Add to ORKGWe present in this dissertation a conceptual review of differential geometry, where we are interested in defining vector fields which are one-parameter transformation generators, differential forms, symplectic manifolds, and fiber bundles. In addition, we detail the concept about De Rham's cohomology, which provides us a fundamental algebraic tool to analyze topological properties of manifolds. The combination of these concepts, which are the background material of our work, allows us to develop equivariant localization theories of integrals defined on classical phase spaces, which can also be a co-adjoint orbit. The localization is possible because of the Duistermaat-Heckman theorem, which allows us to write integrals on the whole space just as ...
Abstract. In this thesis, I illustrate a new approach to the Gromov-Witten theory through localizati...
The integral geometry methods are the techniques could be the more naturally applied to study of the...
It is shown, that the geometrical objects of Batalin-Vilkovisky formalism-- odd symplectic structure...
We present a brief introduction to the Berline-Vergne localization formula which expresses the integ...
Some recent developments in topological quantum field theory have focused on localization techniques...
Some recent developments in topological quantum field theory have focused on localization techniques...
We review localization techniques for functional integrals which have recently been used to perform ...
We study conditions under which an odd symmetry of the integrand leads to localization of the corres...
Equivariant localisation is based on exploiting certain symmetries of some systems, generally repres...
We introduce the notion of a {\vartheta}-summable Fredholm module over a locally convex dg algebra {...
These are lecture notes for two talks given at a seminar of the SFB-TR 12 "Sym-metries and Univ...
This research paper was completed and submitted at Nipissing University, and is made freely accessib...
Equivariant localization is a technique can be used to reduce the dimensionality of integral for th...
We propose a localization formula for the chiral de Rham complex generalizing the well-known localiz...
We develop a theory of equivariant factorization algebras on varieties with an action of a connected...
Abstract. In this thesis, I illustrate a new approach to the Gromov-Witten theory through localizati...
The integral geometry methods are the techniques could be the more naturally applied to study of the...
It is shown, that the geometrical objects of Batalin-Vilkovisky formalism-- odd symplectic structure...
We present a brief introduction to the Berline-Vergne localization formula which expresses the integ...
Some recent developments in topological quantum field theory have focused on localization techniques...
Some recent developments in topological quantum field theory have focused on localization techniques...
We review localization techniques for functional integrals which have recently been used to perform ...
We study conditions under which an odd symmetry of the integrand leads to localization of the corres...
Equivariant localisation is based on exploiting certain symmetries of some systems, generally repres...
We introduce the notion of a {\vartheta}-summable Fredholm module over a locally convex dg algebra {...
These are lecture notes for two talks given at a seminar of the SFB-TR 12 "Sym-metries and Univ...
This research paper was completed and submitted at Nipissing University, and is made freely accessib...
Equivariant localization is a technique can be used to reduce the dimensionality of integral for th...
We propose a localization formula for the chiral de Rham complex generalizing the well-known localiz...
We develop a theory of equivariant factorization algebras on varieties with an action of a connected...
Abstract. In this thesis, I illustrate a new approach to the Gromov-Witten theory through localizati...
The integral geometry methods are the techniques could be the more naturally applied to study of the...
It is shown, that the geometrical objects of Batalin-Vilkovisky formalism-- odd symplectic structure...