topological vector spaces
locally convex topological vector spaces
topological vector space
locally convex topological vector space
Banach Spaces
Smith Spaces
Hilbert Spaces, Fréchet Spaces, Sobolev spaces, Lebesgue Spaces
Bornological Vector Spaces
Barrelled Vector Spaces
linear operator
bounded, unbounded, self-adjoint, compact, Fredholm
spectrum of an operator
operator algebras
Stone-Weierstrass theorem
spectral theory
spectral theorem
Gelfand duality
functional calculus
Riesz representation theorem
measure theory
Bases
Algebraic Theories in Functional Analysis
An Elementary Treatment of Hilbert Spaces
When are two Banach spaces isomorphic?
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A compact linear operator is said to be trace class if its trace exists.
Last revised on October 4, 2014 at 05:32:06. See the history of this page for a list of all contributions to it.