Generalization of Wigner's unitary-antiunitary theorem for indefinite inner product spaces

DOI10.1007/s002200050799zbMath0957.46016arXivmath/0005166OpenAlexW3102386353MaRDI QIDQ1976017

Publication date: 9 March 2001

Published in: Communications in Mathematical Physics (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/math/0005166

zbMATH Keywords

quantum field theory divergence locality indefinite inner product spaces relativistic covariance Wigner's unitary-antiunitary theorem ray transformation

Mathematics Subject Classification ID

Axiomatic quantum field theory; operator algebras (81T05) Spaces with indefinite inner product (Kre?n spaces, Pontryagin spaces, etc.) (46C20) Applications of functional analysis in quantum physics (46N50) Linear operators on spaces with an indefinite metric (47B50)

Related Items (21)

Orthogonality preserving property for pairs of operators on Hilbert \(C^*\)-modules ⋮ Applying projective geometry to transformations on rank one idempotents ⋮ Maps preserving transition probability from pure product states to pure states ⋮ Orthogonality preserving pairs of operators on Hilbert C₀(Z)-modules ⋮ Transformations on the sets of states and density operators ⋮ Wigner's theorem on Grassmann spaces ⋮ Tingley's problem for \(p\)-Schatten von Neumann classes ⋮ Characterization of orthomaps on the Cayley plane ⋮ A geometric approach to Wigner‐type theorems ⋮ Surjective \(L^p\)-isometries on Grassmann spaces ⋮ Wigner-type theorem on transition probability preserving maps in semifinite factors ⋮ Generalized symmetry transformations on quaternionic indefinite inner product spaces: An extension of quaternionic version of Wigner's theorem ⋮ A Tingley's type problem in \(n\)-normed spaces ⋮ Transition probabilities of normal states determine the Jordan structure of a quantum system ⋮ Surjective \(L^2\)-isometries on the projection lattice ⋮ Transition probability preserving maps on a Grassmann space in a semifinite factor ⋮ Orthogonality preserving bijective maps on real and complex projective spaces ⋮ Representation of symmetry transformations on the sets of tripotents of spin and Cartan factors ⋮ Surjective \(L^p\)-isometries on rank 1 idempotents ⋮ Orthogonality preserving transformations on indefinite inner product spaces: Generalization of Uhlhorn's version of Wigner's theorem ⋮ Wigner symmetries and Gleason’s theorem ^*

This page was built for publication: Generalization of Wigner's unitary-antiunitary theorem for indefinite inner product spaces