GCSE Upper and Lower Bounds Introduction Measures of Accuracy
www.m4ths.com GCSE and A Level Worksheets, videos and helpbooks. Full course help for Foundation and Higher GCSE 9-1 Maths All content created by Steve Blades
From playlist GCSE Upper and Lower Bounds
GCSE Upper and Lower Bounds Example 2
www.m4ths.com GCSE and A Level Worksheets, videos and helpbooks. Full course help for Foundation and Higher GCSE 9-1 Maths All content created by Steve Blades
From playlist GCSE Upper and Lower Bounds
Math 131 112116 Uniform Convergence and Integration
Quick introduction to Riemann integrability: partitions, upper and lower sums, upper and lower Riemann integrals, Riemann integrals. Definition: refinement of a partition; common refinement of two partitions. Observation: lower (upper) sums increase (decrease) for a refinement. Theorem:
From playlist Course 7: (Rudin's) Principles of Mathematical Analysis
Slopes in eigenvarieties for definite unitary groups - Lynnelle Ye
Joint IAS/Princeton University Number Theory Seminar Topic: Slopes in eigenvarieties for definite unitary groups Speaker: Lynnelle Ye Affiliation: Harvard University Date: December 6, 2018 For more video please visit http://video.ias.edu
From playlist Mathematics
Hausdorff dimensions in p-adic analytic groups by Anitha Thillaisundaram
PROGRAM GROUP ALGEBRAS, REPRESENTATIONS AND COMPUTATION ORGANIZERS: Gurmeet Kaur Bakshi, Manoj Kumar and Pooja Singla DATE: 14 October 2019 to 23 October 2019 VENUE: Ramanujan Lecture Hall, ICTS Bangalore Determining explicit algebraic structures of semisimple group algebras is a fund
From playlist Group Algebras, Representations And Computation
Peter SCHOLZE (oct 2011) - 3/6 Perfectoid Spaces and the Weight-Monodromy Conjecture
We will introduce the notion of perfectoid spaces. The theory can be seen as a kind of rigid geometry of infinite type, and the most important feature is that the theories over (deeply ramified extensions of) Q_p and over F_p((t)) are equivalent, generalizing to the relative situation a th
From playlist Peter SCHOLZE (oct 2011) - Perfectoid Spaces and the Weight-Monodromy Conjecture
Xiaoqing Li - A standard zero free region for Rankin-Selberg L-functions on GL(n)
December 16, 2014 - Analysis, Spectra, and Number theory: A conference in honor of Peter Sarnak on his 61st birthday. In this talk, we will derive a standard zero free region for Rankin-Selberg L-function L(s, fxf) where f is a tempered Maass form on GL(n). The method is based on the the
From playlist Analysis, Spectra, and Number Theory - A Conference in Honor of Peter Sarnak on His 61st Birthday
Kannan Soundararajan - 4/4 L-functions
Kannan Soundararajan - L-functions
From playlist École d'été 2014 - Théorie analytique des nombres
The quantum query complexity of sorting under (...) - J. Roland - Main Conference - CEB T3 2017
Jérémie Roland (Brussels) / 15.12.2017 Title: The quantum query complexity of sorting under partial information Abstract: Sorting by comparison is probably one of the most fundamental tasks in algorithmics: given $n$ distinct numbers $x_1,x_2,...,x_n$, the task is to sort them by perfor
From playlist 2017 - T3 - Analysis in Quantum Information Theory - CEB Trimester
Around the Davenport-Heilbronn Function - Enrico Bombieri
Enrico Bombieri Institute for Advanced Study November 10, 2011 The Davenport-Heilbronn function (introduced by Titchmarsh) is a linear combination of the two L-functions with a complex character mod 5, with a functional equation of L-function type but for which the analogue of the Riemann
From playlist Mathematics
Advice for Research Mathematics | Compositional Inverses for polyseries | Wild Egg Maths
We discuss the role of composition and compositional inverses in the world of polyseries. Composition is an important kind of additional operation that is available for polynumbers, and the notion of a compositional inverse becomes available once we move further into polyseries. There i
From playlist Maxel inverses and orthogonal polynomials (non-Members)
CTNT 2020 - Ceresa class and hyperelliptic curves - Wanlin Li
The Connecticut Summer School in Number Theory (CTNT) is a summer school in number theory for advanced undergraduate and beginning graduate students, to be followed by a research conference. For more information and resources please visit: https://ctnt-summer.math.uconn.edu/
From playlist CTNT 2020 - Conference Videos