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Is it possible to “mod” the action of a symmetric group on a symmetric operad?

1

$begingroup$

I am relatively new to category theory, so only have a rough understanding of the technicalities behind operads. My understanding is that symmetric operads are defined so that they are "nicely" acted on by the symmetric group.

My question is: Is it possible to alter this action i.e. quotient the action so that a proper subgroup of the symmetric group acts on the operad?

I do not see how this would raise any issues with the definition of the symmetric operad (for example I think you still have equivariance), but am wondering if any technicalities would prevent me from doing this.

group-theory category-theory symmetric-groups group-actions operads

share|cite|improve this question

asked Mar 25 at 22:33

Brendan MalleryBrendan Mallery

61

$endgroup$

• 
  
  
  

  
  2
  

  
  
  
  
  
  

  
  $begingroup$
  For full disclosure, I know nothing about operads. But in all the applications I know of, if a group acts on something, so does any of its proper subgroups, and you don't need to take a quotient to realize this action, it's just a restriction.
  $endgroup$
  – Matt Samuel
  Mar 25 at 22:36
  
  

  
  
  
  


• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  I don't understand the question. An operad consists of various bits which have various symmetric group actions on them. You can certainly take a particular operad and restrict these actions to subgroups. But it sounds like what you want is to alter the definition, to make a new type of operad involving actions by various subgroups of the symmetric groups. Is that right?
  $endgroup$
  – Qiaochu Yuan
  Mar 25 at 23:48
  

  
  
  
  


• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  Yes, that's exactly what I mean. I'm wondering if I can define a new type of operad by somehow altering the action of the symmetric group on a symmetric operad.
  $endgroup$
  – Brendan Mallery
  Mar 26 at 0:25
  

  
  
  
  

add a comment | 

1

$begingroup$

I am relatively new to category theory, so only have a rough understanding of the technicalities behind operads. My understanding is that symmetric operads are defined so that they are "nicely" acted on by the symmetric group.

My question is: Is it possible to alter this action i.e. quotient the action so that a proper subgroup of the symmetric group acts on the operad?

I do not see how this would raise any issues with the definition of the symmetric operad (for example I think you still have equivariance), but am wondering if any technicalities would prevent me from doing this.

group-theory category-theory symmetric-groups group-actions operads

share|cite|improve this question

asked Mar 25 at 22:33

Brendan MalleryBrendan Mallery

61

$endgroup$

• 
  
  
  

  
  2
  

  
  
  
  
  
  

  
  $begingroup$
  For full disclosure, I know nothing about operads. But in all the applications I know of, if a group acts on something, so does any of its proper subgroups, and you don't need to take a quotient to realize this action, it's just a restriction.
  $endgroup$
  – Matt Samuel
  Mar 25 at 22:36
  
  

  
  
  
  


• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  I don't understand the question. An operad consists of various bits which have various symmetric group actions on them. You can certainly take a particular operad and restrict these actions to subgroups. But it sounds like what you want is to alter the definition, to make a new type of operad involving actions by various subgroups of the symmetric groups. Is that right?
  $endgroup$
  – Qiaochu Yuan
  Mar 25 at 23:48
  

  
  
  
  


• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  Yes, that's exactly what I mean. I'm wondering if I can define a new type of operad by somehow altering the action of the symmetric group on a symmetric operad.
  $endgroup$
  – Brendan Mallery
  Mar 26 at 0:25
  

  
  
  
  

add a comment | 

$begingroup$

I am relatively new to category theory, so only have a rough understanding of the technicalities behind operads. My understanding is that symmetric operads are defined so that they are "nicely" acted on by the symmetric group.

My question is: Is it possible to alter this action i.e. quotient the action so that a proper subgroup of the symmetric group acts on the operad?

I do not see how this would raise any issues with the definition of the symmetric operad (for example I think you still have equivariance), but am wondering if any technicalities would prevent me from doing this.

group-theory category-theory symmetric-groups group-actions operads

share|cite|improve this question

asked Mar 25 at 22:33

Brendan MalleryBrendan Mallery

61

$endgroup$

share|cite|improve this question

asked Mar 25 at 22:33

Brendan MalleryBrendan Mallery

61

share|cite|improve this question

asked Mar 25 at 22:33

Brendan MalleryBrendan Mallery

61

asked Mar 25 at 22:33

Brendan MalleryBrendan Mallery

61

asked Mar 25 at 22:33

Brendan MalleryBrendan Mallery

61

1 Answer
1

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oldest

votes

0

$begingroup$

Yes. (This paper formulates extra structure on a sequence $G_0,G_1,dots$ of groups to get a theory analogous to the theory of operads.)

share|cite|improve this answer

answered Apr 1 at 1:29

tcampstcamps

3,2191022

$endgroup$

add a comment | 

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0

$begingroup$

Yes. (This paper formulates extra structure on a sequence $G_0,G_1,dots$ of groups to get a theory analogous to the theory of operads.)

share|cite|improve this answer

answered Apr 1 at 1:29

tcampstcamps

3,2191022

$endgroup$

add a comment | 

0

$begingroup$

Yes. (This paper formulates extra structure on a sequence $G_0,G_1,dots$ of groups to get a theory analogous to the theory of operads.)

share|cite|improve this answer

answered Apr 1 at 1:29

tcampstcamps

3,2191022

$endgroup$

add a comment | 

$begingroup$

Yes. (This paper formulates extra structure on a sequence $G_0,G_1,dots$ of groups to get a theory analogous to the theory of operads.)

share|cite|improve this answer

answered Apr 1 at 1:29

tcampstcamps

3,2191022

$endgroup$

share|cite|improve this answer

answered Apr 1 at 1:29

tcampstcamps

3,2191022

answered Apr 1 at 1:29

tcampstcamps

3,2191022

answered Apr 1 at 1:29

tcampstcamps

3,2191022