- f:X\to X'} from a
bitopological space ( X , τ 1 , τ 2 ) {\displaystyle \scriptstyle (X,\tau _{1},\tau _{2})} to
another bitopological space ( X ′ , τ 1...
-
spaces and
spectral maps.
Priestley spaces are also
closely related to
bitopological spaces. Theorem: If (X,τ,≤) is a
Priestley space, then (X,τu,τd) is...
-
space (X,τ+,τ−) is
called the
bitopological dual of L. Each
pairwise Stone space is bi-homeomorphic to the
bitopological dual of some
bounded distributive...
- G. Bezhanishvili, N. Bezhanishvili, D. Gabelaia, A. Kurz, (2010). "
Bitopological duality for
distributive lattices and
Heyting algebras." Mathematical...
- spaces.
Bitopological space Duality theory for
distributive lattices G. Bezhanishvili, N. Bezhanishvili, D. Gabelaia, A. Kurz, (2010).
Bitopological duality...
-
structure is
simply a
topological space. For N = 2, the
structure becomes a
bitopological space introduced by J. C. Kelly. Let X = {x1, x2, ...., xn} be any finite...
- to obey any very
simple law as a
function of n {\displaystyle n} ".
Bitopological space Icard, III,
Thomas F. (2008).
Models of the
Polymodal Provability...
- lattices. Such
spaces are
known as
Priestley spaces. Further,
certain bitopological spaces,
namely pairwise Stone spaces,
generalize Stone's
original approach...
