Add to ORKGWe solve the massless Schwinger model exactly in Hamiltonian formalism on a circle. We construct physical states explicitly and discuss the role of the spectral flow and nonperturbative vacua. Different thermodynamical correlation functions are calculated and after performing the analytical continuation are compared with the corresponding expressions obtained for the Schwinger model on the torus in Euclidean Path Integral formalism obtained before
We examine the problem of the evaluation of both the propagator and of the partition function of a s...
The Witten-Veneziano relation between the topological susceptibility of pure gauge theories without...
For thermal equilibrium systems it is shown, how the Kubo-Martin-Schwinger boundary condition may be...
We solve the massless Schwinger model exactly in Hamiltonian formalism on a circle. We construct ph...
We solve the massless Schwinger model exactly in Hamiltonian formalism on a circle. We construct phy...
In the framework of the Euclidean path integral approach we derive the exact formula for the genera...
The classical and quantum aspects of the Schwinger model on the torus are considered. First we find ...
In these lectures we introduce the Feynman-Schwinger representation method for solving nonperturbati...
The path integral is a powerful tool for studying quantum mechanics because it has the merit of esta...
Thesis (S.B.)--Massachusetts Institute of Technology, Dept. of Physics, 2004.Includes bibliographica...
We present a complete construction of a Quantum Field Theory for the Massive Thirring model by follo...
This dissertation addresses a number of related questions concerning perturbative "path" integrals. ...
We present the first rigorous construction of the QFT Thirring model, for any value of the mass, in ...
We present a way for calculating the Lagrangian path integral measure directly from the Hamiltonian ...
The path integral approach to quantum mechanics provides a method of quantization of dynamical syste...
We examine the problem of the evaluation of both the propagator and of the partition function of a s...
The Witten-Veneziano relation between the topological susceptibility of pure gauge theories without...
For thermal equilibrium systems it is shown, how the Kubo-Martin-Schwinger boundary condition may be...
We solve the massless Schwinger model exactly in Hamiltonian formalism on a circle. We construct ph...
We solve the massless Schwinger model exactly in Hamiltonian formalism on a circle. We construct phy...
In the framework of the Euclidean path integral approach we derive the exact formula for the genera...
The classical and quantum aspects of the Schwinger model on the torus are considered. First we find ...
In these lectures we introduce the Feynman-Schwinger representation method for solving nonperturbati...
The path integral is a powerful tool for studying quantum mechanics because it has the merit of esta...
Thesis (S.B.)--Massachusetts Institute of Technology, Dept. of Physics, 2004.Includes bibliographica...
We present a complete construction of a Quantum Field Theory for the Massive Thirring model by follo...
This dissertation addresses a number of related questions concerning perturbative "path" integrals. ...
We present the first rigorous construction of the QFT Thirring model, for any value of the mass, in ...
We present a way for calculating the Lagrangian path integral measure directly from the Hamiltonian ...
The path integral approach to quantum mechanics provides a method of quantization of dynamical syste...
We examine the problem of the evaluation of both the propagator and of the partition function of a s...
The Witten-Veneziano relation between the topological susceptibility of pure gauge theories without...
For thermal equilibrium systems it is shown, how the Kubo-Martin-Schwinger boundary condition may be...