Continuation of polynomials
In Mathematical, a continuation of polynomials is a Suite of Polynôme S indexed by the positive entireties 0,1,2,3,…, in which each index is equal to the degree of the corresponding polynomial. Various continuations of special polynomials are named; among those are:
Examples
- Students' rag procession S
- Factorial increasing
- Factorial decreasing
- Polynomials of Abel
- Polynomials of Beautiful
- Polynomials of Bernoulli
- Polynomials of Tchebychev
- Polynomials of Fibonacci
- Polynomials of Jacobi
- Polynomials of Gegenbauer
- Polynomials of Hermit
- Polynomials of Legendre
- Polynomials of Laguerre
- Polynomials of diffusion
- Polynomials of Touchard
Classes of continuations of polynomials
-
Continuations of polynomials of standard binomial
- orthogonal Polynomials
- Continuation of Sheffer
- generalized Polynomials of Call
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