Add to ORKGWe study the geometry of the Lagrangian Batalin--Vilkovisky theory on an antisymplectic manifold. We show that gauge symmetries of the BV-theory are essentially the symmetries of an even symplectic structure on the stationary surface of the master action
The Faddeev-Popov gauge fixing in Yang-Mills theory is interpreted as equivariant localization. It i...
This short note is closely related to Sen-Zwiebach paper on gauge transformations in Batali...
Graded manifolds naturally arise in the context of Batalin-Vilkovisky quantization as one introduces...
A Lagrangian formulation of the BRST quantization of generic gauge theories in general irreducible n...
The most convenient tool to study the renormalization of a Lagrangian field theory invariant under n...
A general field-antifield BV formalism for antisymplectic first class constraints is proposed. It is...
We discuss the geometry of the Lagrangian quantization scheme based on (generalized) Schwinger-Dyson...
It is a review of some results in Odd symplectic geometry related to the Batalin-Vilkovisky Formalis
It is proven that, for any affine supermanifold M equipped with a constant odd symplectic structure,...
It is proven that, for any affine supermanifold M equipped with a constant odd symplectic structure,...
We reconsider the problem of finding all local symmetries of a Lagrangian. Our approach is completel...
We give a generally covariant description, in the sense of symplectic geometry, of gauge transformat...
It is proven that, for any affine supermanifold M equipped with a constant odd symplectic structure,...
In this short note we extend the results of Alfaro and Damgaard on the origin of antifields to theor...
This short note is closely related to Sen-Zwiebach paper on gauge transformations in Batali...
The Faddeev-Popov gauge fixing in Yang-Mills theory is interpreted as equivariant localization. It i...
This short note is closely related to Sen-Zwiebach paper on gauge transformations in Batali...
Graded manifolds naturally arise in the context of Batalin-Vilkovisky quantization as one introduces...
A Lagrangian formulation of the BRST quantization of generic gauge theories in general irreducible n...
The most convenient tool to study the renormalization of a Lagrangian field theory invariant under n...
A general field-antifield BV formalism for antisymplectic first class constraints is proposed. It is...
We discuss the geometry of the Lagrangian quantization scheme based on (generalized) Schwinger-Dyson...
It is a review of some results in Odd symplectic geometry related to the Batalin-Vilkovisky Formalis
It is proven that, for any affine supermanifold M equipped with a constant odd symplectic structure,...
It is proven that, for any affine supermanifold M equipped with a constant odd symplectic structure,...
We reconsider the problem of finding all local symmetries of a Lagrangian. Our approach is completel...
We give a generally covariant description, in the sense of symplectic geometry, of gauge transformat...
It is proven that, for any affine supermanifold M equipped with a constant odd symplectic structure,...
In this short note we extend the results of Alfaro and Damgaard on the origin of antifields to theor...
This short note is closely related to Sen-Zwiebach paper on gauge transformations in Batali...
The Faddeev-Popov gauge fixing in Yang-Mills theory is interpreted as equivariant localization. It i...
This short note is closely related to Sen-Zwiebach paper on gauge transformations in Batali...
Graded manifolds naturally arise in the context of Batalin-Vilkovisky quantization as one introduces...