Multivariate continuous distributions | Probability distributions | Geometric stable distributions
In the mathematical theory of probability, multivariate Laplace distributions are extensions of the Laplace distribution and the asymmetric Laplace distribution to multiple variables. The marginal distributions of symmetric multivariate Laplace distribution variables are Laplace distributions. The marginal distributions of asymmetric multivariate Laplace distribution variables are asymmetric Laplace distributions. (Wikipedia).
From playlist Probability Distributions
Differential Equations | The Laplace Transform of a Derivative
We establish a formula involving the Laplace transform of the derivative of a function. http://www.michael-penn.net http://www.randolphcollege.edu/mathematics/
From playlist The Laplace Transform
Differential Equations | Laplace Transform of a Piecewise Function
We find the Laplace transform of a piecewise function using the unit step function. http://www.michael-penn.net http://www.randolphcollege.edu/mathematics/
From playlist The Laplace Transform
C79 Linear properties of the Laplace transform
The linear properties of the Laplace transform.
From playlist Differential Equations
Partial Differential Equations Overview
Partial differential equations are the mathematical language we use to describe physical phenomena that vary in space and time. Examples include gravitation, electromagnetism, and fluid dynamics. @eigensteve on Twitter eigensteve.com databookuw.com %%% CHAPTERS %%% 0:00 Overview of Pa
From playlist Engineering Math: Vector Calculus and Partial Differential Equations
Andrew Ahn (Columbia) -- Airy edge fluctuations in random matrix sums
In this talk, we discuss a novel integrable probability approach to access edge fluctuations in sums of unitarily invariant Hermitian matrices. We focus on a particular regime where the number of summands is large (but fixed) under which the Airy point process appears. The approach is base
From playlist Columbia Probability Seminar
Differential Equations | Solving a system of differential equations with the Laplace transform.
We solve a nonhomogeneous system of first order linear differential equations using the Laplace transform. http://www.michael-penn.net http://www.randolphcollege.edu/mathematics/
From playlist Systems of Differential Equations
Finding the Laplace Transform of a Piecewise Function
Please Subscribe here, thank you!!! https://goo.gl/JQ8Nys Finding the Laplace Transform of a Piecewise Function
From playlist Differential Equations
ME565 Lecture 7: Canonical Linear PDEs: Wave equation, Heat equation, and Laplace's equation
ME565 Lecture 7 Engineering Mathematics at the University of Washington Canonical Linear PDEs: Wave equation, Heat equation, and Laplace's equation Notes: http://faculty.washington.edu/sbrunton/me565/pdf/L07.pdf Course Website: http://faculty.washington.edu/sbrunton/me565/ http://fac
From playlist Engineering Mathematics (UW ME564 and ME565)
The discrete Gaussian free field on a compact manifold by Alessandra Cipriani
PROGRAM :UNIVERSALITY IN RANDOM STRUCTURES: INTERFACES, MATRICES, SANDPILES ORGANIZERS :Arvind Ayyer, Riddhipratim Basu and Manjunath Krishnapur DATE & TIME :14 January 2019 to 08 February 2019 VENUE :Madhava Lecture Hall, ICTS, Bangalore The primary focus of this program will be on the
From playlist Universality in random structures: Interfaces, Matrices, Sandpiles - 2019
April 30, Mioara Joldes, Laboratoire d'analyse et d'architecture des systèmes (LAAS-CNRS) On Moment Problems with Holonomic Functions
From playlist Spring 2021 Online Kolchin Seminar in Differential Algebra
(ML 3.6) The Big Picture (part 2)
How the core concepts and methods in machine learning arise naturally in the course of solving the decision theory problem. A playlist of these Machine Learning videos is available here: http://www.youtube.com/my_playlists?p=D0F06AA0D2E8FFBA
From playlist Machine Learning
The Convolution of Two Functions | Definition & Properties
We can add two functions or multiply two functions pointwise. However, the convolution is a new operation on functions, a new way to take two functions and combine them. In this video we define the convolution of two functions, state and prove several of its nice algebraic properties, and
From playlist Fourier
Complex Stochastic Models and their Applications by Subhroshekhar Ghosh
PROGRAM: TOPICS IN HIGH DIMENSIONAL PROBABILITY ORGANIZERS: Anirban Basak (ICTS-TIFR, India) and Riddhipratim Basu (ICTS-TIFR, India) DATE & TIME: 02 January 2023 to 13 January 2023 VENUE: Ramanujan Lecture Hall This program will focus on several interconnected themes in modern probab
From playlist TOPICS IN HIGH DIMENSIONAL PROBABILITY
Elisabeth Gassiat - Manifold Learning with Noisy Data
It is a common idea that high dimensional data (or features) may lie on low dimensional support making learning easier. In this talk, I will present a very general set-up in which it is possible to recover low dimensional non-linear structures with noisy data, the noise being totally unkno
From playlist 8th edition of the Statistics & Computer Science Day for Data Science in Paris-Saclay, 9 March 2023
Finding the Laplace Transform of f(t) = 3 + 4t - 5t^2 + 7t^3
Please Subscribe here, thank you!!! https://goo.gl/JQ8Nys Finding the Laplace Transform of f(t) = 3 + 4t - 5t^2 + 7t^3
From playlist Differential Equations
Laplace transform of 1/sqrt(t), *SPEED RUN*
laplace transform of 1/sqrt(t), L{1/sqrt(t)}, laplace transform examples, laplace transform lessons, blackpenredpen
From playlist Properties of Laplace Transform (Nagle's Sect7.3)
Multivariable Calculus | More change of variables in multiple integrals.
We give a few example of using the change of variable technique to evaluate some double integrals. http://www.michael-penn.net http://www.randolphcollege.edu/mathematics/
From playlist Multivariable Calculus | Multiple Integrals
Suppose that a function u equals to its average value on every ball and every sphere, what can we say about u? It turns out that u has to solve Laplace’s equation! Conversely, if u solves Laplace’s equation, then u must satisfy the above mean-value property. In this video, I state and pro
From playlist Partial Differential Equations