Add to ORKGWe show that the set of the equivalence classes of multifoliate structures is in one-to-one correspondence with the set of equivalence classes of finite complete projective systems of vector space epimorphisms. After that we give the complete description of all product preserving bundle functors on the categories of multifibered and multifoliate manifolds
summary:The theory of product preserving functors and Weil functors is partly extended to infinite d...
summary:The theory of product preserving functors and Weil functors is partly extended to infinite d...
summary:We describe the fiber product preserving bundle functors on the category of all morphisms of...
We show that the set of the equivalence classes of multifoliate structures is in one-to-one correspo...
We show that the set of the equivalence classes of multifoliate structures is in one-to-one correspo...
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...
AbstractWe present a complete description of all fiber product preserving bundle functors on the cat...
Abstract. The theory of product preserving functors and Weil functors is partly extended to innite d...
Abstract. We describe the fiber product preserving bundle functors on the category of all morphisms ...
AbstractFunctors from the category of connected smooth manifolds to itself which preserve products a...
summary:Let $\mathcal {P}\mathcal {B}_m$ be the category of all principal fibred bundles with $m$-di...
summary:Let $\mathcal {P}\mathcal {B}_m$ be the category of all principal fibred bundles with $m$-di...
summary:Let $\mathcal {P}\mathcal {B}_m$ be the category of all principal fibred bundles with $m$-di...
summary:The theory of product preserving functors and Weil functors is partly extended to infinite d...
summary:The theory of product preserving functors and Weil functors is partly extended to infinite d...
summary:We describe the fiber product preserving bundle functors on the category of all morphisms of...
We show that the set of the equivalence classes of multifoliate structures is in one-to-one correspo...
We show that the set of the equivalence classes of multifoliate structures is in one-to-one correspo...
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...
AbstractWe present a complete description of all fiber product preserving bundle functors on the cat...
Abstract. The theory of product preserving functors and Weil functors is partly extended to innite d...
Abstract. We describe the fiber product preserving bundle functors on the category of all morphisms ...
AbstractFunctors from the category of connected smooth manifolds to itself which preserve products a...
summary:Let $\mathcal {P}\mathcal {B}_m$ be the category of all principal fibred bundles with $m$-di...
summary:Let $\mathcal {P}\mathcal {B}_m$ be the category of all principal fibred bundles with $m$-di...
summary:Let $\mathcal {P}\mathcal {B}_m$ be the category of all principal fibred bundles with $m$-di...
summary:The theory of product preserving functors and Weil functors is partly extended to infinite d...
summary:The theory of product preserving functors and Weil functors is partly extended to infinite d...
summary:We describe the fiber product preserving bundle functors on the category of all morphisms of...