The Product of Strong Operator Measurable Functions is Strong Operator Measurable
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Publication:4039313
DOI10.2307/2159540zbMath0804.46047OpenAlexW4252617320MaRDI QIDQ4039313
Publication date: 8 August 1993
Full work available at URL: https://doi.org/10.2307/2159540
Vector-valued set functions, measures and integrals (28B05) Vector-valued measures and integration (46G10) Measures and integration on abstract linear spaces (46G12) Set functions and measures on topological spaces (regularity of measures, etc.) (28C15)
Related Items (5)
Remarks on measurability of operator-valued functions ⋮ Absolutely continuous and singular subspaces of a nonselfadjoint operator ⋮ The Feynman integral and Feynman's operational calculus: A heuristic and mathematical introduction ⋮ The Composition of Operator-Valued Measurable Functions is Measurable ⋮ A multiplicative ergodic theorem for von Neumann algebra valued cocycles
Cites Work
- A Banach algebra of Feynman integrable functionals with application to an integral equation formally equivalent to Schrödinger's equation
- A bounded convergence theorem for the Feynman integral
- Generalized Dyson series, generalized Feynman diagrams, the Feynman integral and Feynman’s operational calculus
- An Operator Calculus Having Applications in Quantum Electrodynamics
- The Cameron-Storvick function space integral: An L(Lp, Lp′) theory
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