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Strong Convergence

Strong convergence is the type of convergence usually associated with convergence of a Sequence. More formally, a Sequence $\{x_n\}$ of Vectors in a normed space (and, in particular, in an Inner Product Space $E$ )is called convergent to a Vector $x$ in $E$ if

\begin{displaymath}
\Vert x_n-x\Vert\rightarrow 0\quad \hbox{as }n\rightarrow\infty.
\end{displaymath}

See also Convergent Sequence, Inner Product Space, Weak Convergence




© 1996-9 Eric W. Weisstein
1999-05-26