Uniformization theorem

Uniform Probability Distribution Examples

Overview and definition of a uniform probability distribution. Worked examples of how to find probabilities.

From playlist Probability Distributions

Math 131 111416 Sequences of Functions: Pointwise and Uniform Convergence

Definition of pointwise convergence. Examples, nonexamples. Pointwise convergence does not preserve continuity, differentiability, or integrability, or commute with differentiation or integration. Uniform convergence. Cauchy criterion for uniform convergence. Weierstrass M-test to imp

From playlist Course 7: (Rudin's) Principles of Mathematical Analysis

Math 131 Fall 2018 111618 Uniform convergence, continued

Review of uniform convergence: definition and Cauchy criterion. Rephrasal of uniform convergence. Weierstrass M-test for uniform convergence of a series. Uniform convergence and continuous functions. Pointwise convergence of a decreasing sequence of continuous functions on a compact se

From playlist Course 7: (Rudin's) Principles of Mathematical Analysis (Fall 2018)

The Difference Between Pointwise Convergence and Uniform Convergence

Please Subscribe here, thank you!!! https://goo.gl/JQ8Nys The Difference Between Pointwise Convergence and Uniform Convergence

From playlist Advanced Calculus

Central Limit Theorem: Verification using Uniform Distribution with samples in the range of 0 and 10

This script is to verify the Central Limit Theorem in probability theory or statistics. The Central Limit Theorem states that, regardless of the distribution of the population, the sampling distribution of the sample means, assuming all samples are identical in size, will approach a norma

From playlist Probability Theory/Statistics

Math 131 Spring 2022 041122 Uniform Convergence and Continuity

Exercise: the limit of uniformly convergent continuous functions is continuous. Theorem: generalization. Theorem: pointwise convergence on a compact set + extra conditions guarantees uniform convergence. Digression: supremum norm metric on bounded continuous functions. Definitions.

From playlist Math 131 Spring 2022 Principles of Mathematical Analysis (Rudin)

Convex Norms and Unique Best Approximations

In this video, we explore what it means for a norm to be convex. In particular we will look at how convex norms lead to unique best approximations. For example, for any continuous function there will be a unique polynomial which gives the best approximation over a given interval. Chapte

From playlist Approximation Theory

First theorem of isomorphisms

Now that we know what quotient groups, a kernel, and normal subgroups are, we can look at the first isomorphism theorem. It states that the quotient group created by the kernel of a homomorphism is isomorphic to the (second) group in the homomorphism.

From playlist Abstract algebra

A uniform Bogomolov type of theorem for curves over global fields - Xinyi Yuan

Joint IAS/Princeton University Number Theory Seminar Topic: A uniform Bogomolov type of theorem for curves over global fields Speaker: Xinyi Yuan Affiliation: Beijing International Center for Mathematical Research Date: September 15, 2021 In the recent breakthrough on the uniform Mordel

From playlist Mathematics

Testing Correlations and Inverse Theorems - Hamed Hatami

Hamed Hatami Institute for Advanced Study/Princeton University February 23, 2010 The uniformity norms are defined in different contexts in order to distinguish the ``typical'' random functions, from the functions that contain certain structures. A typical random function has small uniform

From playlist Mathematics

Math 101 Introduction to Analysis 120415: Compactness and Continuity

Compactness and Continuity: recall continuous image of compact set is compact; alternate (third) proof of extreme value theorem; motivation for uniform continuity; definition of uniform continuity; continuous on a compact set implies uniformly continuous

From playlist Course 6: Introduction to Analysis

Applications of analysis to fractional differential equations

I show how to apply theorems from analysis to fractional differential equations. The ideas feature the Arzela-Ascoli theorem and Weierstrass' approximation theorem, leading to a new approach for solvability of certain fractional differential equations. When do fractional differential equ

From playlist Mathematical analysis and applications

Introduction to uniform flow

Advanced Hydraulics by Dr. Suresh A Kartha,Department of Civil Engineering,IIT Guwahati.For more details on NPTEL visit http://nptel.iitm.ac.in

From playlist IIT Guwahati: Advanced Hydraulics | CosmoLearning.org Civil Engineering

Lecture 24: Uniform Convergence, the Weierstrass M-Test, and Interchanging Limits

MIT 18.100A Real Analysis, Fall 2020 Instructor: Dr. Casey Rodriguez View the complete course: http://ocw.mit.edu/courses/18-100a-real-analysis-fall-2020/ YouTube Playlist: https://www.youtube.com/playlist?list=PLUl4u3cNGP61O7HkcF7UImpM0cR_L2gSw We prove the powerful Weierstrass M-test, a

From playlist MIT 18.100A Real Analysis, Fall 2020

P. Burkhardt-Pointwise lower scalar curvature bounds for C0 metrics via regularizing Ricci flow (vt)

We propose a class of local definitions of weak lower scalar curvature bounds that is well defined for C0 metrics. We show the following: that our definitions are stable under greater-than-second-order perturbation of the metric, that there exists a reasonable notion of a Ricci flow starti

From playlist Ecole d'été 2021 - Curvature Constraints and Spaces of Metrics

P. Burkhardt-Pointwise lower scalar curvature bounds for C0 metrics via regularizing Ricci flow

We propose a class of local definitions of weak lower scalar curvature bounds that is well defined for C0 metrics. We show the following: that our definitions are stable under greater-than-second-order perturbation of the metric, that there exists a reasonable notion of a Ricci flow starti

From playlist Ecole d'été 2021 - Curvature Constraints and Spaces of Metrics

An average-case depth hierarchy theorem for Boolean - Li-Yang Tan

Computer Science/Discrete Mathematics Seminar I Topic: An average-case depth hierarchy theorem for Boolean circuits I Speaker: Li-Yang Tan Affiliation: Toyota Technological Institute, Chicago Date: Monday, April 4 We prove an average-case depth hierarchy theorem for Boolean circuits

From playlist Mathematics

Interpreting Polynomial Structure Analytically - Julia Wolf

Julia Wolf Rutgers, The State University of New Jersey February 8, 2010 I will be describing recent joint efforts with Tim Gowers to decompose a bounded function into a sum of polynomially structured phases and a uniform error, based on the recent inverse theorem for the Uk norms on Fpn b

From playlist Mathematics

Math 131 Fall 2018 101018 Continuity and Compactness

Definition: bounded function. Continuous image of compact set is compact. Continuous image in Euclidean space of compact set is bounded. Extreme Value Theorem. Continuous bijection on compact set has continuous inverse. Definition of uniform continuity. Continuous on compact set impl

From playlist Course 7: (Rudin's) Principles of Mathematical Analysis (Fall 2018)

Paula Burkhardt-Guim - Lower scalar curvature bounds for $C^0$ metrics: a Ricci flow approach

We describe some recent work that has been done to generalize the notion of lower scalar curvature bounds to C^0 metrics, including a localized Ricci flow approach. In particular, we show the following: that there is a Ricci flow definition which is stable under greater-than-second-order p

From playlist Not Only Scalar Curvature Seminar