Unity-resolving states and generalised Golden-Thompson bounds on partition functions
- 1 April 1980
- journal article
- Published by IOP Publishing in Journal of Physics A: General Physics
- Vol. 13 (4) , 1311-1324
- https://doi.org/10.1088/0305-4470/13/4/023
Abstract
It is shown that certain sets of normalised unity-resolving (e.g. coherent) states in Hilbert space serve to generate upper bounds on the partition function of a given Hamiltonian in that space. These bounds may be viewed as generalisations of bounds derived previously by Golden, Thompson, Hepp and Lieb (see Phys. Rev. A, vol.8, p.2517, 1973). The new bounds are compared to the original Golden-Thompson bound by proving several theorems and by computing explicit examples.Keywords
This publication has 17 references indexed in Scilit:
- Partition function for an electron in a random potentialJournal of Statistical Physics, 1977
- On the Peierls transition in exactly soluble modelsThe European Physical Journal A, 1974
- Convex trace functions and the Wigner-Yanase-Dyson conjectureAdvances in Mathematics, 1973
- Equilibrium Statistical Mechanics of Matter Interacting with the Quantized Radiation FieldPhysical Review A, 1973
- Note on trace inequalitiesCommunications in Mathematical Physics, 1972
- Density Operators and Quasiprobability DistributionsPhysical Review B, 1969
- Ordered Expansions in Boson Amplitude OperatorsPhysical Review B, 1969
- Lower Bounds for the Helmholtz FunctionPhysical Review B, 1965
- Continuous-Representation Theory. II. Generalized Relation between Quantum and Classical DynamicsJournal of Mathematical Physics, 1963
- Continuous-Representation Theory. I. Postulates of Continuous-Representation TheoryJournal of Mathematical Physics, 1963