AbstractClone of a topological space X is a category, objects of which are all finite powers of X and its morphisms are all their continuous maps. In the paper, surprisingly nice theory arising from this simple notion, is presented
Abstract. To every locally closed clone, one can assign a larger clone in a canonical way. We examin...
AbstractFor every cardinal number ɱ and every pair of monoids M1 ⊆ M2 there exists a Tychonoff space...
summary:Clone properties are the properties expressible by the first order sentence of the clone lan...
AbstractClone of a topological space X is a category, objects of which are all finite powers of X an...
AbstractWe construct metric (or uniform or topological) spaces X and Y such that every non-expanding...
summary:The clone of a topological space is known to have a strictly more expressive first-order lan...
AbstractFor every natural number n > 1, we construct a metric space X such that every continuous map...
summary:Clone properties are the properties expressible by the first order sentence of the clone lan...
summary:Clone properties are the properties expressible by the first order sentence of the clone lan...
It is known that a countable -categorical structure interprets all finite structures primitively pos...
Various topological spaces are examined in an effort to describe topological spaces from a knowledge...
Various topological spaces are examined in an effort to describe topological spaces from a knowledge...
It is known that a countable omega-categorical structure interprets all finite structures primitivel...
summary:This paper gives a partial solution to a problem of W. Taylor on characterization of the uni...
summary:This paper gives a partial solution to a problem of W. Taylor on characterization of the uni...
Abstract. To every locally closed clone, one can assign a larger clone in a canonical way. We examin...
AbstractFor every cardinal number ɱ and every pair of monoids M1 ⊆ M2 there exists a Tychonoff space...
summary:Clone properties are the properties expressible by the first order sentence of the clone lan...
AbstractClone of a topological space X is a category, objects of which are all finite powers of X an...
AbstractWe construct metric (or uniform or topological) spaces X and Y such that every non-expanding...
summary:The clone of a topological space is known to have a strictly more expressive first-order lan...
AbstractFor every natural number n > 1, we construct a metric space X such that every continuous map...
summary:Clone properties are the properties expressible by the first order sentence of the clone lan...
summary:Clone properties are the properties expressible by the first order sentence of the clone lan...
It is known that a countable -categorical structure interprets all finite structures primitively pos...
Various topological spaces are examined in an effort to describe topological spaces from a knowledge...
Various topological spaces are examined in an effort to describe topological spaces from a knowledge...
It is known that a countable omega-categorical structure interprets all finite structures primitivel...
summary:This paper gives a partial solution to a problem of W. Taylor on characterization of the uni...
summary:This paper gives a partial solution to a problem of W. Taylor on characterization of the uni...
Abstract. To every locally closed clone, one can assign a larger clone in a canonical way. We examin...
AbstractFor every cardinal number ɱ and every pair of monoids M1 ⊆ M2 there exists a Tychonoff space...
summary:Clone properties are the properties expressible by the first order sentence of the clone lan...
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