A net has a limit if and only if all of its subnets have limits (without the use of Cauchy nets)












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$begingroup$


I am trying to prove the above. More specifically I am trying to prove the direction "if all subnets of a given net have limits then the net in question has a limit"



The definition I am using for a subnet is as follows (From Folland)



A subnet of a net $(x_alpha)_{alphain A}$ is a net $(y_{beta})_{betain B}$ together with a map $h:Brightarrow A$ such that



-For every $alpha_{0}in A$, there exists $beta_{0}in B$ such that $forall beta$ such that $beta_{0}preccurlyeq beta$ we have $alpha_{0}preccurlyeq h(beta)$



-$y_{beta}=x_{h(alpha)}$



I feel the only way I can approach this is via contradiction. Suppose that $(x_alpha)_{alphain A}$ did not have a limit, then...then what. I feel I need a way to talk about convergence without knowing what the limit is. In real analysis, one could do this using Cauchy sequences. A quick look on wikipedia shows that a thing called a Cauchy net exists, but since my lecturer gave us this problem without ever talking about Cauchy nets I feel there should be a way to solve this without referring to Cauchy nets.



To be clear, the only things we were taught was basic point set topology and the definition of a net and a subnet, so I would like, if possible, an answer that only utilises these things. A hint or complete answer is welcome.










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$endgroup$








  • 2




    $begingroup$
    What about the fact that any net $(x_alpha)_{alpha in A}$ is a subnet of itself, via the identity map $A to A$?
    $endgroup$
    – Daniel Schepler
    Dec 11 '18 at 1:45










  • $begingroup$
    My life would be so much easier if I wasn't an idiot, but thank you for taking the time to point this out to me.
    $endgroup$
    – Damo
    Dec 11 '18 at 1:49








  • 1




    $begingroup$
    I guess correctly specified version of your question is "if every subnet of a given net has a convergent subsubnet with common limit $L$, then the net in question converges to $L$." Certainly, this statement has a sequence counterpart, and it is obviously true for any sequence. It turns out that it is also true for any net: see math.stackexchange.com/questions/897957/on-nets-convergence.
    $endgroup$
    – Song
    Dec 11 '18 at 2:00
















0












$begingroup$


I am trying to prove the above. More specifically I am trying to prove the direction "if all subnets of a given net have limits then the net in question has a limit"



The definition I am using for a subnet is as follows (From Folland)



A subnet of a net $(x_alpha)_{alphain A}$ is a net $(y_{beta})_{betain B}$ together with a map $h:Brightarrow A$ such that



-For every $alpha_{0}in A$, there exists $beta_{0}in B$ such that $forall beta$ such that $beta_{0}preccurlyeq beta$ we have $alpha_{0}preccurlyeq h(beta)$



-$y_{beta}=x_{h(alpha)}$



I feel the only way I can approach this is via contradiction. Suppose that $(x_alpha)_{alphain A}$ did not have a limit, then...then what. I feel I need a way to talk about convergence without knowing what the limit is. In real analysis, one could do this using Cauchy sequences. A quick look on wikipedia shows that a thing called a Cauchy net exists, but since my lecturer gave us this problem without ever talking about Cauchy nets I feel there should be a way to solve this without referring to Cauchy nets.



To be clear, the only things we were taught was basic point set topology and the definition of a net and a subnet, so I would like, if possible, an answer that only utilises these things. A hint or complete answer is welcome.










share|cite|improve this question









$endgroup$








  • 2




    $begingroup$
    What about the fact that any net $(x_alpha)_{alpha in A}$ is a subnet of itself, via the identity map $A to A$?
    $endgroup$
    – Daniel Schepler
    Dec 11 '18 at 1:45










  • $begingroup$
    My life would be so much easier if I wasn't an idiot, but thank you for taking the time to point this out to me.
    $endgroup$
    – Damo
    Dec 11 '18 at 1:49








  • 1




    $begingroup$
    I guess correctly specified version of your question is "if every subnet of a given net has a convergent subsubnet with common limit $L$, then the net in question converges to $L$." Certainly, this statement has a sequence counterpart, and it is obviously true for any sequence. It turns out that it is also true for any net: see math.stackexchange.com/questions/897957/on-nets-convergence.
    $endgroup$
    – Song
    Dec 11 '18 at 2:00














0












0








0





$begingroup$


I am trying to prove the above. More specifically I am trying to prove the direction "if all subnets of a given net have limits then the net in question has a limit"



The definition I am using for a subnet is as follows (From Folland)



A subnet of a net $(x_alpha)_{alphain A}$ is a net $(y_{beta})_{betain B}$ together with a map $h:Brightarrow A$ such that



-For every $alpha_{0}in A$, there exists $beta_{0}in B$ such that $forall beta$ such that $beta_{0}preccurlyeq beta$ we have $alpha_{0}preccurlyeq h(beta)$



-$y_{beta}=x_{h(alpha)}$



I feel the only way I can approach this is via contradiction. Suppose that $(x_alpha)_{alphain A}$ did not have a limit, then...then what. I feel I need a way to talk about convergence without knowing what the limit is. In real analysis, one could do this using Cauchy sequences. A quick look on wikipedia shows that a thing called a Cauchy net exists, but since my lecturer gave us this problem without ever talking about Cauchy nets I feel there should be a way to solve this without referring to Cauchy nets.



To be clear, the only things we were taught was basic point set topology and the definition of a net and a subnet, so I would like, if possible, an answer that only utilises these things. A hint or complete answer is welcome.










share|cite|improve this question









$endgroup$




I am trying to prove the above. More specifically I am trying to prove the direction "if all subnets of a given net have limits then the net in question has a limit"



The definition I am using for a subnet is as follows (From Folland)



A subnet of a net $(x_alpha)_{alphain A}$ is a net $(y_{beta})_{betain B}$ together with a map $h:Brightarrow A$ such that



-For every $alpha_{0}in A$, there exists $beta_{0}in B$ such that $forall beta$ such that $beta_{0}preccurlyeq beta$ we have $alpha_{0}preccurlyeq h(beta)$



-$y_{beta}=x_{h(alpha)}$



I feel the only way I can approach this is via contradiction. Suppose that $(x_alpha)_{alphain A}$ did not have a limit, then...then what. I feel I need a way to talk about convergence without knowing what the limit is. In real analysis, one could do this using Cauchy sequences. A quick look on wikipedia shows that a thing called a Cauchy net exists, but since my lecturer gave us this problem without ever talking about Cauchy nets I feel there should be a way to solve this without referring to Cauchy nets.



To be clear, the only things we were taught was basic point set topology and the definition of a net and a subnet, so I would like, if possible, an answer that only utilises these things. A hint or complete answer is welcome.







general-topology nets






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share|cite|improve this question











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asked Dec 11 '18 at 1:39









DamoDamo

486210




486210








  • 2




    $begingroup$
    What about the fact that any net $(x_alpha)_{alpha in A}$ is a subnet of itself, via the identity map $A to A$?
    $endgroup$
    – Daniel Schepler
    Dec 11 '18 at 1:45










  • $begingroup$
    My life would be so much easier if I wasn't an idiot, but thank you for taking the time to point this out to me.
    $endgroup$
    – Damo
    Dec 11 '18 at 1:49








  • 1




    $begingroup$
    I guess correctly specified version of your question is "if every subnet of a given net has a convergent subsubnet with common limit $L$, then the net in question converges to $L$." Certainly, this statement has a sequence counterpart, and it is obviously true for any sequence. It turns out that it is also true for any net: see math.stackexchange.com/questions/897957/on-nets-convergence.
    $endgroup$
    – Song
    Dec 11 '18 at 2:00














  • 2




    $begingroup$
    What about the fact that any net $(x_alpha)_{alpha in A}$ is a subnet of itself, via the identity map $A to A$?
    $endgroup$
    – Daniel Schepler
    Dec 11 '18 at 1:45










  • $begingroup$
    My life would be so much easier if I wasn't an idiot, but thank you for taking the time to point this out to me.
    $endgroup$
    – Damo
    Dec 11 '18 at 1:49








  • 1




    $begingroup$
    I guess correctly specified version of your question is "if every subnet of a given net has a convergent subsubnet with common limit $L$, then the net in question converges to $L$." Certainly, this statement has a sequence counterpart, and it is obviously true for any sequence. It turns out that it is also true for any net: see math.stackexchange.com/questions/897957/on-nets-convergence.
    $endgroup$
    – Song
    Dec 11 '18 at 2:00








2




2




$begingroup$
What about the fact that any net $(x_alpha)_{alpha in A}$ is a subnet of itself, via the identity map $A to A$?
$endgroup$
– Daniel Schepler
Dec 11 '18 at 1:45




$begingroup$
What about the fact that any net $(x_alpha)_{alpha in A}$ is a subnet of itself, via the identity map $A to A$?
$endgroup$
– Daniel Schepler
Dec 11 '18 at 1:45












$begingroup$
My life would be so much easier if I wasn't an idiot, but thank you for taking the time to point this out to me.
$endgroup$
– Damo
Dec 11 '18 at 1:49






$begingroup$
My life would be so much easier if I wasn't an idiot, but thank you for taking the time to point this out to me.
$endgroup$
– Damo
Dec 11 '18 at 1:49






1




1




$begingroup$
I guess correctly specified version of your question is "if every subnet of a given net has a convergent subsubnet with common limit $L$, then the net in question converges to $L$." Certainly, this statement has a sequence counterpart, and it is obviously true for any sequence. It turns out that it is also true for any net: see math.stackexchange.com/questions/897957/on-nets-convergence.
$endgroup$
– Song
Dec 11 '18 at 2:00




$begingroup$
I guess correctly specified version of your question is "if every subnet of a given net has a convergent subsubnet with common limit $L$, then the net in question converges to $L$." Certainly, this statement has a sequence counterpart, and it is obviously true for any sequence. It turns out that it is also true for any net: see math.stackexchange.com/questions/897957/on-nets-convergence.
$endgroup$
– Song
Dec 11 '18 at 2:00










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