Orthogonal polynomials | Polynomials | Special hypergeometric functions
In mathematics, the Romanovski polynomials are one of three finite subsets of real orthogonal polynomials discovered by Vsevolod Romanovsky (Romanovski in French transcription) within the context of probability distribution functions in statistics. They form an orthogonal subset of a more general family of little-known Routh polynomials introduced by Edward John Routh in 1884. The term Romanovski polynomials was put forward by Raposo, with reference to the so-called 'pseudo-Jacobi polynomials in Lesky's classification scheme. It seems more consistent to refer to them as Romanovski–Routh polynomials, by analogy with the terms Romanovski–Bessel and Romanovski–Jacobi used by Lesky for two other sets of orthogonal polynomials. In some contrast to the standard classical orthogonal polynomials, the polynomials under consideration differ, in so far as for arbitrary parameters only a finite number of them are orthogonal, as discussed in more detail below. (Wikipedia).
Valery Romanovski, University of Maribor We discuss two problems related to the theory of polynomial plane differential systems. The first one is the problem of local integrability, that is, the problem of finding local analytic integrals in a neighborhood of singular points of system (1)
From playlist Spring 2020 Kolchin Seminar in Differential Algebra
Take a Tour of a Soviet-Era Ghost Town at the Edge of the World | Short Film Showcase
Located just 800 miles from the North Pole on the island of Spitsbergen, the Soviet-era ghosttown of Pyramiden is one of the northernmost permanent settlements in the world. The site was first developed as a mining village in 1936, after the Soviets acquired the rights to mine the local co
From playlist Newest Clips | National Geographic
Complex Brunn–Minkowski theory and positivity of vector bundles – Bo Berndtsson – ICM2018
Geometry | Analysis and Operator Algebras Invited Lecture 5.2 | 8.2 Complex Brunn–Minkowski theory and positivity of vector bundles Bo Berndtsson Abstract: This is a survey of results on positivity of vector bundles, inspired by the Brunn–Minkowski and Prékopa theorems. Applications to c
From playlist Geometry
Poland's strategy of the Intermarium
In the 20th century, #Polish lawmakers sought to unify Eastern #Europe into a massive land power to ensure their independence. For more, check out the channel: Good Times Bad Times https://www.youtube.com/channel/UCXW9oUSOwt7mcTT5d_5hQcA Support CaspianReport ✔ YouTube membership ► ht
From playlist History
SHOP TIPS #383 How to Nickel Plate tubalcain electroplating
In this video, I show how to electroplate using the COSWELL plating kit donated by Kevin. Watch my almost 900 other shop videos. Leave a comment & subscribe.
From playlist #4 MACHINE SHOP TIPS tubalcain playlist #301 thru #400
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
The Bernstein Sato polynomial: Introduction
This is the first of three talks about the Bernstein-Sato polynomial. The second talk should appear at https://youtu.be/FAKzbvDm-w0 on Dec 22 5:00am PST We define the Bernstein-Sato polynomial of a polynomial in several complex variables, and show how it can be used to analytically con
From playlist Commutative algebra
Earth System Science 21. On Thin Ice. Lecture 10. Permafrost and the Carbon Cycle
UCI ESS 21: On Thin Ice (Winter 2014) Lec 10. On Thin Ice -- Permafrost and the Carbon Cycle -- View the complete course: http://ocw.uci.edu/courses/ess_21_on_thin_ice__climate_change_and_the_cryosphere.html Instructor: Julie Ferguson, Ph.D. License: Creative Commons CC-BY-SA Terms of Use
From playlist Earth System Science 21: On Thin Ice: Climate Change and the Cryosphere
Emanuel Milman: 1 D Localization part 1
The lecture was held within the framework of the Hausdorff Trimester Program: Optimal Transportation and the Workshop: Winter School & Workshop: New developments in Optimal Transport, Geometry and Analysis
From playlist HIM Lectures 2015
How to reorder and classify a polynomial based on it's degree and number of terms
👉 Learn how to classify polynomials. A polynomial is an expression of the sums/differences of two or more terms having different integer exponents of the same variable. A polynomial can be classified in two ways: by the number of terms and by its degree. A monomial is an expression of 1
From playlist Classify Polynomials | Equations
Eddie Chumney in Finland 2012-05-06 PART 8/8
Eddie Chumney is one of the leading Torah teachers in the Hebraic Roots community of Messianic bible-believers today. We had the privilege and honor to have him as a guest in Finland in May 2012, and we organized a few meetings for him to speak in about Hebraic Roots of Christianity. I wil
From playlist Eddie Chumney @ Finland/Suomi @ 2012/5
Weekly Space Hangout Oct 14, 2016 - Europe Crashes the Mars Party
We record the Weekly Space Hangout every Friday at 12:00 pm Pacific / 3:00 pm Eastern. You can watch us live on Universe Today or the Universe Today YouTube page. This week's special guest: Tyler Finlay of the Sally Ride EarthKAM project.
From playlist Weekly Space Hangout
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?
Labeling a polynomial based on the degree and number of terms
👉 Learn how to classify polynomials. A polynomial is an expression of the sums/differences of two or more terms having different integer exponents of the same variable. A polynomial can be classified in two ways: by the number of terms and by its degree. A monomial is an expression of 1
From playlist Classify Polynomials | Equations
Classifying a polynomial by degree and number of terms
👉 Learn how to classify polynomials. A polynomial is an expression of the sums/differences of two or more terms having different interger exponents of the same variable. A polynomial can be classified in two ways: by the number of terms and by its degree. A monomial is an expression of 1
From playlist Classify Polynomials
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
Summary for classifying polynomials
👉 Learn how to classify polynomials. A polynomial is an expression of the sums/differences of two or more terms having different interger exponents of the same variable. A polynomial can be classified in two ways: by the number of terms and by its degree. A monomial is an expression of 1
From playlist Classify Polynomials
👉 Learn how to classify polynomials. A polynomial is an expression of the sums/differences of two or more terms having different interger exponents of the same variable. A polynomial can be classified in two ways: by the number of terms and by its degree. A monomial is an expression of 1
From playlist Classify Polynomials
Classify a polynomial and determine degree and leading coefficient
👉 Learn how to classify polynomials. A polynomial is an expression of the sums/differences of two or more terms having different integer exponents of the same variable. A polynomial can be classified in two ways: by the number of terms and by its degree. A monomial is an expression of 1
From playlist Classify Polynomials | Equations
On the symmetries of and equivalence test for design polynomials by Nikhil Gupta
Discussion Meeting Workshop on Algebraic Complexity Theory  ORGANIZERS Prahladh Harsha, Ramprasad Saptharishi and Srikanth Srinivasan DATE & TIME 25 March 2019 to 29 March 2019 VENUE Madhava Lecture Hall, ICTS Bangalore Algebraic complexity aims at understanding the computationa
From playlist Workshop on Algebraic Complexity Theory 2019