\( \newcommand{\Ds}{\displaystyle} \newcommand{\PP}{{\mathbb P}} \newcommand{\RR}{{\mathbb R}} \newcommand{\KK}{{\mathbb K}} \newcommand{\CC}{{\mathbb C}} \newcommand{\ZZ}{{\mathbb Z}} \newcommand{\NN}{{\mathbb N}} \newcommand{\TT}{{\mathbb T}} \newcommand{\QQ}{{\mathbb Q}} \newcommand{\Abs}[1]{{\left|{#1}\right|}} \newcommand{\Floor}[1]{{\left\lfloor{#1}\right\rfloor}} \newcommand{\Ceil}[1]{{\left\lceil{#1}\right\rceil}} \newcommand{\sgn}{{\rm sgn\,}} \newcommand{\Set}[1]{{\left\{{#1}\right\}}} \newcommand{\Norm}[1]{{\left\|{#1}\right\|}} \newcommand{\Prob}[1]{{{{\mathbb P}}\left[{#1}\right]}} \newcommand{\Mean}[1]{{{{\mathbb E}}\left[{#1}\right]}} \newcommand{\cis}{{\rm cis}\,} \renewcommand{\Re}{{\rm Re\,}} \renewcommand{\Im}{{\rm Im\,}} \renewcommand{\arg}{{\rm arg\,}} \renewcommand{\Arg}{{\rm Arg\,}} \newcommand{\ft}[1]{\widehat{#1}} \newcommand{\FT}[1]{\left(#1\right)^\wedge} \newcommand{\Lone}[1]{{\left\|{#1}\right\|_{1}}} \newcommand{\Linf}[1]{{\left\|{#1}\right\|_\infty}} \newcommand{\inner}[2]{{\langle #1, #2 \rangle}} \newcommand{\Inner}[2]{{\left\langle #1, #2 \right\rangle}} \newcommand{\nint}{{\frac{1}{2\pi}\int_0^{2\pi}}} \newcommand{\One}[1]{{\bf 1}\left(#1\right)} \)
Analysis Seminar in Crete (2022-23)

Σεμιναριο Αναλυσης

http://www.math.uoc.gr/analysis-seminar


    Department of Mathematics and Applied Math / Fourier and Functional Analysis / Previous years: 2021-22/ 2020-21/ 2019-20/ 2018-19/ 2017-18/ 2016-17/ 2015-16/ 2014-15/ 2013-14/ 2012-13/ 2011-12/ 2010-11/ 2009-10/ 2008-09/ 2007-08/ 2006-07/ 2005-06/ 2004-05 / Summer 2004 / 2003-04 / 2002-03 / 2001-02 / 2000-01 / 1999-00

    Analysis Seminars in the World / Analysis seminars in Greece

In chronological ordering


9/22/2022, 11:00, Room: A303
Speaker: Andreas Koutsogiannis ( Aristotle University of Thessaloniki)

Joint ergodicity for functions of polynomial degree

 

Abstract: In this talk we will deal with multiple ergodic averages having iterates a common integer-valued sequence that comes from appropriate classes of functions. In particular, we are dealing with the combination of a Hardy, a tempered, and a polynomial function satisfying some growth-rate restrictions to avoid local obstructions. Joint work with S. Donoso and W. Sun.

 


9/29/2022, 11:00, Room: A303
Speaker: Giorgos Chasapis (University of Crete)

On a Rademacher-Gaussian tail comparison

 

Abstract: Let $\varepsilon_1,\varepsilon_2,\ldots$ be independent Rademacher random variables and $g_1,g_2,\ldots$ be independent standard Gaussian random variables. Pinelis has proved that there is an absolute constant $C>0$ such that for every $n\in\mathbb{N}$, real numbers $v_1,\ldots,v_n$ and any $t>0$, $$ \mathbb{P}\left(\left|\sum_{j=1}^n v_j\varepsilon_j\right|\gtrapprox t\right)\lessapprox C\cdot \mathbb{P}\left(\left|\sum_{j=1}^n v_jg_j\right|\gtrapprox t\right). $$ We extend this Rademacher-Gaussian tail comparison to the case of complex coefficients and discuss related open problems.

Based on joint work with R. Liu and T. Tkocz.

 


All seminars

Seminar organizer for 2022-23: Silouanos Brazitikos

Page maintained by Mihalis Kolountzakis.