Add to ORKGsummary:We provide new proofs for the classical insertion theorems of Dowker and Michael. The proofs are geometric in nature and highlight the connection with the preservation of normality in products. Both proofs follow directly from the Kat\v{e}tov-Tong insertion theorem and we also discuss a proof of this
AbstractWe demonstrate that the classical Michael selection theorem for l.s.c. mappings with a colle...
The computational results of traditional numerical algorithms on computers are usually good approxim...
AbstractPadé approximants in one variable have proved to be very useful in numerical analysis, espec...
summary:We provide new proofs for the classical insertion theorems of Dowker and Michael. The proofs...
Abstract. We provide new proofs for the classical insertion theorems of Dowker and Michael. The proo...
summary:Normal spaces are characterized in terms of an insertion type theorem, which implies the Kat...
summary:Normal spaces are characterized in terms of an insertion type theorem, which implies the Kat...
AbstractIn this paper we prove two strict insertion theorems for frame homomorphisms. When applied t...
summary:A family of subsets of a set is called a $\sigma $-topology if it is closed under arbitrary ...
summary:A family of subsets of a set is called a $\sigma $-topology if it is closed under arbitrary ...
summary:A family of subsets of a set is called a $\sigma $-topology if it is closed under arbitrary ...
AbstractIn this paper, we shall generalize the Hahn-Dieudonné-Tong Insertion Theorem, a classical re...
In this paper we prove two strict insertion theorems for frame homomorphisms. When applied to the f...
AbstractIn this paper we prove two strict insertion theorems for frame homomorphisms. When applied t...
AbstractWe introduce a generalization, mixed insertion, of Schensted insertion and develop certain r...
AbstractWe demonstrate that the classical Michael selection theorem for l.s.c. mappings with a colle...
The computational results of traditional numerical algorithms on computers are usually good approxim...
AbstractPadé approximants in one variable have proved to be very useful in numerical analysis, espec...
summary:We provide new proofs for the classical insertion theorems of Dowker and Michael. The proofs...
Abstract. We provide new proofs for the classical insertion theorems of Dowker and Michael. The proo...
summary:Normal spaces are characterized in terms of an insertion type theorem, which implies the Kat...
summary:Normal spaces are characterized in terms of an insertion type theorem, which implies the Kat...
AbstractIn this paper we prove two strict insertion theorems for frame homomorphisms. When applied t...
summary:A family of subsets of a set is called a $\sigma $-topology if it is closed under arbitrary ...
summary:A family of subsets of a set is called a $\sigma $-topology if it is closed under arbitrary ...
summary:A family of subsets of a set is called a $\sigma $-topology if it is closed under arbitrary ...
AbstractIn this paper, we shall generalize the Hahn-Dieudonné-Tong Insertion Theorem, a classical re...
In this paper we prove two strict insertion theorems for frame homomorphisms. When applied to the f...
AbstractIn this paper we prove two strict insertion theorems for frame homomorphisms. When applied t...
AbstractWe introduce a generalization, mixed insertion, of Schensted insertion and develop certain r...
AbstractWe demonstrate that the classical Michael selection theorem for l.s.c. mappings with a colle...
The computational results of traditional numerical algorithms on computers are usually good approxim...
AbstractPadé approximants in one variable have proved to be very useful in numerical analysis, espec...