In mathematics, a semi-Hilbert space is a generalization of a Hilbert space in functional analysis, in which, roughly speaking, the inner product is required only to be positive semi-definite rather than positive definite, so that it gives rise to a seminorm rather than a vector space norm.
The quotient of this space by the kernel of this seminorm is also required to be a Hilbert space in the usual sense.
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Mod-01 Lec-21 Inner Product & Hilbert Space
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Linear Spaces Normed Spaces Hilbert Spaces Part2.wmv
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8.2. Reproducing Kernel Hilbert Space II: Theorems and Proofs
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This page was last edited on 12 August 2023, at 18:50