About the Book
Please note that the content of this book primarily consists of articles available from Wikipedia or other free sources online. Pages: 115. Chapters: Hamiltonian, Linear subspace, Cauchy-Schwarz inequality, Cholesky decomposition, Hilbert space, Spectral theory of ordinary differential equations, Von Neumann algebra, Hardy space, Self-adjoint operator, Compact operator on Hilbert space, Unbounded operator, Sturm-Liouville theory, Extensions of symmetric operators, Stinespring factorization theorem, Invariant subspace, Invariant subspace problem, Nuclear space, Riesz-Thorin theorem, Choi's theorem on completely positive maps, Indefinite inner product space, Polar decomposition, Discrete Laplace operator, Eigenvalues and eigenvectors of the second derivative, Tomita-Takesaki theory, Trace class, Crossed product, Hilbert C*-module, Positive definite kernel, Operator norm, Topological tensor product, Subfactor, Kuiper's theorem, Subnormal operator, Ornstein-Uhlenbeck operator, Wold decomposition, Naimark's dilation theorem, Unitary operator, Affiliated operator, Kronecker sum of discrete Laplacians, Positive definite function on a group, Friedrichs extension, Transfer operator, Fuglede's theorem, Dixmier trace, Numerical range, Approximation property, Hermitian adjoint, Gelfand-Naimark theorem, Von Neumann bicommutant theorem, Dissipative operator, Integration by parts operator, Reflexive operator algebra, Hypercyclic operator, Nuclear operator, Closed operator, Finite rank operator, Densely-defined operator, Singular value, Quasinormal operator, Banach-Stone theorem, Partial isometry, Cotlar-Stein lemma, Hilbert-Schmidt integral operator, Sz.-Nagy's dilation theorem, Krylov subspace, Composition operator, Stein-Stromberg theorem, Bounded inverse theorem, Abstract index group, Contraction, Controlled invariant subspace, Nest algebra, Resolvent set, Pseudo-monotone operator, Nemytskii operator, Hilbert-Schmidt theorem, Calkin algebra, De Branges space, Multipliers an...
