We extend Michel's theorem on the geometry of symmetry breaking to the case of pure gauge theories, i.e., of gauge-invariant functionals defined on the space C of connections of a principal fiber bundle. Our proof follows closely the original one by Michel, using several known results on geometry of C. The result (and proof) is also extended to the case of gauge theories with matter fields
Classical gauge theories are constructed on a class of associated bundlesS(M, G; G/A), with structur...
Classical gauge theories are constructed on a class of associated bundlesS(M, G; G/A), with structur...
In this thesis, we discuss some of the elementary ideas in gauge theory that allow us to describe th...
The appropriate language for describing the pure Yang-Mills theories is introduced. An elementary bu...
22 pagesInternational audienceWe introduce a general mathematical principle, with roots in Geometric...
It is shown that the correct mathematical implementation of symmetry in the geometric formulation of...
The global feature of the gauge field theory is discussed in the context of the fiber bundle. Especi...
It is shown that the correct mathematical implementation of symmetry in the geometric formulation of...
Goal: formulate gauge theories on noncommutative spaces Approach: study an example of a noncommutati...
This monograph aims to provide a unified, geometrical foundation of gauge theories of elementary par...
We describe some aspects of classical gauge theory from the perspective of connections on vector bun...
Classical gauge theories are constructed on a class of associated bundlesS(M, G; G/A), with structur...
Classical gauge theories are constructed on a class of associated bundlesS(M, G; G/A), with structur...
The theory of gauges and connections in the principal bundle formalism is reviewed. The geometrical ...
Michel's theory of symmetry breaking in its original formulation has some difficulty in dealing with...
Classical gauge theories are constructed on a class of associated bundlesS(M, G; G/A), with structur...
Classical gauge theories are constructed on a class of associated bundlesS(M, G; G/A), with structur...
In this thesis, we discuss some of the elementary ideas in gauge theory that allow us to describe th...
The appropriate language for describing the pure Yang-Mills theories is introduced. An elementary bu...
22 pagesInternational audienceWe introduce a general mathematical principle, with roots in Geometric...
It is shown that the correct mathematical implementation of symmetry in the geometric formulation of...
The global feature of the gauge field theory is discussed in the context of the fiber bundle. Especi...
It is shown that the correct mathematical implementation of symmetry in the geometric formulation of...
Goal: formulate gauge theories on noncommutative spaces Approach: study an example of a noncommutati...
This monograph aims to provide a unified, geometrical foundation of gauge theories of elementary par...
We describe some aspects of classical gauge theory from the perspective of connections on vector bun...
Classical gauge theories are constructed on a class of associated bundlesS(M, G; G/A), with structur...
Classical gauge theories are constructed on a class of associated bundlesS(M, G; G/A), with structur...
The theory of gauges and connections in the principal bundle formalism is reviewed. The geometrical ...
Michel's theory of symmetry breaking in its original formulation has some difficulty in dealing with...
Classical gauge theories are constructed on a class of associated bundlesS(M, G; G/A), with structur...
Classical gauge theories are constructed on a class of associated bundlesS(M, G; G/A), with structur...
In this thesis, we discuss some of the elementary ideas in gauge theory that allow us to describe th...
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