Topology Help: Proving Open Sets in T[SUB]C for X and C Collection"

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Homework Help Overview

The discussion revolves around proving that every set in a collection C of subsets of a set X is an open set in the topology T_C generated by the basis β_C, which consists of intersections of finitely many sets from C. The problem is situated within the context of topology.

Discussion Character

  • Conceptual clarification, Mathematical reasoning

Approaches and Questions Raised

  • Participants explore how to express subsets of C as unions of elements from the basis β_C. There is a focus on the relationship between the sub-basis C and the topology T_C it induces.

Discussion Status

Some participants have offered initial reasoning regarding the proof, discussing how elements of C relate to the basis β_C and the implications for openness in the topology. However, the discussion appears to be in the early stages, with no consensus reached on a complete proof.

Contextual Notes

Participants note that the proof is not yet fully developed, and there is an acknowledgment that the reasoning provided does not constitute a formal proof. The nature of the problem suggests a need for careful consideration of definitions and properties of open sets in topology.

son
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let X be a set and C be a collection of subsets of X whose union equal X. let βC the collection of all subsets of X that can be expressed as an intersection of finitely many of the sets from C.

let TC be the topology generated by the basis βC.

prove that every set in C is an open set in the topology TC.










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The Attempt at a Solution

 
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any ideas/attempts?
 


Essentially what you need to do is show that any subset A of C can be expressed as a union of elements of B_C.

C in this case is a sub-basis of X, and T_c the topology that this subbasis induces, so to speak.
 


this is what i came up with... but this is not consider a proof...

every element in C will be in the basis β_C. Let U be in C then U is the finite intersection of elements in C, for example U = U ∩ U. It follows that U ∈ β_C. And by the definition of the topology, every element in β_C is open, so U is thus open.
 

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