selective ultrafilter - meaning and definition. What is selective ultrafilter
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What (who) is selective ultrafilter - definition

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

Ultrafilter (set theory)         
MAXIMAL PROPER FILTER
Ultrafilter lemma; Ultrafilter Lemma; Ultrafilter principle; Rudin-Keisler ordering; Rudin–Keisler ordering; Rudin–Keisler order; Rudin-Keisler order; Principal ultrafilter; Ramsey ultrafilter; Selective ultrafilter; Rudin–Keisler equivalent; Rudin-Keisler equivalent; The ultrafilter lemma; Ultra prefilter; Free ultrafilter (set theory); Ultrafilter monad
In the mathematical field of set theory, an ultrafilter is a maximal proper filter: it is a filter U on a given non-empty set X which is a certain type of non-empty family of subsets of X, that is not equal to the power set \wp(X) of X (such filters are called ) and that is also "maximal" in that there does not exist any other proper filter on X that contains it as a proper subset.
Selective auditory attention         
THE FOCUS ON A SPECIFIC SOURCE OF A SOUND OR SPOKEN WORDS
Selective hearing; Selective deafness; User:Spicysugar07/Selective Auditory Attention; Wikipedia talk:Articles for creation/Selective Auditory Attention; Selective Auditory Attention
Selective auditory attention or selective hearing is a type of selective attention and involves the auditory system. Selective hearing is characterized as the action in which people focus their attention intentionally on a specific source of a sound or spoken words.
selective service         
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  • military segregated]].
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  • The former seal of the Selective Service System
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  • Selective service information available in a local post office in [[Boston, Massachusetts]]
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US FEDERAL GOVERNMENT AGENCY THAT MAINTAINS INFORMATION ON THOSE POTENTIALLY SUBJECT TO MILITARY CONSCRIPTION
Selective Service; 3-A deferment; Selective service; Class 1-A; 4F (military conscription); U.S. Selective Service; 4-F (US Military); Military deferment; Student deferment; Selective Service Administration; Selective Service Board; 4-F (Selective Service System); Class 1-Y; Selective Service registration; Selective Service Number; Selective Service System classification; Selective Service Draft Act; Director of Selective Service; D.S.S. Form 1
In the United States, selective service is a system of selecting and ordering young men to serve in the armed forces for a limited period of time.
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Wikipedia

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.