Add to ORKGAn object $X$ of a category $mathbf{C}$ with finite limits is called exponentiable if the functor $-times X:mathbf{C}rightarrow mathbf{C}$ has a right adjoint. There are many characterizations of the exponentiable spaces in the category $mathbf{Top}$ of topological spaces. Here, we study the exponentiable objects in the category $mathbf{STop}$ of soft topological spaces which is a generalization of the category $mathbf{Top}$. We investigate the exponentiability problem and give a characterization of exponentiable soft spaces. Also wegive the definition of exponential topology on the lattice of soft open sets of a soft space and present some characterizations of it
We prove that Scott formal topologies are exponentiable in the category of inductively generated for...
For a Heyting algebra V which, as a category, is monoidal closed, we obtain characterizations of exp...
We consider exponentiable objects in lax slices of Top with respect to the specialization order (and...
Given a map f in the category w-Cpo of w-complete posets, exponentiability of f in w-Cpo easily imp...
Given a map f in the category w-Cpo of w-complete posets, exponentiability of f in w-Cpo easily imp...
Given a map f in the category w-Cpo of w-complete posets, exponentiability of f in w-Cpo easily imp...
Given a map f in the category ω-Cpo of ω-complete posets, exponentiability of f in ω-Cpo easily impl...
AbstractWe show that, given a subcategory C of Top closed under refinement and products, exponentiat...
We show that, given a subcategory C of Top closed under refinement and products, exponentiations of ...
It is well-known that a Hausdorff space is exponentiable if and only if it is locally compact, and ...
Exponentiable maps in the category Top of topological spaces are characterized by an easy ultrafilte...
a map is exponentiable if, and only if, it is étale (see [1]). Briefly, to prove that étale contin...
AbstractBrown, Booth and Tillotson introduced the C-product, or the BBT C-product, for any class C o...
We prove that Scott formal topologies are exponentiable in the category of inductively generated for...
AbstractFor a Heyting algebra V which, as a category, is monoidal closed, we obtain characterization...
We prove that Scott formal topologies are exponentiable in the category of inductively generated for...
For a Heyting algebra V which, as a category, is monoidal closed, we obtain characterizations of exp...
We consider exponentiable objects in lax slices of Top with respect to the specialization order (and...
Given a map f in the category w-Cpo of w-complete posets, exponentiability of f in w-Cpo easily imp...
Given a map f in the category w-Cpo of w-complete posets, exponentiability of f in w-Cpo easily imp...
Given a map f in the category w-Cpo of w-complete posets, exponentiability of f in w-Cpo easily imp...
Given a map f in the category ω-Cpo of ω-complete posets, exponentiability of f in ω-Cpo easily impl...
AbstractWe show that, given a subcategory C of Top closed under refinement and products, exponentiat...
We show that, given a subcategory C of Top closed under refinement and products, exponentiations of ...
It is well-known that a Hausdorff space is exponentiable if and only if it is locally compact, and ...
Exponentiable maps in the category Top of topological spaces are characterized by an easy ultrafilte...
a map is exponentiable if, and only if, it is étale (see [1]). Briefly, to prove that étale contin...
AbstractBrown, Booth and Tillotson introduced the C-product, or the BBT C-product, for any class C o...
We prove that Scott formal topologies are exponentiable in the category of inductively generated for...
AbstractFor a Heyting algebra V which, as a category, is monoidal closed, we obtain characterization...
We prove that Scott formal topologies are exponentiable in the category of inductively generated for...
For a Heyting algebra V which, as a category, is monoidal closed, we obtain characterizations of exp...
We consider exponentiable objects in lax slices of Top with respect to the specialization order (and...