General nonlinear random equations with random multivalued operator in Banach spaces.
General position properties in fiberwise geometric topology [Book]
Generalization of contra-continuous functions.
Generalizations of analytic and standard measurable spaces.
Generalizations of the Fan-Browder fixed point theorem and minimax inequalities
In this paper fixed point theorems for maps with nonempty convex values and having the local intersection property are given. As applications several minimax inequalities are obtained.
Generalized analytic spaces, completeness and fragmentability
Classical analytic spaces can be characterized as projections of Polish spaces. We prove analogous results for three classes of generalized analytic spaces that were introduced by Z. Frolík, D. Fremlin and R. Hansell. We use the technique of complete sequences of covers. We explain also some relations of analyticity to certain fragmentability properties of topological spaces endowed with an additional metric.
Generalized asymptotic pointwise contractions and nonexpansive mappings involving orbits.
Generalized Caristi's fixed point theorems.
Generalized common fixed point theorems for a sequence of fuzzy mappings.
Generalized concentrative mappings and their fixed points
Generalized cone metric spaces.
Generalized contraction principle.
Generalized contractions and common fixed point theorems concerning -distance.
Generalized contractions and fixed-point theorems.
Generalized distance and fixed point theorems in partially ordered probabilistic metric spaces
Generalized IFSs on noncompact spaces.
Generalized Lefschetz sets.
Generalized Lusin sets with the Blackwell property
Generalized n-colorings of links
The notion of an (n,r)-coloring for a link diagram generalizes the idea of an n-coloring introduced by R. H. Fox. For any positive integer n the various (n,r)-colorings of a diagram for an oriented link l correspond in a natural way to the periodic points of the representation shift of the link. The number of (n,r)-colorings of a diagram for a satellite knot is determined by the colorings of its pattern and companion knots together with the winding number.
Generalized projections of Borel and analytic sets
For a σ-ideal I of sets in a Polish space X and for A ⊆ , we consider the generalized projection (A) of A given by (A) = x ∈ X: Ax ∉ I, where =y ∈ X: 〈x,y〉∈ A. We study the behaviour of with respect to Borel and analytic sets in the case when I is a -supported σ-ideal. In particular, we give an alternative proof of the recent result of Kechris showing that [ for a wide class of -supported σ-ideals.