Definition:f: Difference between revisions

The LaTeX DLMF and DRMF macro \f represents Function.

This macro is in the category of polynomials.

In math mode, this macro can be called in the following ways:

\f{f} produces ${\displaystyle{\displaystyle{\displaystyle{f}}}}$

\f{f}@{x} produces ${\displaystyle{\displaystyle{\displaystyle{f}\!\left(x\right)}}}$

These are defined by

${\displaystyle{\displaystyle S^{(\alpha,\beta)}_{2m}\left(x\right):={\rm const}\times P^{(\alpha,\beta)}_{m}\left(2x^{2}-1\right),}}$

${\displaystyle{\displaystyle S^{(\alpha,\beta)}_{2m+1}\left(x\right):={\rm const}\times x\,P^{(\alpha,\beta+1)}_{m}\left(2x^{2}-1\right).}}$

Then for ${\displaystyle{\displaystyle\alpha,\beta>-1}}$, we have the orthogonality relation

${\displaystyle{\displaystyle\int_{-1}^{1}S^{(\alpha,\beta)}_{m}\left(x\right)\,S^{(\alpha,\beta)}_{n}\left(x\right)\,|x|^{2\beta+1}(1-x^{2})^{\alpha}\,dx=0,}}$

for ${\displaystyle{\displaystyle m\neq n}}$.

Symbols List

${\displaystyle{\displaystyle{\displaystyle{f}}}}$ : function : http://drmf.wmflabs.org/wiki/Definition:f
${\displaystyle{\displaystyle{\displaystyle S^{(\alpha,\beta)}_{n}}}}$ : Generalized Gegenbauer polynomial : http://drmf.wmflabs.org/wiki/Definition:GenGegenbauer
${\displaystyle{\displaystyle{\displaystyle P^{(\alpha,\beta)}_{n}}}}$ : Jacobi polynomial : http://dlmf.nist.gov/18.3#T1.t1.r3
${\displaystyle{\displaystyle{\displaystyle\int}}}$ : integral : http://dlmf.nist.gov/1.4#iv