The integral theorem for supersymmetric invariants
- 1 May 1989
- journal article
- Published by AIP Publishing in Journal of Mathematical Physics
- Vol. 30 (5) , 981-992
- https://doi.org/10.1063/1.528343
Abstract
A supersymmetric integral theorem that extends results of Parisi, Sourlas, Efetov, Wegner, and others is rigorously proved. In particular, arbitrary generators are allowed in the integrand (instead of canonical ones) and the invariance condition is very much relaxed. The connection with Cauchy’s integral formula is made transparent. In passing, the unitary Lie supergroup is studied by using elementary methods. Applications in the theory of disordered systems are discussed.Keywords
This publication has 7 references indexed in Scilit:
- The supersymmetric transfer matrix for linear chains with nondiagonal disorderJournal of Statistical Physics, 1988
- Analyticity of density of states in a gauge-invariant model for disordered electronic systemsJournal of Statistical Physics, 1987
- Anderson localization and non-linear sigma model with graded symmetryNuclear Physics B, 1986
- Algebraic derivation of symmetry relations for disordered electronic systemsZeitschrift für Physik B Condensed Matter, 1983
- Supersymmetry and theory of disordered metalsAdvances in Physics, 1983
- Random Magnetic Fields, Supersymmetry, and Negative DimensionsPhysical Review Letters, 1979
- Elementary construction of graded Lie groupsJournal of Mathematical Physics, 1978