An elementary proof for the non-bijective version of Wigner's theorem |
| |
| Institution: | 1. Department of Analysis, Bolyai Institute, University of Szeged, H-6720 Szeged, Aradi vértanúk tere 1, Hungary;2. MTA-DE “Lendület” Functional Analysis Research Group, Institute of Mathematics, University of Debrecen, H-4010 Debrecen, P.O. Box 12, Hungary |
| |
| Abstract: | The non-bijective version of Wigner's theorem states that a map which is defined on the set of self-adjoint, rank-one projections (or pure states) of a complex Hilbert space and which preserves the transition probability between any two elements, is induced by a linear or antilinear isometry. We present a completely new, elementary and very short proof of this famous theorem which is very important in quantum mechanics. We do not assume bijectivity of the mapping or separability of the underlying space like in many other proofs. |
| |
| Keywords: | Wigner's theorem Quantum mechanical symmetry transformation Linear and antilinear isometries Resolving set |
| 本文献已被 ScienceDirect 等数据库收录! |
|
