What does a cdot/interpunct stand for in a (logical) set notation?











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I'm studying Computation Tree Logic for a course at university. However, I seem to have forgotten an important detail about set builder notation that I haven't found online yet. I'm wondering if this is just a creative notation used by my university.



The formulas I encounter describe formal semantics of CTL in the form of:



$M ,s models p$ iff $p;epsilon ; L(s)$



However, some are more complex, including an interpunct:



$M ,s models AX f$ iff $forallpi;epsilon ; Pi(M,s) cdot M,pi[1] models f$



And below, which defines the set of execution paths for a Kripke structure:



$Pi(M,s) equiv $ { $pi;|;pi[0] = s wedgeforall n ;cdot (pi[n], pi[n+1]);epsilon;R$ }



What does the $cdot$ mean here?










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  • Nothing. It says $M,s vDash AXf$ holds iff "for every $pi$ in $Pi(M,s)$ we have that $M, pi[1] vDash f$ holds".
    – Mauro ALLEGRANZA
    Nov 22 at 14:41












  • @MauroALLEGRANZA If it meant nothing then could it be omitted without changing the formula? Why aren't comma's used then?
    – Zimano
    Nov 22 at 14:41












  • It is not set-builder notation.
    – Mauro ALLEGRANZA
    Nov 22 at 14:43










  • @MauroALLEGRANZA That's another possibility. I'll update my question to include a case where set builder notation was used together with an interpunct. The examples I gave are indeed not written as such.
    – Zimano
    Nov 22 at 14:44












  • Oldish logic texts used notation where periods played a role similar to what we now do with parentheses. This seems to be a remnant.
    – Andrés E. Caicedo
    Nov 22 at 14:51

















up vote
1
down vote

favorite












I'm studying Computation Tree Logic for a course at university. However, I seem to have forgotten an important detail about set builder notation that I haven't found online yet. I'm wondering if this is just a creative notation used by my university.



The formulas I encounter describe formal semantics of CTL in the form of:



$M ,s models p$ iff $p;epsilon ; L(s)$



However, some are more complex, including an interpunct:



$M ,s models AX f$ iff $forallpi;epsilon ; Pi(M,s) cdot M,pi[1] models f$



And below, which defines the set of execution paths for a Kripke structure:



$Pi(M,s) equiv $ { $pi;|;pi[0] = s wedgeforall n ;cdot (pi[n], pi[n+1]);epsilon;R$ }



What does the $cdot$ mean here?










share|cite|improve this question
























  • Nothing. It says $M,s vDash AXf$ holds iff "for every $pi$ in $Pi(M,s)$ we have that $M, pi[1] vDash f$ holds".
    – Mauro ALLEGRANZA
    Nov 22 at 14:41












  • @MauroALLEGRANZA If it meant nothing then could it be omitted without changing the formula? Why aren't comma's used then?
    – Zimano
    Nov 22 at 14:41












  • It is not set-builder notation.
    – Mauro ALLEGRANZA
    Nov 22 at 14:43










  • @MauroALLEGRANZA That's another possibility. I'll update my question to include a case where set builder notation was used together with an interpunct. The examples I gave are indeed not written as such.
    – Zimano
    Nov 22 at 14:44












  • Oldish logic texts used notation where periods played a role similar to what we now do with parentheses. This seems to be a remnant.
    – Andrés E. Caicedo
    Nov 22 at 14:51















up vote
1
down vote

favorite









up vote
1
down vote

favorite











I'm studying Computation Tree Logic for a course at university. However, I seem to have forgotten an important detail about set builder notation that I haven't found online yet. I'm wondering if this is just a creative notation used by my university.



The formulas I encounter describe formal semantics of CTL in the form of:



$M ,s models p$ iff $p;epsilon ; L(s)$



However, some are more complex, including an interpunct:



$M ,s models AX f$ iff $forallpi;epsilon ; Pi(M,s) cdot M,pi[1] models f$



And below, which defines the set of execution paths for a Kripke structure:



$Pi(M,s) equiv $ { $pi;|;pi[0] = s wedgeforall n ;cdot (pi[n], pi[n+1]);epsilon;R$ }



What does the $cdot$ mean here?










share|cite|improve this question















I'm studying Computation Tree Logic for a course at university. However, I seem to have forgotten an important detail about set builder notation that I haven't found online yet. I'm wondering if this is just a creative notation used by my university.



The formulas I encounter describe formal semantics of CTL in the form of:



$M ,s models p$ iff $p;epsilon ; L(s)$



However, some are more complex, including an interpunct:



$M ,s models AX f$ iff $forallpi;epsilon ; Pi(M,s) cdot M,pi[1] models f$



And below, which defines the set of execution paths for a Kripke structure:



$Pi(M,s) equiv $ { $pi;|;pi[0] = s wedgeforall n ;cdot (pi[n], pi[n+1]);epsilon;R$ }



What does the $cdot$ mean here?







logic notation






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share|cite|improve this question













share|cite|improve this question




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edited Nov 22 at 14:48

























asked Nov 22 at 14:38









Zimano

1276




1276












  • Nothing. It says $M,s vDash AXf$ holds iff "for every $pi$ in $Pi(M,s)$ we have that $M, pi[1] vDash f$ holds".
    – Mauro ALLEGRANZA
    Nov 22 at 14:41












  • @MauroALLEGRANZA If it meant nothing then could it be omitted without changing the formula? Why aren't comma's used then?
    – Zimano
    Nov 22 at 14:41












  • It is not set-builder notation.
    – Mauro ALLEGRANZA
    Nov 22 at 14:43










  • @MauroALLEGRANZA That's another possibility. I'll update my question to include a case where set builder notation was used together with an interpunct. The examples I gave are indeed not written as such.
    – Zimano
    Nov 22 at 14:44












  • Oldish logic texts used notation where periods played a role similar to what we now do with parentheses. This seems to be a remnant.
    – Andrés E. Caicedo
    Nov 22 at 14:51




















  • Nothing. It says $M,s vDash AXf$ holds iff "for every $pi$ in $Pi(M,s)$ we have that $M, pi[1] vDash f$ holds".
    – Mauro ALLEGRANZA
    Nov 22 at 14:41












  • @MauroALLEGRANZA If it meant nothing then could it be omitted without changing the formula? Why aren't comma's used then?
    – Zimano
    Nov 22 at 14:41












  • It is not set-builder notation.
    – Mauro ALLEGRANZA
    Nov 22 at 14:43










  • @MauroALLEGRANZA That's another possibility. I'll update my question to include a case where set builder notation was used together with an interpunct. The examples I gave are indeed not written as such.
    – Zimano
    Nov 22 at 14:44












  • Oldish logic texts used notation where periods played a role similar to what we now do with parentheses. This seems to be a remnant.
    – Andrés E. Caicedo
    Nov 22 at 14:51


















Nothing. It says $M,s vDash AXf$ holds iff "for every $pi$ in $Pi(M,s)$ we have that $M, pi[1] vDash f$ holds".
– Mauro ALLEGRANZA
Nov 22 at 14:41






Nothing. It says $M,s vDash AXf$ holds iff "for every $pi$ in $Pi(M,s)$ we have that $M, pi[1] vDash f$ holds".
– Mauro ALLEGRANZA
Nov 22 at 14:41














@MauroALLEGRANZA If it meant nothing then could it be omitted without changing the formula? Why aren't comma's used then?
– Zimano
Nov 22 at 14:41






@MauroALLEGRANZA If it meant nothing then could it be omitted without changing the formula? Why aren't comma's used then?
– Zimano
Nov 22 at 14:41














It is not set-builder notation.
– Mauro ALLEGRANZA
Nov 22 at 14:43




It is not set-builder notation.
– Mauro ALLEGRANZA
Nov 22 at 14:43












@MauroALLEGRANZA That's another possibility. I'll update my question to include a case where set builder notation was used together with an interpunct. The examples I gave are indeed not written as such.
– Zimano
Nov 22 at 14:44






@MauroALLEGRANZA That's another possibility. I'll update my question to include a case where set builder notation was used together with an interpunct. The examples I gave are indeed not written as such.
– Zimano
Nov 22 at 14:44














Oldish logic texts used notation where periods played a role similar to what we now do with parentheses. This seems to be a remnant.
– Andrés E. Caicedo
Nov 22 at 14:51






Oldish logic texts used notation where periods played a role similar to what we now do with parentheses. This seems to be a remnant.
– Andrés E. Caicedo
Nov 22 at 14:51












1 Answer
1






active

oldest

votes

















up vote
1
down vote



accepted










It looks like the dot is just part of the author's notation for quantifiers:



$$ forall x in A cdot varphi(x) $$
means "the property $varphi$ holds for all elements of the set $A$". The dot is just there to separate the $A$ from the $varphi$ (since each of them can be multiple symbols long).



In $forall n cdot (pi[n],pi[n+1]in R$ there is no $in A$ part, but the dot is still there to separate the quantifier from the formula being quantified over.






share|cite|improve this answer





















  • Thanks! I'm starting to understand the usage now looking at the other material. It was pretty evident, but my brain just gooped all over it.
    – Zimano
    Nov 22 at 14:54











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1 Answer
1






active

oldest

votes








1 Answer
1






active

oldest

votes









active

oldest

votes






active

oldest

votes








up vote
1
down vote



accepted










It looks like the dot is just part of the author's notation for quantifiers:



$$ forall x in A cdot varphi(x) $$
means "the property $varphi$ holds for all elements of the set $A$". The dot is just there to separate the $A$ from the $varphi$ (since each of them can be multiple symbols long).



In $forall n cdot (pi[n],pi[n+1]in R$ there is no $in A$ part, but the dot is still there to separate the quantifier from the formula being quantified over.






share|cite|improve this answer





















  • Thanks! I'm starting to understand the usage now looking at the other material. It was pretty evident, but my brain just gooped all over it.
    – Zimano
    Nov 22 at 14:54















up vote
1
down vote



accepted










It looks like the dot is just part of the author's notation for quantifiers:



$$ forall x in A cdot varphi(x) $$
means "the property $varphi$ holds for all elements of the set $A$". The dot is just there to separate the $A$ from the $varphi$ (since each of them can be multiple symbols long).



In $forall n cdot (pi[n],pi[n+1]in R$ there is no $in A$ part, but the dot is still there to separate the quantifier from the formula being quantified over.






share|cite|improve this answer





















  • Thanks! I'm starting to understand the usage now looking at the other material. It was pretty evident, but my brain just gooped all over it.
    – Zimano
    Nov 22 at 14:54













up vote
1
down vote



accepted







up vote
1
down vote



accepted






It looks like the dot is just part of the author's notation for quantifiers:



$$ forall x in A cdot varphi(x) $$
means "the property $varphi$ holds for all elements of the set $A$". The dot is just there to separate the $A$ from the $varphi$ (since each of them can be multiple symbols long).



In $forall n cdot (pi[n],pi[n+1]in R$ there is no $in A$ part, but the dot is still there to separate the quantifier from the formula being quantified over.






share|cite|improve this answer












It looks like the dot is just part of the author's notation for quantifiers:



$$ forall x in A cdot varphi(x) $$
means "the property $varphi$ holds for all elements of the set $A$". The dot is just there to separate the $A$ from the $varphi$ (since each of them can be multiple symbols long).



In $forall n cdot (pi[n],pi[n+1]in R$ there is no $in A$ part, but the dot is still there to separate the quantifier from the formula being quantified over.







share|cite|improve this answer












share|cite|improve this answer



share|cite|improve this answer










answered Nov 22 at 14:51









Henning Makholm

236k16300534




236k16300534












  • Thanks! I'm starting to understand the usage now looking at the other material. It was pretty evident, but my brain just gooped all over it.
    – Zimano
    Nov 22 at 14:54


















  • Thanks! I'm starting to understand the usage now looking at the other material. It was pretty evident, but my brain just gooped all over it.
    – Zimano
    Nov 22 at 14:54
















Thanks! I'm starting to understand the usage now looking at the other material. It was pretty evident, but my brain just gooped all over it.
– Zimano
Nov 22 at 14:54




Thanks! I'm starting to understand the usage now looking at the other material. It was pretty evident, but my brain just gooped all over it.
– Zimano
Nov 22 at 14:54


















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