Characterization of one type of multisymplectic 3-forms in odd dimensions
Characterizations of supercompact spaces
Characters of the irreducible highest weight modules over the virasoro and super-virasoro algebras
«Charles Ehresmann : 100 ans»
Choquet simplices and Harnack inequalities
Circular vectors and toroidal matrices
Summary: Arrays of numbers may be written not only on a line (= ``a vector'') or in the plain (= ``a matrix'') but also on a circle (= ``a circular vector''), on a torus (= ``a toroidal matrix'') etc. In the latter case, the immanent index-rotation ambiguity converts the standard ``scalar'' product into a binary operation with several interesting properties.
Circumscribing convex sets
Classification of endomorphisms of some Lie algebroids up to homotopy and the fundamental group of a Lie algebroid
Classification of -homomorphisms between higher symplectic spinors
Clifford algebra with Reduce
Clifford algebras and the double-layer potential operator
Clifford approach to metric manifolds
[For the entire collection see Zbl 0742.00067.]For the purpose of providing a comprehensive model for the physical world, the authors set up the notion of a Clifford manifold which, as mentioned below, admits the usual tensor structure and at the same time a spin structure. One considers the spin space generated by a Clifford algebra, namely, the vector space spanned by an orthonormal basis satisfying the condition , where denotes the unit scalar of the algebra and () the nonsingular Minkowski...
Člověk-umění-matematika [Book]
Coherence constraints for operads, categories and algebras
Cohesive spaces and fixed points
Cohomology and connection on -bundles
Collared sets
Combinatorial optimization in production and logistics systems
Combinatorial properties of uniformities
Commemoration of Eduard Čech