Difference between revisions of "Hilbert Space"
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{{WikiEntry|key=Hilbert Space|qCode=190056}} is the inner product space that is metrically complete; a Banach space whose norm induces an inner product (follows the parallelogram identity). | {{WikiEntry|key=Hilbert Space|qCode=190056}} is the inner product space that is metrically complete; a Banach space whose norm induces an inner product (follows the parallelogram identity). | ||
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[[Category:Hilbert Space]] | [[Category:Hilbert Space]] | ||
[[Category:Linear Algebra]] | [[Category:Linear Algebra]] | ||
Latest revision as of 11:43, 7 May 2022
Hilbert Space(Q190056) is the inner product space that is metrically complete; a Banach space whose norm induces an inner product (follows the parallelogram identity).