AbstractWe present a complete description of all fiber product preserving bundle functors on the category of fibered manifolds with m-dimensional bases and fiber preserving maps with local diffeomorphisms as base maps. This result is based on several general properties of such functors, which are deduced in the first two parts of the paper
AbstractFunctors from the category of connected smooth manifolds to itself which preserve products a...
summary:For every bundle functor we introduce the concept of subordinated functor. Then we describe ...
AbstractLet F be a fiber product preserving bundle functor on the category FMm of the proper base or...
AbstractWe present a complete description of all fiber product preserving bundle functors on the cat...
summary:For every bundle functor we introduce the concept of subordinated functor. Then we describe ...
Abstract. We describe the fiber product preserving bundle functors on the category of all morphisms ...
summary:We describe the fiber product preserving bundle functors on the category of all morphisms of...
summary:We introduce the concept of modified vertical Weil functors on the category $\mathcal {F}\ma...
summary:We introduce the concept of modified vertical Weil functors on the category $\mathcal {F}\ma...
summary:We describe the fiber product preserving bundle functors on the category of all morphisms of...
summary:We introduce the concept of modified vertical Weil functors on the category $\mathcal {F}\ma...
summary:We describe the fiber product preserving bundle functors on the category of all morphisms of...
summary:A product preserving functor is a covariant functor ${\cal F}$ from the category of all mani...
summary:A product preserving functor is a covariant functor ${\cal F}$ from the category of all mani...
summary:For every bundle functor we introduce the concept of subordinated functor. Then we describe ...
AbstractFunctors from the category of connected smooth manifolds to itself which preserve products a...
summary:For every bundle functor we introduce the concept of subordinated functor. Then we describe ...
AbstractLet F be a fiber product preserving bundle functor on the category FMm of the proper base or...
AbstractWe present a complete description of all fiber product preserving bundle functors on the cat...
summary:For every bundle functor we introduce the concept of subordinated functor. Then we describe ...
Abstract. We describe the fiber product preserving bundle functors on the category of all morphisms ...
summary:We describe the fiber product preserving bundle functors on the category of all morphisms of...
summary:We introduce the concept of modified vertical Weil functors on the category $\mathcal {F}\ma...
summary:We introduce the concept of modified vertical Weil functors on the category $\mathcal {F}\ma...
summary:We describe the fiber product preserving bundle functors on the category of all morphisms of...
summary:We introduce the concept of modified vertical Weil functors on the category $\mathcal {F}\ma...
summary:We describe the fiber product preserving bundle functors on the category of all morphisms of...
summary:A product preserving functor is a covariant functor ${\cal F}$ from the category of all mani...
summary:A product preserving functor is a covariant functor ${\cal F}$ from the category of all mani...
summary:For every bundle functor we introduce the concept of subordinated functor. Then we describe ...
AbstractFunctors from the category of connected smooth manifolds to itself which preserve products a...
summary:For every bundle functor we introduce the concept of subordinated functor. Then we describe ...
AbstractLet F be a fiber product preserving bundle functor on the category FMm of the proper base or...
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