ultrafilter topology - ορισμός. Τι είναι το ultrafilter topology
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Τι (ποιος) είναι ultrafilter topology - ορισμός

IN SET THEORY, GIVEN A COLLECTION OF DENSE OPEN SUBSETS OF A POSET, A FILTER THAT MEETS ALL SETS IN THAT COLLECTION
Generic ultrafilter

Trivial topology         
TOPOLOGY WHERE THE ONLY OPEN SETS ARE THE EMPTY SET AND THE ENTIRE SPACE
Indiscrete topology; Indiscrete space; Codiscrete topology
In topology, a topological space with the trivial topology is one where the only open sets are the empty set and the entire space. Such spaces are commonly called indiscrete, anti-discrete, concrete or codiscrete.
Computational topology         
SUBFIELD OF TOPOLOGY WITH AN OVERLAP WITH AREAS OF COMPUTER SCIENCE
Algorithmic topology
Algorithmic topology, or computational topology, is a subfield of topology with an overlap with areas of computer science, in particular, computational geometry and computational complexity theory.
Étale topology         
GROTHENDIECK TOPOLOGY ON THE CATEGORY OF SCHEMES, WHOSE COVERING FAMILIES ARE JOINTLY SURJECTIVE FAMILIES OF ÉTALE MORPHISMS
Etale topology; Étale sheaf
In algebraic geometry, the étale topology is a Grothendieck topology on the category of schemes which has properties similar to the Euclidean topology, but unlike the Euclidean topology, it is also defined in positive characteristic. The étale topology was originally introduced by Grothendieck to define étale cohomology, and this is still the étale topology's most well-known use.

Βικιπαίδεια

Generic filter

In the mathematical field of set theory, a generic filter is a kind of object used in the theory of forcing, a technique used for many purposes, but especially to establish the independence of certain propositions from certain formal theories, such as ZFC. For example, Paul Cohen used forcing to establish that ZFC, if consistent, cannot prove the continuum hypothesis, which states that there are exactly aleph-one real numbers. In the contemporary re-interpretation of Cohen's proof, it proceeds by constructing a generic filter that codes more than 1 {\displaystyle \aleph _{1}} reals, without changing the value of 1 {\displaystyle \aleph _{1}} .

Formally, let P be a partially ordered set, and let F be a filter on P; that is, F is a subset of P such that:

  1. F is nonempty
  2. If pq ∈ P and p ≤ q and p is an element of F, then q is an element of F (F is closed upward)
  3. If p and q are elements of F, then there is an element r of F such that r ≤ p and r ≤ q (F is downward directed)

Now if D is a collection of dense open subsets of P, in the topology whose basic open sets are all sets of the form {q | q ≤ p} for particular p in P, then F is said to be D-generic if F meets all sets in D; that is,

F E , {\displaystyle F\cap E\neq \varnothing ,\,} for all E ∈ D.

Similarly, if M is a transitive model of ZFC (or some sufficient fragment thereof), with P an element of M, then F is said to be M-generic, or sometimes generic over M, if F meets all dense open subsets of P that are elements of M.