[Theory] TODAY: 11/14 TTIC Colloquium: Paul Valiant, Purdue University

Mary Marre mmarre at ttic.edu
Mon Nov 14 10:30:00 CST 2022 

*When:*        Monday, November 14th at* 11:30 am CT*

*Where:     * Talk will be *live, in-person* at
                   TTIC, 6045 S. Kenwood Avenue

                   5th Floor, Room 530


*Virtually:*   Via Panopto (*livestream
<https://uchicago.hosted.panopto.com/Panopto/Pages/Viewer.aspx?id=a6540580-fb4e-4402-b1a9-af460182dc1f>*
)


*Who: *         Paul Valiant, Purdue University


------------------------------

*Title:*          Mean Estimation in Low and High Dimensions
*Abstract: *This talk will discuss the fundamental statistical problem of
estimating the mean of a distribution, as accurately as possible given
samples from it. This problem arises both as a subcomponent of many
algorithms, and also in practice as one of the most important data
primitives when dealing with real-world data. While many variants and
extensions of this problem have been proposed and analyzed, in this talk I
will discuss two of the most iconic: 1) when the data comes from a
real-valued distribution, and 2) when the data comes from a
high-dimensional vector-valued distribution. In both cases, we achieve the
first estimators whose accuracy is optimal to 1+o(1) factors, optimal in
its dependence on the unknown (co-) variance of the underlying
distribution, the number of samples n, and the desired confidence delta. I
will highlight some of the crucial and novel analytical tools used in the
analysis, and in particular, draw attention to a new "vector Bernstein
inequality" which makes precise the intuition that sums of bounded
independent random variables in increasingly high dimensions increasingly
"adhere to a spherical shell". These results suggest several possible
extensions in this large and active area of statistical estimation
research. This talk is based on joint work with Jasper C.H. Lee.

Host: *Madhur Tulsiani* <madhurt at ttic.edu>

For more information on the *C**olloquium** Series* or to subscribe to the
mailing list, please see http://www.ttic.edu/colloquium.php


Mary C. Marre
Faculty Administrative Support
*Toyota Technological Institute*
*6045 S. Kenwood Avenue, Rm 517*
*Chicago, IL  60637*
*773-834-1757*
*mmarre at ttic.edu <mmarre at ttic.edu>*


On Sun, Nov 13, 2022 at 2:48 PM Mary Marre <mmarre at ttic.edu> wrote:

> *When:*        Monday, November 14th at* 11:30 am CT*
>
> *Where:     * Talk will be *live, in-person* at
>                    TTIC, 6045 S. Kenwood Avenue
>
>                    5th Floor, Room 530
>
>
> *Virtually:*   Via Panopto (*livestream
> <https://uchicago.hosted.panopto.com/Panopto/Pages/Viewer.aspx?id=a6540580-fb4e-4402-b1a9-af460182dc1f>*
> )
>
>
> *Who: *         Paul Valiant, Purdue University
>
>
> ------------------------------
>
> *Title:*          Mean Estimation in Low and High Dimensions
> *Abstract: *This talk will discuss the fundamental statistical problem of
> estimating the mean of a distribution, as accurately as possible given
> samples from it. This problem arises both as a subcomponent of many
> algorithms, and also in practice as one of the most important data
> primitives when dealing with real-world data. While many variants and
> extensions of this problem have been proposed and analyzed, in this talk I
> will discuss two of the most iconic: 1) when the data comes from a
> real-valued distribution, and 2) when the data comes from a
> high-dimensional vector-valued distribution. In both cases, we achieve the
> first estimators whose accuracy is optimal to 1+o(1) factors, optimal in
> its dependence on the unknown (co-) variance of the underlying
> distribution, the number of samples n, and the desired confidence delta. I
> will highlight some of the crucial and novel analytical tools used in the
> analysis, and in particular, draw attention to a new "vector Bernstein
> inequality" which makes precise the intuition that sums of bounded
> independent random variables in increasingly high dimensions increasingly
> "adhere to a spherical shell". These results suggest several possible
> extensions in this large and active area of statistical estimation
> research. This talk is based on joint work with Jasper C.H. Lee.
>
> Host: *Madhur Tulsiani* <madhurt at ttic.edu>
>
> For more information on the *C**olloquium** Series* or to subscribe to
> the mailing list, please see http://www.ttic.edu/colloquium.php
>
>
> Mary C. Marre
> Faculty Administrative Support
> *Toyota Technological Institute*
> *6045 S. Kenwood Avenue, Rm 517*
> *Chicago, IL  60637*
> *773-834-1757*
> *mmarre at ttic.edu <mmarre at ttic.edu>*
>
>
> On Mon, Nov 7, 2022 at 10:03 PM Mary Marre <mmarre at ttic.edu> wrote:
>
>> *When:*        Monday, November 14th at* 11:30 am CT*
>>
>> *Where:     * Talk will be *live, in-person* at
>>                    TTIC, 6045 S. Kenwood Avenue
>>
>>                    5th Floor, Room 530
>>
>>
>> *Virtually:*   Via Panopto (*livestream
>> <https://uchicago.hosted.panopto.com/Panopto/Pages/Viewer.aspx?id=a6540580-fb4e-4402-b1a9-af460182dc1f>*
>> )
>>
>>
>> *Who: *         Paul Valiant, Purdue University
>>
>>
>> ------------------------------
>>
>> *Title:*          Mean Estimation in Low and High Dimensions
>> *Abstract: *This talk will discuss the fundamental statistical problem
>> of estimating the mean of a distribution, as accurately as possible given
>> samples from it. This problem arises both as a subcomponent of many
>> algorithms, and also in practice as one of the most important data
>> primitives when dealing with real-world data. While many variants and
>> extensions of this problem have been proposed and analyzed, in this talk I
>> will discuss two of the most iconic: 1) when the data comes from a
>> real-valued distribution, and 2) when the data comes from a
>> high-dimensional vector-valued distribution. In both cases, we achieve the
>> first estimators whose accuracy is optimal to 1+o(1) factors, optimal in
>> its dependence on the unknown (co-) variance of the underlying
>> distribution, the number of samples n, and the desired confidence delta. I
>> will highlight some of the crucial and novel analytical tools used in the
>> analysis, and in particular, draw attention to a new "vector Bernstein
>> inequality" which makes precise the intuition that sums of bounded
>> independent random variables in increasingly high dimensions increasingly
>> "adhere to a spherical shell". These results suggest several possible
>> extensions in this large and active area of statistical estimation
>> research. This talk is based on joint work with Jasper C.H. Lee.
>>
>> Host: *Madhur Tulsiani* <madhurt at ttic.edu>
>>
>> For more information on the *C**olloquium** Series* or to subscribe to
>> the mailing list, please see http://www.ttic.edu/colloquium.php
>>
>>
>>
>>
>> Mary C. Marre
>> Faculty Administrative Support
>> *Toyota Technological Institute*
>> *6045 S. Kenwood Avenue, Rm 517*
>> *Chicago, IL  60637*
>> *773-834-1757*
>> *mmarre at ttic.edu <mmarre at ttic.edu>*
>>
>
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