Gelfand representation
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- MTH 510/615: Operator Theory and Operator Algebras Semester 2, 2018-19
- Elements in a Commutative Banach Algebra Determining the Norm Topology
- Formal Topology and Constructive Mathematics: the Gelfand and Stone-Yosida Representation Theorems1
- The Basics of C∗-Algebras
- C∗ C ∗ -Algebras and the Gelfand-Naimark Theorems
- C -Algebraic Methods in Spectral Theory
- Abstracts: Plenary Speakers
- Banach Manifolds and the Gelfand Representation Theorem
- Functional Analysis
- Tarasov V. Quantum Mechanics of Non-Hamiltonian and Dissipative
- Acta Scientiarum Mathematicarum
- 9. C∗ -Algebras We Are Especially Interested in the Banach Algebra B(H)
- Entanglement-Breaking Channels with General Outcome Operator Algebras
- Noncommmutative Gelfand Duality and Applications I: the Existence of Invariant Subspaces
- Operator Algebras and Unbounded Self-Adjoint Operators
- Karl Heinrich Hofmann Gelfand-Naimark Theorems for Non-Commutative Topological Rings
- Hunt Processes and Analytic Potential Theory on Rigged Hilbert Spaces Annales De L’I
- The Gelfand Spectrum of a Noncommutative C*-Algebra: a Topos-Theoretic Approach