Orthogonal polynomials | Q-analogs | Special hypergeometric functions
In mathematics, the q-Charlier polynomials are a family of basic hypergeometric orthogonal polynomials in the basic Askey scheme. Roelof Koekoek, Peter A. Lesky, and René F. Swarttouw give a detailed list of their properties. (Wikipedia).
From playlist Contributed talks One World Symposium 2020
Classify a polynomial then determining if it is a polynomial or not
👉 Learn how to determine whether a given equation is a polynomial or not. A polynomial function or equation is the sum of one or more terms where each term is either a number, or a number times the independent variable raised to a positive integer exponent. A polynomial equation of functio
From playlist Is it a polynomial or not?
Determining if a equation is a polynomial or not
👉 Learn how to determine whether a given equation is a polynomial or not. A polynomial function or equation is the sum of one or more terms where each term is either a number, or a number times the independent variable raised to a positive integer exponent. A polynomial equation of functio
From playlist Is it a polynomial or not?
Is it a polynomial with two variables
👉 Learn how to determine whether a given equation is a polynomial or not. A polynomial function or equation is the sum of one or more terms where each term is either a number, or a number times the independent variable raised to a positive integer exponent. A polynomial equation of functio
From playlist Is it a polynomial or not?
Determining if a function is a polynomial or not then determine degree and LC
👉 Learn how to determine whether a given equation is a polynomial or not. A polynomial function or equation is the sum of one or more terms where each term is either a number, or a number times the independent variable raised to a positive integer exponent. A polynomial equation of functio
From playlist Is it a polynomial or not?
BEGINNER FLOURISH TUTORIAL // 3pac Shakur
Thanks for tuning in! 3pac Shakur is an original flourish which looks fancy and is really easy to learn! If you're curious about cardistry or simply want to learn a neat cut you can do with your deck of cards, than I'm sure you'll love this. Let me know if you found this helpful! Intro
From playlist Tutorials
Giovanni Peccati: Some applications of variational techniques in stochastic geometry I
Some variance estimates on the Poisson space, Part I I will introduce some basic tools of stochastic analysis on the Poisson space, and describe how they can be used to develop variational inequalities for assessing the magnitude of variances of geometric quantities. Particular attention
From playlist Winter School on the Interplay between High-Dimensional Geometry and Probability
Arno Kuijlaars: Tilings of a hexagon and non-hermitian orthogonality on a contour
I will discuss polynomials $P_{N}$ of degree $N$ that satisfy non-Hermitian orthogonality conditions with respect to the weight $\frac{\left ( z+1 \right )^{N}\left ( z+a \right )^{N}}{z^{2N}}$ on a contour in the complex plane going around 0. These polynomials reduce to Jacobi polynomials
From playlist Probability and Statistics
How to determine function is a polynomial or not
👉 Learn how to classify polynomials based on the number of terms as well as the leading coefficient and the degree. When we are classifying polynomials by the number of terms we will focus on monomials, binomials, and trinomials, whereas classifying polynomials by the degree will focus on
From playlist Is it a polynomial or not?
What is the definition of a monomial and polynomials with examples
👉 Learn how to classify polynomials based on the number of terms as well as the leading coefficient and the degree. When we are classifying polynomials by the number of terms we will focus on monomials, binomials, and trinomials, whereas classifying polynomials by the degree will focus on
From playlist Classify Polynomials
Learn how to identify if a function is a polynomial and identify the degree and LC
👉 Learn how to determine whether a given equation is a polynomial or not. A polynomial function or equation is the sum of one or more terms where each term is either a number, or a number times the independent variable raised to a positive integer exponent. A polynomial equation of functio
From playlist Is it a polynomial or not?
Giovanni Peccati: Some applications of variational techniques in stochastic geometry II
Some variance estimates on the Poisson space, Part II I will introduce the notion of second-order Poincaré inequalities on the Poisson space and describe their use in a geometric context - with specific emphasis on quantitative CLTs for strongly stabilizing functionals, and on fourth-mome
From playlist Winter School on the Interplay between High-Dimensional Geometry and Probability
Don't forget to hit the Notification button so you never miss a video! What I shoot with: 5D mark iii: http://amzn.to/2l20aJs Lens: 24mm fixed 1.4 http://amzn.to/2lzpIeB Lens: 70-200mm 2.8 http://amzn.to/2kQAJZm VLOG CAMERA : Canon G7X http://amzn.to/2kQQwqK RODE Mic: http://amzn.to/2kB3
From playlist Tutorials
Is This the Face of Mary Magdalene? | National Geographic
French forensic experts, artist Philippe Froesh and anthropologist Philippe Charlier, used hundreds of photographs to render the 3D image of what could possibly be Mary Magdalene. ➡ Subscribe: http://bit.ly/NatGeoSubscribe About National Geographic: National Geographic is the world's pre
From playlist News | National Geographic
Émilie Charlier: Logic, decidability and numeration systems - Lecture 1
Abstract: The theorem of Büchi-Bruyère states that a subset of Nd is b-recognizable if and only if it is b-definable. As a corollary, the first-order theory of (N,+,Vb) is decidable (where Vb(n) is the largest power of the base b dividing n). This classical result is a powerful tool in ord
From playlist Mathematical Aspects of Computer Science
Jeremy Quastel (Toronto) -- Convergence of finite range exclusions to the KPZ fixed point
We will describe a method of comparison with TASEP which proves that both the KPZ equation and finite range exclusion models converge to the KPZ fixed point. For the KPZ equation and the nearest neighbour exclusion, the initial data is allowed to be a continuous function plus a finite num
From playlist Columbia Probability Seminar
What is the definition of a polynomial with examples and non examples
👉 Learn how to classify polynomials based on the number of terms as well as the leading coefficient and the degree. When we are classifying polynomials by the number of terms we will focus on monomials, binomials, and trinomials, whereas classifying polynomials by the degree will focus on
From playlist Classify Polynomials
Factoring a quadratic with a not equal to one by two different methods
we find two factors of the product of the constant term (the term with no variable) and the coefficient of the squared variable whose sum gives the linear term. These factors are now placed in separate brackets with x to form the factors of the quadratic equation. There are other methods
From playlist Solve Quadratic Equations by Factoring | ax^2+bx+c
Kernel norms on normal cycles and the KeOps library for (...) - Glaunès - Workshop 2 - CEB T1 2019
Joan Glaunès (Univ. Paris Descartes) / 14.03.2019 Kernel norms on normal cycles and the KeOps library for linear memory reductions over datasets. In the first part of this talk I will present a model for writing data fidelity terms for shape registration algorithms. This model is based
From playlist 2019 - T1 - The Mathematics of Imaging
What is the multiplicity of a zero?
👉 Learn about zeros and multiplicity. The zeroes of a polynomial expression are the values of x for which the graph of the function crosses the x-axis. They are the values of the variable for which the polynomial equals 0. The multiplicity of a zero of a polynomial expression is the number
From playlist Zeros and Multiplicity of Polynomials | Learn About