glaguerre.inner.products: Inner products of generalized Laguerre polynomials
In orthopolynom: Collection of Functions for Orthogonal and Orthonormal Polynomials
View source: R/glaguerre.inner.products.R
glaguerre.inner.products R Documentation
Inner products of generalized Laguerre polynomials
Description
This function returns a vector with n + 1 elements containing the inner product of
an order k generalized Laguerre polynomial, L_n^{≤ft( α \right)} ≤ft( x \right),
with itself (i.e. the norm squared) for orders k = 0,\;1,\; … ,\;n .
Usage
glaguerre.inner.products(n,alpha)
Arguments
n
integer highest polynomial order
alpha
polynomial parameter
Details
The formula used to compute the inner products is as follows.
h_n = ≤ft\langle {L_n^{≤ft( α \right)} |L_n^{≤ft( α \right)} } \right\rangle = \frac{{Γ ≤ft( {α + n + 1} \right)}}
{{n!}}.
Value
A vector with n + 1 elements
1
inner product of order 0 orthogonal polynomial
2
inner product of order 1 orthogonal polynomial
...
n+1
inner product of order n orthogonal polynomial
Author(s)
Frederick Novomestky fnovomes@poly.edu
References
Abramowitz, M. and I. A. Stegun, 1968. Handbook of Mathematical Functions with
Formulas, Graphs, and Mathematical Tables, Dover Publications, Inc., New York.
Courant, R., and D. Hilbert, 1989. Methods of Mathematical Physics,
John Wiley, New York, NY.
Szego, G., 1939. Orthogonal Polynomials, 23, American Mathematical Society
Colloquium Publications, Providence, RI.
Examples
###
### generate the inner products vector for the
### generalized Laguerre polynomial inner products of orders 0 to 10
### polynomial parameter is 1.
###
h <- glaguerre.inner.products( 10, 1 )
print( h )
orthopolynom documentation built on Oct. 3, 2022, 5:08 p.m.
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View source: R/glaguerre.inner.products.R
| glaguerre.inner.products | R Documentation |
Inner products of generalized Laguerre polynomials
Description
This function returns a vector with n + 1 elements containing the inner product of an order k generalized Laguerre polynomial, L_n^{≤ft( α \right)} ≤ft( x \right), with itself (i.e. the norm squared) for orders k = 0,\;1,\; … ,\;n .
Usage
glaguerre.inner.products(n,alpha)
Arguments
n |
integer highest polynomial order |
alpha |
polynomial parameter |
Details
The formula used to compute the inner products is as follows.
h_n = ≤ft\langle {L_n^{≤ft( α \right)} |L_n^{≤ft( α \right)} } \right\rangle = \frac{{Γ ≤ft( {α + n + 1} \right)}} {{n!}}.
Value
A vector with n + 1 elements
1 |
inner product of order 0 orthogonal polynomial |
2 |
inner product of order 1 orthogonal polynomial |
...
n+1 |
inner product of order n orthogonal polynomial |
Author(s)
Frederick Novomestky fnovomes@poly.edu
References
Abramowitz, M. and I. A. Stegun, 1968. Handbook of Mathematical Functions with Formulas, Graphs, and Mathematical Tables, Dover Publications, Inc., New York.
Courant, R., and D. Hilbert, 1989. Methods of Mathematical Physics, John Wiley, New York, NY.
Szego, G., 1939. Orthogonal Polynomials, 23, American Mathematical Society Colloquium Publications, Providence, RI.
Examples
### ### generate the inner products vector for the ### generalized Laguerre polynomial inner products of orders 0 to 10 ### polynomial parameter is 1. ### h <- glaguerre.inner.products( 10, 1 ) print( h )
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