Modular spaces of low-dimensional Drinfeld doubles
This paper deals with calculus which is an extension of finite operator calculus due to Rota, and leading results of Rota’s calculus are easily -extendable. The particular case is known to be relevant for quantum group investigations. It is shown here that such umbral calculus leads to infinitely many new -deformed quantum like oscillator algebra representations. The authors point to several references dealing with new applications of umbral and calculus in which new families of extensions...
A multisymplectic 3-structure on an -dimensional manifold is given by a closed smooth 3-form of maximal rank on which is of the same algebraic type at each point of , i.e. they belong to the same orbit under the action of the group . This means that for each point the form is isomorphic to a chosen canonical 3-form on . R. Westwick [Linear Multilinear Algebra 10, 183–204 (1981; Zbl 0464.15001)] and D. Ž. Djoković [Linear Multilinear Algebra 13, 3–39 (1983; Zbl 0515.15011)] obtained...
One studies the flow prolongation of projectable vector fields with respect to a bundle functor of order on the category of fibered manifolds. As a result, one constructs an operator transforming connections on a fibered manifold into connections on an arbitrary vertical bundle over . It is deduced that this operator is the only natural one of finite order and one presents a condition on vertical bundles over under which every natural operator in question has finite order.
Let be a -dimensional foliation on an -manifold , and the -tangent bundle of . The purpose of this paper is to present some reltionship between the foliation and a natural lifting of to the bundle . Let
The authors study some geometrical constructions on the cotangent bundle from the viewpoint of natural operations. First they deduce that all natural operators transforming functions on into vector fields on are linearly generated by the Hamiltonian vector field with respect to the canonical symplectic structure of and by the Liouville vector field of . Then they determine all natural operators transforming pairs of functions on into functions on . In this case, the main generator is...
[For the entire collection see Zbl 0742.00067.]This paper is devoted to a method permitting to determine explicitly all multilinear natural operators between vector-valued differential forms and between sections of several other natural vector bundles.
The author studies the problem how a map on an -dimensional manifold can induce canonically a map for a fixed natural number. He proves the following result: “Let be a natural operator for -manifolds. If then there exists a uniquely determined smooth map such that .”The conclusion is that all natural functions on for -manifolds are of the form , where is a function of variables.
The author proves that for a manifold of dimension greater than 2 the sets of all natural operators and , respectively, are free finitely generated -modules. The space , this is, jets with target 0 of maps from to , is called the space of all -covelocities on . Examples of such operators are shown and the bases of the modules are explicitly constructed. The definitions and methods are those of the book of I. Kolář, P. W. Michor and J. Slovák [Natural operations in differential geometry,...
Let be a natural bundle of order ; a basis of the -th order differential operators of with values in -th order bundles is an operator of that type such that any other one is obtained by composing with a suitable zero-order operator. In this article a basis is found in the following two cases: for (semi-holonomic -th order frame bundle), , and (-st order frame bundle), . The author uses here the so-called method of orbit reduction which provides one with a criterion for checking...
Let be a fibered manifold over a manifold and be a homomorphism between Weil algebras and . Using the results of Mikulski and others, which classify product preserving bundle functors on the category of fibered manifolds, the author classifies all natural operators , where denotes the space of projective vector fields on and the bundle functors associated with .
In this nice paper the author proves that all natural symplectic forms on the tangent bundle of a pseudo-Riemannian manifold are pull-backs of the canonical symplectic form on the cotangent bundle with respect to some diffeomorphisms which are naturally induced by the metric.