Lauricella's theorem

In the theory of orthogonal functions, Lauricella's theorem provides a condition for checking the closure of a set of orthogonal functions, namely:

Theorem. A necessary and sufficient condition that a normal orthogonal set $\{u_k\}$ be closed is that the formal series for each function of a known closed normal orthogonal set $\{v_k\}$ in terms of $\{u_k\}$ converge in the mean to that function.

The theorem was proved by Giuseppe Lauricella in 1912.

References

G. Lauricella: Sulla chiusura dei sistemi di funzioni ortogonali, Rendiconti dei Lincei, Series 5, Vol. 21 (1912), pp. 675–85.

This article is issued from Wikipedia - version of the 12/9/2014. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.