Pseudo Jacobi polynomials information

mathematics, the term Pseudo Jacobi polynomials was introduced by Lesky for one of three finite sequences of orthogonal polynomials y. Since they form an...

In mathematics, Jacobi polynomials (occasionally called hypergeometric polynomials) P n ( α , β ) ( x ) {\displaystyle P_{n}^{(\alpha ,\beta )}(x)} are...

so-called 'pseudo-Jacobi polynomials in Lesky's classification scheme. It seems more consistent to refer to them as Romanovski–Routh polynomials, by analogy...

polynomials Little q-Jacobi polynomials Pseudo Jacobi polynomials Sieved Jacobi polynomials Jacobi preconditioner Jacobi rotation Jacobi set Jacobi sum...

polynomials Heat polynomial — see caloric polynomial Heckman–Opdam polynomials Hermite polynomials Hurwitz polynomial Jack function Jacobi polynomials Koornwinder...

In mathematics, the Zernike polynomials are a sequence of polynomials that are orthogonal on the unit disk. Named after optical physicist Frits Zernike...

number of polynomials remains true for differential polynomials. In particular, greatest common divisors exist, and a ring of differential polynomials is a...

organizing orthogonal polynomials of hypergeometric or basic hypergeometric type into a hierarchy. For the classical orthogonal polynomials discussed in Andrews...

uniformly by polynomials, or certain other function spaces Approximation by polynomials: Linear approximation Bernstein polynomial — basis of polynomials useful...

Fermat primality test Pseudoprime Carmichael number Euler pseudoprime Euler–Jacobi pseudoprime Fibonacci pseudoprime Probable prime Baillie–PSW primality test...

number. Catalan pseudoprime Elliptic pseudoprime Euler pseudoprime Euler–Jacobi pseudoprime Fermat pseudoprime Frobenius pseudoprime Lucas pseudoprime Perrin...

roots, or when R(x, y) contains no odd powers of y or if the integral is pseudo-elliptic. However, with the appropriate reduction formula, every elliptic...

homogenous polynomials in the basis elements e a {\displaystyle e_{a}} of the Lie algebra. The Casimir invariants are the irreducible homogenous polynomials of...

relativity General relativity resources History of general relativity Hamilton–Jacobi–Einstein equation Mathematics of general relativity Numerical relativity...

of positive, negative and zero elements on its diagonal. According to Jacobi's criterion, a symmetric matrix is positive-definite if and only if all the...

quadratic polynomials with integer coefficients in terms of the logarithmic integral and the polynomial coefficients. No quadratic polynomial has been...

brackets of all elements of the Lie algebra. All Lie algebras satisfy the Jacobi identity. For the basis vectors, it can be written as [ T a , [ T b , T...

{\displaystyle AB} and B A {\displaystyle BA} have the same characteristic polynomials (hence the same eigenvalues). The determinant of the sum A + B {\displaystyle...

more refined notions of pseudoprimality, e.g. strong pseudoprimes or Euler–Jacobi pseudoprimes, for which there are no analogues of Carmichael numbers. This...

extension of polynomial interpolation Cubic interpolation Hermite interpolation Lagrange interpolation: interpolation using Lagrange polynomials Linear interpolation:...

problem functional analysis n/a 2120 Jacobian conjecture polynomials Carl Gustav Jacob Jacobi (by way of the Jacobian determinant) 2860 Jacobson's conjecture...

in the variables zi. Equivalently, they are locally uniform limits of polynomials; or locally square-integrable solutions to the n-dimensional Cauchy–Riemann...

equation can also be derived using a Lagrangian approach or the Hamilton–Jacobi equation (see below). The solution of the orbit equation is φ = ∫ d r ±...

\left({\frac {a}{N}}\right)=-1} (See Jacobi symbol) then N {\displaystyle N} is composite. If N = Fn > 3, then the above Jacobi symbol is always equal to −1 for...