Identity Involving Lie Derivative and Local Flows
I'm trying to show,
$$ frac{d}{dt} varphi_t^* omega = varphi_t^* left( mathcal{L}_{X_t} omega right)$$
but I have another question as well. Every case in which the lie derivative is mentioned, that notation $mathcal{L}_{X_t}$ has never been given interpretation and so I would like to understand this notation first.
Given $frac{d}{dt}bigr|_{t=0} varphi_t = X_p = X_{varphi_0(p)}$ and so $frac{d}{dt} varphi_t = X_{varphi_t(p)}$ which we can call $X_t$. And so,
$$mathcal{L}_{X_t} = mathcal{L}_{frac{d}{dt} varphi_t}$$
Is this correct?
Update: attempt to prove identity
differential-geometry differential-topology symplectic-geometry
asked yesterday
Topology Guy
133
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I'm trying to show,
$$ frac{d}{dt} varphi_t^* omega = varphi_t^* left( mathcal{L}_{X_t} omega right)$$
but I have another question as well. Every case in which the lie derivative is mentioned, that notation $mathcal{L}_{X_t}$ has never been given interpretation and so I would like to understand this notation first.
Given $frac{d}{dt}bigr|_{t=0} varphi_t = X_p = X_{varphi_0(p)}$ and so $frac{d}{dt} varphi_t = X_{varphi_t(p)}$ which we can call $X_t$. And so,
$$mathcal{L}_{X_t} = mathcal{L}_{frac{d}{dt} varphi_t}$$
Is this correct?
Update: attempt to prove identity
differential-geometry differential-topology symplectic-geometry
asked yesterday
Topology Guy
133
New contributor
Topology Guy is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
When $(varphi_t)_t$ is the local flow of a time-dependent vector field, then $varphi_{t+s}neqvarphi_tcircvarphi_s$.
– C. Falcon
yesterday
I'm sorry, I wasn't clear but, ${varphi_t}$ are induced by $X in mathcal{X}(M)$ and so by ODE theory, we do have this relation.
– Topology Guy
yesterday
Oh, then the identity is really straightforward, see ktoi's answer. However, this is strange to write $X_t$ for a time-independant vector field...
– C. Falcon
yesterday
I updated my "attempt to prove the identity" from some months ago and I came to the understanding that pull-backs commuted with limits. I never checked this off, but you two have helped tremendously and now I can move on.
– Topology Guy
yesterday
add a comment |
I'm trying to show,
$$ frac{d}{dt} varphi_t^* omega = varphi_t^* left( mathcal{L}_{X_t} omega right)$$
but I have another question as well. Every case in which the lie derivative is mentioned, that notation $mathcal{L}_{X_t}$ has never been given interpretation and so I would like to understand this notation first.
Given $frac{d}{dt}bigr|_{t=0} varphi_t = X_p = X_{varphi_0(p)}$ and so $frac{d}{dt} varphi_t = X_{varphi_t(p)}$ which we can call $X_t$. And so,
$$mathcal{L}_{X_t} = mathcal{L}_{frac{d}{dt} varphi_t}$$
Is this correct?
Update: attempt to prove identity
differential-geometry differential-topology symplectic-geometry
asked yesterday
Topology Guy
133
New contributor
Topology Guy is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
I'm trying to show,
$$ frac{d}{dt} varphi_t^* omega = varphi_t^* left( mathcal{L}_{X_t} omega right)$$
but I have another question as well. Every case in which the lie derivative is mentioned, that notation $mathcal{L}_{X_t}$ has never been given interpretation and so I would like to understand this notation first.
Given $frac{d}{dt}bigr|_{t=0} varphi_t = X_p = X_{varphi_0(p)}$ and so $frac{d}{dt} varphi_t = X_{varphi_t(p)}$ which we can call $X_t$. And so,
$$mathcal{L}_{X_t} = mathcal{L}_{frac{d}{dt} varphi_t}$$
Is this correct?
Update: attempt to prove identity
differential-geometry differential-topology symplectic-geometry
differential-geometry differential-topology symplectic-geometry
asked yesterday
Topology Guy
133
New contributor
Topology Guy is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
asked yesterday
Topology Guy
133
New contributor
Topology Guy is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
edited yesterday
asked yesterday
Topology Guy
133
New contributor
Topology Guy is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
asked yesterday
Topology Guy
133
asked yesterday
Topology Guy
133
133
New contributor
Topology Guy is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
New contributor
Topology Guy is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
Topology Guy is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
When $(varphi_t)_t$ is the local flow of a time-dependent vector field, then $varphi_{t+s}neqvarphi_tcircvarphi_s$.
– C. Falcon
yesterday
I'm sorry, I wasn't clear but, ${varphi_t}$ are induced by $X in mathcal{X}(M)$ and so by ODE theory, we do have this relation.
– Topology Guy
yesterday
Oh, then the identity is really straightforward, see ktoi's answer. However, this is strange to write $X_t$ for a time-independant vector field...
– C. Falcon
yesterday
I updated my "attempt to prove the identity" from some months ago and I came to the understanding that pull-backs commuted with limits. I never checked this off, but you two have helped tremendously and now I can move on.
– Topology Guy
yesterday
add a comment |
When $(varphi_t)_t$ is the local flow of a time-dependent vector field, then $varphi_{t+s}neqvarphi_tcircvarphi_s$.
– C. Falcon
yesterday
I'm sorry, I wasn't clear but, ${varphi_t}$ are induced by $X in mathcal{X}(M)$ and so by ODE theory, we do have this relation.
– Topology Guy
yesterday
Oh, then the identity is really straightforward, see ktoi's answer. However, this is strange to write $X_t$ for a time-independant vector field...
– C. Falcon
yesterday
I updated my "attempt to prove the identity" from some months ago and I came to the understanding that pull-backs commuted with limits. I never checked this off, but you two have helped tremendously and now I can move on.
– Topology Guy
yesterday
When $(varphi_t)_t$ is the local flow of a time-dependent vector field, then $varphi_{t+s}neqvarphi_tcircvarphi_s$.
– C. Falcon
yesterday
When $(varphi_t)_t$ is the local flow of a time-dependent vector field, then $varphi_{t+s}neqvarphi_tcircvarphi_s$.
– C. Falcon
yesterday
I'm sorry, I wasn't clear but, ${varphi_t}$ are induced by $X in mathcal{X}(M)$ and so by ODE theory, we do have this relation.
– Topology Guy
yesterday
I'm sorry, I wasn't clear but, ${varphi_t}$ are induced by $X in mathcal{X}(M)$ and so by ODE theory, we do have this relation.
– Topology Guy
yesterday
Oh, then the identity is really straightforward, see ktoi's answer. However, this is strange to write $X_t$ for a time-independant vector field...
– C. Falcon
yesterday
Oh, then the identity is really straightforward, see ktoi's answer. However, this is strange to write $X_t$ for a time-independant vector field...
– C. Falcon
yesterday
I updated my "attempt to prove the identity" from some months ago and I came to the understanding that pull-backs commuted with limits. I never checked this off, but you two have helped tremendously and now I can move on.
– Topology Guy
yesterday
I updated my "attempt to prove the identity" from some months ago and I came to the understanding that pull-backs commuted with limits. I never checked this off, but you two have helped tremendously and now I can move on.
– Topology Guy
yesterday
add a comment |
2 Answers
2
active
oldest
votes
Edit: The following answer assumes $varphi_t$ is the associated flow of $X,$ but for a general flow it is incorrect.
Edit 2: It seems like OP was asking about this case, in which case my answer would apply.
If $omega$ is some tensor field on $M$ and $X$ is a vector field, the Lie derivative is usually defined as,
$$ mathcal{L}_Xomega|_p = left.frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_t^* omega|_p = lim_{t rightarrow 0} frac1tleft(varphi_t^*(omega_{varphi(p)}) - omega_p right), $$
where $varphi_t$ is the associated flow of $X.$
From this, the identity follows essentially by definition, noting you can commute pullbacks with limits. Indeed assuming the flow exists up to some time $t_0,$ we have,
$$left.frac{mathrm{d}}{mathrm{d}t}right|_{t=t_0} varphi_t^*omega = left.frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_{t_0}^* varphi_t^*omega = left.varphi_{t_0}^* frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_t^*omega = varphi_{t_0}^* mathcal{L}_{X}omega. $$
I'll leave you to check the details on a pointwise level.
Now what I wrote isn't the same as what you asked, since I don't have $X_t$ appearing in my expression. I think this is because of how I interpret the pullback, namely I define,
$$ varphi^*omega|_p = varphi^*|_{varphi(p)} omega_{varphi(p)} in E_p,$$
where $E$ is whatever bundle $omega$ is a section of. If you define the pullback differently however, then you may find you'll need to differentiate with respect to $X_t$ when checking the above pointwise.
In general there's nothing special about $X_t = varphi_{-t}^*X$ however, all you're really doing is shifting the points over so everything lands where they should.
answered yesterday
ktoi
2,3131616
You are working with time-independent vector fields, while the question is for time-dependent for vector fields. In the latter case, your definition for the Lie derivative is no longer the right one and furtherfore $(varphi_t)_t$ is no longer a one-parameter subgroup.
– C. Falcon
yesterday
Ah, thanks a lot. I wrote this down some time ago, could you check the edit in my question? Is that the limit thing you are referring to?
– Topology Guy
yesterday
@C.Falcon I think you're right, I assumed $varphi_t$ was the associated flow of a vector field $X$ but reading the question that doesn't seem to be the case (though it's quite unclear what exactly is being asked). I'll edit my answer noting that.
– ktoi
yesterday
@ktoi I'm sorry for the confusion. I made it clear now that $varphi_t$ were induced from $X$. I apologize, as I've been working in the field for the past few months, I assumed a lot of things when asking my question. Thank you both for your help.
– Topology Guy
yesterday
1
@TopologyGuy I see, in that case your attempt seems fine (it is more or less what I posted after all). Since you tagged this question with the sympletic topology tag however, you may also need the time-dependent version at some point (e.g. to prove the Darboux theorem), so knowing about the general case would also be useful.
– ktoi
yesterday
|
show 1 more comment
In order to prove the identity:
$$frac{mathrm{d}}{mathrm{d}t}{varphi_t}^*omega={varphi_t}^*(mathcal{L}_{X_t}omega),$$
Prove that it holds for functions ($0$-forms), it is just the chain rule,
Prove that if it holds for $omega$, then it holds for $mathrm{d}omega$, use that the exterior derivative commutes with the pullback and the Lie derivative,
Prove that if it holds for $omega$ and $omega'$, then it holds for $omegawedgeomega'$, use that the pullback of a wedge product is the wedge product of their pullbacks,
Conclude using that the algebra of differential forms is locally generated as an algebra by functions and differentials of functions.
Full computations can be found in Appendix B of An introduction to Contact Topology by H. Geiges.
answered yesterday
C. Falcon
15.1k41950
Thanks for that. I'm fine with proving the identity that way since you do a similar thing for cartan's homotopy formula $mathcal{L}_X = d iota_X + iota_X d$. I was thinking there was some geometric intuition or "obvious" way to remember the identity, but it seems as though it is one just like the homotopy formula i.e just show that it works for all $k$-forms. Thanks again.
– Topology Guy
yesterday
As a follow up, is my interpretation for $mathcal{L}_{X_t}$ correct?
– Topology Guy
yesterday
add a comment |
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2 Answers
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2 Answers
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Edit: The following answer assumes $varphi_t$ is the associated flow of $X,$ but for a general flow it is incorrect.
Edit 2: It seems like OP was asking about this case, in which case my answer would apply.
If $omega$ is some tensor field on $M$ and $X$ is a vector field, the Lie derivative is usually defined as,
$$ mathcal{L}_Xomega|_p = left.frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_t^* omega|_p = lim_{t rightarrow 0} frac1tleft(varphi_t^*(omega_{varphi(p)}) - omega_p right), $$
where $varphi_t$ is the associated flow of $X.$
From this, the identity follows essentially by definition, noting you can commute pullbacks with limits. Indeed assuming the flow exists up to some time $t_0,$ we have,
$$left.frac{mathrm{d}}{mathrm{d}t}right|_{t=t_0} varphi_t^*omega = left.frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_{t_0}^* varphi_t^*omega = left.varphi_{t_0}^* frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_t^*omega = varphi_{t_0}^* mathcal{L}_{X}omega. $$
I'll leave you to check the details on a pointwise level.
Now what I wrote isn't the same as what you asked, since I don't have $X_t$ appearing in my expression. I think this is because of how I interpret the pullback, namely I define,
$$ varphi^*omega|_p = varphi^*|_{varphi(p)} omega_{varphi(p)} in E_p,$$
where $E$ is whatever bundle $omega$ is a section of. If you define the pullback differently however, then you may find you'll need to differentiate with respect to $X_t$ when checking the above pointwise.
In general there's nothing special about $X_t = varphi_{-t}^*X$ however, all you're really doing is shifting the points over so everything lands where they should.
answered yesterday
ktoi
2,3131616
You are working with time-independent vector fields, while the question is for time-dependent for vector fields. In the latter case, your definition for the Lie derivative is no longer the right one and furtherfore $(varphi_t)_t$ is no longer a one-parameter subgroup.
– C. Falcon
yesterday
Ah, thanks a lot. I wrote this down some time ago, could you check the edit in my question? Is that the limit thing you are referring to?
– Topology Guy
yesterday
@C.Falcon I think you're right, I assumed $varphi_t$ was the associated flow of a vector field $X$ but reading the question that doesn't seem to be the case (though it's quite unclear what exactly is being asked). I'll edit my answer noting that.
– ktoi
yesterday
@ktoi I'm sorry for the confusion. I made it clear now that $varphi_t$ were induced from $X$. I apologize, as I've been working in the field for the past few months, I assumed a lot of things when asking my question. Thank you both for your help.
– Topology Guy
yesterday
1
@TopologyGuy I see, in that case your attempt seems fine (it is more or less what I posted after all). Since you tagged this question with the sympletic topology tag however, you may also need the time-dependent version at some point (e.g. to prove the Darboux theorem), so knowing about the general case would also be useful.
– ktoi
yesterday
|
show 1 more comment
Edit: The following answer assumes $varphi_t$ is the associated flow of $X,$ but for a general flow it is incorrect.
Edit 2: It seems like OP was asking about this case, in which case my answer would apply.
If $omega$ is some tensor field on $M$ and $X$ is a vector field, the Lie derivative is usually defined as,
$$ mathcal{L}_Xomega|_p = left.frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_t^* omega|_p = lim_{t rightarrow 0} frac1tleft(varphi_t^*(omega_{varphi(p)}) - omega_p right), $$
where $varphi_t$ is the associated flow of $X.$
From this, the identity follows essentially by definition, noting you can commute pullbacks with limits. Indeed assuming the flow exists up to some time $t_0,$ we have,
$$left.frac{mathrm{d}}{mathrm{d}t}right|_{t=t_0} varphi_t^*omega = left.frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_{t_0}^* varphi_t^*omega = left.varphi_{t_0}^* frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_t^*omega = varphi_{t_0}^* mathcal{L}_{X}omega. $$
I'll leave you to check the details on a pointwise level.
Now what I wrote isn't the same as what you asked, since I don't have $X_t$ appearing in my expression. I think this is because of how I interpret the pullback, namely I define,
$$ varphi^*omega|_p = varphi^*|_{varphi(p)} omega_{varphi(p)} in E_p,$$
where $E$ is whatever bundle $omega$ is a section of. If you define the pullback differently however, then you may find you'll need to differentiate with respect to $X_t$ when checking the above pointwise.
In general there's nothing special about $X_t = varphi_{-t}^*X$ however, all you're really doing is shifting the points over so everything lands where they should.
answered yesterday
ktoi
2,3131616
You are working with time-independent vector fields, while the question is for time-dependent for vector fields. In the latter case, your definition for the Lie derivative is no longer the right one and furtherfore $(varphi_t)_t$ is no longer a one-parameter subgroup.
– C. Falcon
yesterday
Ah, thanks a lot. I wrote this down some time ago, could you check the edit in my question? Is that the limit thing you are referring to?
– Topology Guy
yesterday
@C.Falcon I think you're right, I assumed $varphi_t$ was the associated flow of a vector field $X$ but reading the question that doesn't seem to be the case (though it's quite unclear what exactly is being asked). I'll edit my answer noting that.
– ktoi
yesterday
@ktoi I'm sorry for the confusion. I made it clear now that $varphi_t$ were induced from $X$. I apologize, as I've been working in the field for the past few months, I assumed a lot of things when asking my question. Thank you both for your help.
– Topology Guy
yesterday
1
@TopologyGuy I see, in that case your attempt seems fine (it is more or less what I posted after all). Since you tagged this question with the sympletic topology tag however, you may also need the time-dependent version at some point (e.g. to prove the Darboux theorem), so knowing about the general case would also be useful.
– ktoi
yesterday
|
show 1 more comment
Edit: The following answer assumes $varphi_t$ is the associated flow of $X,$ but for a general flow it is incorrect.
Edit 2: It seems like OP was asking about this case, in which case my answer would apply.
If $omega$ is some tensor field on $M$ and $X$ is a vector field, the Lie derivative is usually defined as,
$$ mathcal{L}_Xomega|_p = left.frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_t^* omega|_p = lim_{t rightarrow 0} frac1tleft(varphi_t^*(omega_{varphi(p)}) - omega_p right), $$
where $varphi_t$ is the associated flow of $X.$
From this, the identity follows essentially by definition, noting you can commute pullbacks with limits. Indeed assuming the flow exists up to some time $t_0,$ we have,
$$left.frac{mathrm{d}}{mathrm{d}t}right|_{t=t_0} varphi_t^*omega = left.frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_{t_0}^* varphi_t^*omega = left.varphi_{t_0}^* frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_t^*omega = varphi_{t_0}^* mathcal{L}_{X}omega. $$
I'll leave you to check the details on a pointwise level.
Now what I wrote isn't the same as what you asked, since I don't have $X_t$ appearing in my expression. I think this is because of how I interpret the pullback, namely I define,
$$ varphi^*omega|_p = varphi^*|_{varphi(p)} omega_{varphi(p)} in E_p,$$
where $E$ is whatever bundle $omega$ is a section of. If you define the pullback differently however, then you may find you'll need to differentiate with respect to $X_t$ when checking the above pointwise.
In general there's nothing special about $X_t = varphi_{-t}^*X$ however, all you're really doing is shifting the points over so everything lands where they should.
answered yesterday
ktoi
2,3131616
Edit: The following answer assumes $varphi_t$ is the associated flow of $X,$ but for a general flow it is incorrect.
Edit 2: It seems like OP was asking about this case, in which case my answer would apply.
If $omega$ is some tensor field on $M$ and $X$ is a vector field, the Lie derivative is usually defined as,
$$ mathcal{L}_Xomega|_p = left.frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_t^* omega|_p = lim_{t rightarrow 0} frac1tleft(varphi_t^*(omega_{varphi(p)}) - omega_p right), $$
where $varphi_t$ is the associated flow of $X.$
From this, the identity follows essentially by definition, noting you can commute pullbacks with limits. Indeed assuming the flow exists up to some time $t_0,$ we have,
$$left.frac{mathrm{d}}{mathrm{d}t}right|_{t=t_0} varphi_t^*omega = left.frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_{t_0}^* varphi_t^*omega = left.varphi_{t_0}^* frac{mathrm{d}}{mathrm{d}t}right|_{t=0} varphi_t^*omega = varphi_{t_0}^* mathcal{L}_{X}omega. $$
I'll leave you to check the details on a pointwise level.
Now what I wrote isn't the same as what you asked, since I don't have $X_t$ appearing in my expression. I think this is because of how I interpret the pullback, namely I define,
$$ varphi^*omega|_p = varphi^*|_{varphi(p)} omega_{varphi(p)} in E_p,$$
where $E$ is whatever bundle $omega$ is a section of. If you define the pullback differently however, then you may find you'll need to differentiate with respect to $X_t$ when checking the above pointwise.
In general there's nothing special about $X_t = varphi_{-t}^*X$ however, all you're really doing is shifting the points over so everything lands where they should.
answered yesterday
ktoi
2,3131616
edited yesterday
answered yesterday
ktoi
2,3131616
answered yesterday
ktoi
2,3131616
answered yesterday
ktoi
2,3131616
2,3131616
You are working with time-independent vector fields, while the question is for time-dependent for vector fields. In the latter case, your definition for the Lie derivative is no longer the right one and furtherfore $(varphi_t)_t$ is no longer a one-parameter subgroup.
– C. Falcon
yesterday
Ah, thanks a lot. I wrote this down some time ago, could you check the edit in my question? Is that the limit thing you are referring to?
– Topology Guy
yesterday
@C.Falcon I think you're right, I assumed $varphi_t$ was the associated flow of a vector field $X$ but reading the question that doesn't seem to be the case (though it's quite unclear what exactly is being asked). I'll edit my answer noting that.
– ktoi
yesterday
@ktoi I'm sorry for the confusion. I made it clear now that $varphi_t$ were induced from $X$. I apologize, as I've been working in the field for the past few months, I assumed a lot of things when asking my question. Thank you both for your help.
– Topology Guy
yesterday
1
@TopologyGuy I see, in that case your attempt seems fine (it is more or less what I posted after all). Since you tagged this question with the sympletic topology tag however, you may also need the time-dependent version at some point (e.g. to prove the Darboux theorem), so knowing about the general case would also be useful.
– ktoi
yesterday
|
show 1 more comment
You are working with time-independent vector fields, while the question is for time-dependent for vector fields. In the latter case, your definition for the Lie derivative is no longer the right one and furtherfore $(varphi_t)_t$ is no longer a one-parameter subgroup.
– C. Falcon
yesterday
Ah, thanks a lot. I wrote this down some time ago, could you check the edit in my question? Is that the limit thing you are referring to?
– Topology Guy
yesterday
@C.Falcon I think you're right, I assumed $varphi_t$ was the associated flow of a vector field $X$ but reading the question that doesn't seem to be the case (though it's quite unclear what exactly is being asked). I'll edit my answer noting that.
– ktoi
yesterday
@ktoi I'm sorry for the confusion. I made it clear now that $varphi_t$ were induced from $X$. I apologize, as I've been working in the field for the past few months, I assumed a lot of things when asking my question. Thank you both for your help.
– Topology Guy
yesterday
1
@TopologyGuy I see, in that case your attempt seems fine (it is more or less what I posted after all). Since you tagged this question with the sympletic topology tag however, you may also need the time-dependent version at some point (e.g. to prove the Darboux theorem), so knowing about the general case would also be useful.
– ktoi
yesterday
You are working with time-independent vector fields, while the question is for time-dependent for vector fields. In the latter case, your definition for the Lie derivative is no longer the right one and furtherfore $(varphi_t)_t$ is no longer a one-parameter subgroup.
– C. Falcon
yesterday
You are working with time-independent vector fields, while the question is for time-dependent for vector fields. In the latter case, your definition for the Lie derivative is no longer the right one and furtherfore $(varphi_t)_t$ is no longer a one-parameter subgroup.
– C. Falcon
yesterday
Ah, thanks a lot. I wrote this down some time ago, could you check the edit in my question? Is that the limit thing you are referring to?
– Topology Guy
yesterday
Ah, thanks a lot. I wrote this down some time ago, could you check the edit in my question? Is that the limit thing you are referring to?
– Topology Guy
yesterday
@C.Falcon I think you're right, I assumed $varphi_t$ was the associated flow of a vector field $X$ but reading the question that doesn't seem to be the case (though it's quite unclear what exactly is being asked). I'll edit my answer noting that.
– ktoi
yesterday
@C.Falcon I think you're right, I assumed $varphi_t$ was the associated flow of a vector field $X$ but reading the question that doesn't seem to be the case (though it's quite unclear what exactly is being asked). I'll edit my answer noting that.
– ktoi
yesterday
@ktoi I'm sorry for the confusion. I made it clear now that $varphi_t$ were induced from $X$. I apologize, as I've been working in the field for the past few months, I assumed a lot of things when asking my question. Thank you both for your help.
– Topology Guy
yesterday
@ktoi I'm sorry for the confusion. I made it clear now that $varphi_t$ were induced from $X$. I apologize, as I've been working in the field for the past few months, I assumed a lot of things when asking my question. Thank you both for your help.
– Topology Guy
yesterday
1
1
@TopologyGuy I see, in that case your attempt seems fine (it is more or less what I posted after all). Since you tagged this question with the sympletic topology tag however, you may also need the time-dependent version at some point (e.g. to prove the Darboux theorem), so knowing about the general case would also be useful.
– ktoi
yesterday
@TopologyGuy I see, in that case your attempt seems fine (it is more or less what I posted after all). Since you tagged this question with the sympletic topology tag however, you may also need the time-dependent version at some point (e.g. to prove the Darboux theorem), so knowing about the general case would also be useful.
– ktoi
yesterday
|
show 1 more comment
In order to prove the identity:
$$frac{mathrm{d}}{mathrm{d}t}{varphi_t}^*omega={varphi_t}^*(mathcal{L}_{X_t}omega),$$
Prove that it holds for functions ($0$-forms), it is just the chain rule,
Prove that if it holds for $omega$, then it holds for $mathrm{d}omega$, use that the exterior derivative commutes with the pullback and the Lie derivative,
Prove that if it holds for $omega$ and $omega'$, then it holds for $omegawedgeomega'$, use that the pullback of a wedge product is the wedge product of their pullbacks,
Conclude using that the algebra of differential forms is locally generated as an algebra by functions and differentials of functions.
Full computations can be found in Appendix B of An introduction to Contact Topology by H. Geiges.
answered yesterday
C. Falcon
15.1k41950
Thanks for that. I'm fine with proving the identity that way since you do a similar thing for cartan's homotopy formula $mathcal{L}_X = d iota_X + iota_X d$. I was thinking there was some geometric intuition or "obvious" way to remember the identity, but it seems as though it is one just like the homotopy formula i.e just show that it works for all $k$-forms. Thanks again.
– Topology Guy
yesterday
As a follow up, is my interpretation for $mathcal{L}_{X_t}$ correct?
– Topology Guy
yesterday
add a comment |
In order to prove the identity:
$$frac{mathrm{d}}{mathrm{d}t}{varphi_t}^*omega={varphi_t}^*(mathcal{L}_{X_t}omega),$$
Prove that it holds for functions ($0$-forms), it is just the chain rule,
Prove that if it holds for $omega$, then it holds for $mathrm{d}omega$, use that the exterior derivative commutes with the pullback and the Lie derivative,
Prove that if it holds for $omega$ and $omega'$, then it holds for $omegawedgeomega'$, use that the pullback of a wedge product is the wedge product of their pullbacks,
Conclude using that the algebra of differential forms is locally generated as an algebra by functions and differentials of functions.
Full computations can be found in Appendix B of An introduction to Contact Topology by H. Geiges.
answered yesterday
C. Falcon
15.1k41950
Thanks for that. I'm fine with proving the identity that way since you do a similar thing for cartan's homotopy formula $mathcal{L}_X = d iota_X + iota_X d$. I was thinking there was some geometric intuition or "obvious" way to remember the identity, but it seems as though it is one just like the homotopy formula i.e just show that it works for all $k$-forms. Thanks again.
– Topology Guy
yesterday
As a follow up, is my interpretation for $mathcal{L}_{X_t}$ correct?
– Topology Guy
yesterday
add a comment |
In order to prove the identity:
$$frac{mathrm{d}}{mathrm{d}t}{varphi_t}^*omega={varphi_t}^*(mathcal{L}_{X_t}omega),$$
Prove that it holds for functions ($0$-forms), it is just the chain rule,
Prove that if it holds for $omega$, then it holds for $mathrm{d}omega$, use that the exterior derivative commutes with the pullback and the Lie derivative,
Prove that if it holds for $omega$ and $omega'$, then it holds for $omegawedgeomega'$, use that the pullback of a wedge product is the wedge product of their pullbacks,
Conclude using that the algebra of differential forms is locally generated as an algebra by functions and differentials of functions.
Full computations can be found in Appendix B of An introduction to Contact Topology by H. Geiges.
answered yesterday
C. Falcon
15.1k41950
In order to prove the identity:
$$frac{mathrm{d}}{mathrm{d}t}{varphi_t}^*omega={varphi_t}^*(mathcal{L}_{X_t}omega),$$
Prove that it holds for functions ($0$-forms), it is just the chain rule,
Prove that if it holds for $omega$, then it holds for $mathrm{d}omega$, use that the exterior derivative commutes with the pullback and the Lie derivative,
Prove that if it holds for $omega$ and $omega'$, then it holds for $omegawedgeomega'$, use that the pullback of a wedge product is the wedge product of their pullbacks,
Conclude using that the algebra of differential forms is locally generated as an algebra by functions and differentials of functions.
Full computations can be found in Appendix B of An introduction to Contact Topology by H. Geiges.
answered yesterday
C. Falcon
15.1k41950
edited yesterday
answered yesterday
C. Falcon
15.1k41950
answered yesterday
C. Falcon
15.1k41950
answered yesterday
C. Falcon
15.1k41950
15.1k41950
Thanks for that. I'm fine with proving the identity that way since you do a similar thing for cartan's homotopy formula $mathcal{L}_X = d iota_X + iota_X d$. I was thinking there was some geometric intuition or "obvious" way to remember the identity, but it seems as though it is one just like the homotopy formula i.e just show that it works for all $k$-forms. Thanks again.
– Topology Guy
yesterday
As a follow up, is my interpretation for $mathcal{L}_{X_t}$ correct?
– Topology Guy
yesterday
add a comment |
Thanks for that. I'm fine with proving the identity that way since you do a similar thing for cartan's homotopy formula $mathcal{L}_X = d iota_X + iota_X d$. I was thinking there was some geometric intuition or "obvious" way to remember the identity, but it seems as though it is one just like the homotopy formula i.e just show that it works for all $k$-forms. Thanks again.
– Topology Guy
yesterday
As a follow up, is my interpretation for $mathcal{L}_{X_t}$ correct?
– Topology Guy
yesterday
Thanks for that. I'm fine with proving the identity that way since you do a similar thing for cartan's homotopy formula $mathcal{L}_X = d iota_X + iota_X d$. I was thinking there was some geometric intuition or "obvious" way to remember the identity, but it seems as though it is one just like the homotopy formula i.e just show that it works for all $k$-forms. Thanks again.
– Topology Guy
yesterday
Thanks for that. I'm fine with proving the identity that way since you do a similar thing for cartan's homotopy formula $mathcal{L}_X = d iota_X + iota_X d$. I was thinking there was some geometric intuition or "obvious" way to remember the identity, but it seems as though it is one just like the homotopy formula i.e just show that it works for all $k$-forms. Thanks again.
– Topology Guy
yesterday
As a follow up, is my interpretation for $mathcal{L}_{X_t}$ correct?
– Topology Guy
yesterday
As a follow up, is my interpretation for $mathcal{L}_{X_t}$ correct?
– Topology Guy
yesterday
add a comment |
Topology Guy is a new contributor. Be nice, and check out our Code of Conduct.
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When $(varphi_t)_t$ is the local flow of a time-dependent vector field, then $varphi_{t+s}neqvarphi_tcircvarphi_s$.
– C. Falcon
yesterday
I'm sorry, I wasn't clear but, ${varphi_t}$ are induced by $X in mathcal{X}(M)$ and so by ODE theory, we do have this relation.
– Topology Guy
yesterday
Oh, then the identity is really straightforward, see ktoi's answer. However, this is strange to write $X_t$ for a time-independant vector field...
– C. Falcon
yesterday
I updated my "attempt to prove the identity" from some months ago and I came to the understanding that pull-backs commuted with limits. I never checked this off, but you two have helped tremendously and now I can move on.
– Topology Guy
yesterday