>2r>2 and if p<1p<1 we obtain a range of r>2+εp1,p2r>2+\varepsilon_{p_1,p_2} where εp1,p2>0\varepsilon_{p_1,p_2}>0 depends only on p1p_1 and p2p_2. As a consequence, we obtain bilinear maximal estimates supNNAN;X(f,g)Lp(X)Cp1,p2fLp1(X)gLp2(X) \left\| \sup_{N \in \mathbb{N}} |A_{N;X}(f,g)| \right\|_{L^p(X)} \leq C_{p_1,p_2} \|f\|_{L^{p_1}(X)} \|g\|_{L^{p_2}(X)} for any 1<p1,p21<p_1,p_2 \leq \infty.

Keywords

Cite

@article{arxiv.2411.07384,
  title  = {Variational Estimates for Bilinear Ergodic Averages Along Sublinear Sequences},
  author = {Maximilian O'Keeffe},
  journal= {arXiv preprint arXiv:2411.07384},
  year   = {2024}
}

Comments

42 pages

R2 v1 2026-06-28T19:56:09.249Z