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Hilbert projection theorem - Wikipedia, the free encyclopedia

Hilbert projection theorem

From Wikipedia, the free encyclopedia

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The Hilbert Projection Theorem is a famous result of convex analysis that says that for every point $x$ in a Hilbert space $H$ and every closed subspace $M \subset H$ , there exists a unique point $m \in M$ for which $\lVert x - m \rVert$ is minimized over $M$ . A necessary and sufficient condition for $m$ is that the vector $x - m$ be orthogonal to $M$ .

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Retrieved from "http://en.wikipedia.org../../../h/i/l/Hilbert_projection_theorem.html"

Categories: Convex analysis | Mathematics stubs

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