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    • CommentRowNumber1.
    • CommentAuthorTobyBartels
    • CommentTimeOct 4th 2009

    Added some formulas and a manifestly relativistic version to action functional.

    I have also been reverting JA's changes to variant conventions of spelling and grammar.

    • CommentRowNumber2.
    • CommentAuthorUrs
    • CommentTimeMay 13th 2010
    • (edited May 13th 2010)

    edited the Idea-section of action functional and Euler-Lagrange equations

    • CommentRowNumber3.
    • CommentAuthorUrs
    • CommentTimeMar 4th 2011

    at action functional I tried to spell out in more detail (jet space) the definition of local action functionals.

    Zoran, there is a bit by you with examples of local action functionals that maybe needs a new introductory sentence. I am not sure if I killed that or what happened. Sorry. Please have a look, I guess you can just add one sentence before the numbered item list.

    • CommentRowNumber4.
    • CommentAuthorzskoda
    • CommentTimeMar 4th 2011

    Urs, thank you for being careful, but I really do not recall what I was saying there. Probably nothing important. If it is it will reemerge somewhere :)

    • CommentRowNumber5.
    • CommentAuthorzskoda
    • CommentTimeMar 4th 2011
    • (edited Mar 4th 2011)

    Just for the record, these are very famous related references on geometry of action functionals and related BV geometry

    • CommentRowNumber6.
    • CommentAuthorHarry Gindi
    • CommentTimeMar 4th 2011
    • (edited Mar 4th 2011)

    The \infty-categorical stuff seems a bit.. out of place, to say the least.

    Also, shouldn’t a line object be the same thing as a ring, or local ring object?

    • CommentRowNumber7.
    • CommentAuthorDavidRoberts
    • CommentTimeMar 5th 2011

    I presume that the line object belongs to an abelian Lawvere theory, so that it has an underlying abelian group, and hence an action of \mathbb{Z}. And once your Lawvere theory contains monoids (i.e. contains an monoid operation), then the line object is, up to assuming the distributive law, a unital (non-commutative) ring. But I am curious as to where one would need to use the local ring part. Perhaps when dealing with homotopy kernels?

    • CommentRowNumber8.
    • CommentAuthorUrs
    • CommentTimeMar 7th 2011

    Also, shouldn’t a line object be the same thing as a ring, or local ring object?

    Yes, line object in the sense described at that link. I made it “additive line object” in order to clarify.

    (The whole entry is a stub. I am hoping to eventually bring it into shape.)

    • CommentRowNumber9.
    • CommentAuthorUrs
    • CommentTimeMar 7th 2011

    (The whole entry is a stub. I am hoping to eventually bring it into shape.)

    I am a bit stuck right this moment, because I am not sure yet how to formulate the notion “critical locus” fully abstractly in a suitable oo-topos.

    • CommentRowNumber10.
    • CommentAuthorHarry Gindi
    • CommentTimeMar 7th 2011

    @Urs: In general, critical loci should be formulated in the same way as closed subschemes (this is how it’s done on algebraic geometry at least).

    • CommentRowNumber11.
    • CommentAuthorUrs
    • CommentTimeMar 7th 2011

    In general, critical loci should be formulated in the same way as closed subschemes (this is how it’s done on algebraic geometry at least).

    I guess you are thinking something like the following:

    for XX a scheme or something and f:X𝔸 1f : X \to \mathbb{A}^1 a function, pass to the 1-form dfd f, regard it as a section df:XT *Xd f : X \to T^* X and then take the fiber of that morphism, i.e. the pullback along the 0-section 0:XT *X0 : X \to T^* X.

    This is clear enough. What I am thinking about is a good general abstract way to say this in an \infty-topos with a minimum of structural assumptions.

    In a cohesive \infty-topos there is a general abstract way to take the differential of a function. But my first guess as to how produce the critical locus of the function by a homotopy fiber of that morphism was not quite right, though, and I haven’t made up my mind yet as to what the right way to go about it is.

    • CommentRowNumber12.
    • CommentAuthorTobias Fritz
    • CommentTimeNov 28th 2012
    I added a query box to the "action functional" entry. I might be missing something, but to me the definition of "local action functional" given on that page seems rather restrictive.

    BTW, am I supposed to announce all changes like this here on the nForum?
    • CommentRowNumber13.
    • CommentAuthorUrs
    • CommentTimeNov 28th 2012
    • (edited Nov 28th 2012)

    Hi Tobias,

    I think what the entry has is the standard definition of what standard literature means by “local action functional” (unless I am overlooking something), but it’s true that it doesn’t capture topological aspects of gauge theories, not to speak of higher gauge theories. Much of standard physics literature ignores all this, by default.

    I have a few ideas of how to formulate things more intrinsically in a (higher) gauge theoretic context, some of which is in published articles. But this is not yet indicated in this entry here. If you are interested, I’d be happy to discuss this further.

    am I supposed to announce all changes like this here on the nForum?

    That’s the optimal way to go at least, as it gives everyone potentially interested here a chance to become aware of the changes and to react to them. That’s how a community process can start that might eventually lead to something good.

    We also stopped, by and large, dropping query boxes in entries, for that kind of reason: discussion in query boxes is hard to follow by bystanders and even by those involved. Usually this forum here is the place where to discuss, and once stable (or semi-stable ) insights have been obtained that deserve to be archived in the nnLab one can move them there.

    • CommentRowNumber14.
    • CommentAuthorUrs
    • CommentTimeNov 28th 2012
    • (edited Nov 28th 2012)

    I have to run now, but one remark maybe to be discussed later: also local connections on a fixed bundle can be written as sections of a bundle. But maybe that’s not what you mean.

    • CommentRowNumber15.
    • CommentAuthorTobias Fritz
    • CommentTimeNov 28th 2012
    @Urs: thanks, but that's clear.

    I was thinking of situations where also the bundle varies. Let's say in Dijkgraaf-Witten theory, which I'm studying at the moment, where the field configurations are the gauge equivalence classes of principal bundles. I don't see how *these* can be written as sections of a fixed bundle. Ah, wait, maybe they can be written as sections of a gerbe?
    • CommentRowNumber16.
    • CommentAuthorUrs
    • CommentTimeNov 28th 2012
    • (edited Nov 28th 2012)

    Yes, in a higher gauge theoretic context DW theory is actually even a sigma-model, meaning that this bundle is trivial. But its fibers are higher homotopy types:

    a field configuration in G gauge theory on Σ\Sigma is a map ΣBG conn\Sigma \to \mathbf{B}G_{conn}.

    • CommentRowNumber17.
    • CommentAuthorUrs
    • CommentTimeNov 28th 2012
    • (edited Nov 28th 2012)

    Sorry, my bus arrived this very second. Here GG is the gauge group and BG conn\mathbf{B}G_{conn} is the moduli stack of GG-principal connections. This is explained for instance at connection on a bundle a bit. For more see at geometry of physics.

    For general GG this is configurations of Chern-Simons theory, Yang-Mills theory, etc. If GG is discrete as for DW theory, then BG connBG\mathbf{B}G_{conn} \simeq \mathbf{B}G collapses to the moduli stack for GG-principal bundles. A field configuration of DW theory is a map ΣBG\Sigma \to \mathbf{B}G, which is aequivalently a GG-principal bundle over Σ\Sigma.

    The extended action functional of CS-theory/DW theory then is, by the way, just the refinement to to differential cohomology of the Pontrygin class / second Chern class

    L:BG connB 3U(1) conn \mathbf{L} \colon \mathbf{B}G_{conn} \to \mathbf{B}^3 U(1)_{conn}

    (or mutliples of that, that’s the “level” of the theory).

    This is the local Lagrangian of CS/DW theory in full gauge theoretic beauty.

    The action evaluated on a field configuration is then the transgression

    exp(i Σ[Σ,L]):[Σ,BG conn][Σ,L][Σ,B 3U(1) conn]exp(i Σ())U(1). \exp(i \int_\Sigma [\Sigma, \mathbf{L}] ) \;\;\colon\;\; [\Sigma , \mathbf{B}G_{conn}] \stackrel{[\Sigma, \mathbf{L}]}{\to} [\Sigma, \mathbf{B}^3 U(1)_{conn}] \stackrel{\exp(i \int_{\Sigma} (-))}{\to} U(1) \,.

    We disucss this a bit in our last article Extended higher cup-product Chern-Simons theories (schreiber).

    • CommentRowNumber18.
    • CommentAuthorTobias Fritz
    • CommentTimeNov 28th 2012
    • (edited Nov 28th 2012)

    Cool! I think I get the rough idea: a principal bundle (with connection) is a morphism ΣBG conn\Sigma\to \mathbf{B}G_{\mathrm{conn}}, so that the collection of all these is the space of field configurations. But such a morphism can also just be regarded as a section of the trivial bundle with fiber BG conn\mathbf{B}G_{\mathrm{conn}}.

    I was about to edit the action functional page, but now I see you’re working on it ;) By the way, the nLab is an incredible valuable resource to study higher category theory!

    • CommentRowNumber19.
    • CommentAuthorUrs
    • CommentTimeNov 28th 2012
    • (edited Nov 28th 2012)

    Yes, exactly!

    (By the way, to turn on math here choose below the edit box the radio button labeled “markdown+itex”).

    Yes, I am editing right now, putting in some of the remarks that I just made. I need just five more minutes or something. Eventually all this will be exposed in some detail at geometry of physics.

    • CommentRowNumber20.
    • CommentAuthorUrs
    • CommentTimeNov 28th 2012

    Okay, I have now expanded a bit at action functional in a new section Extended local action functionals in (higher) gauge theory.

    I’d think this goes in the direction of replying to your query box, so I have taken the liberty and removed it. But let’s further discuss matters here. I can expand on various aspects, if you ask me to.

    • CommentRowNumber21.
    • CommentAuthorTobias Fritz
    • CommentTimeNov 28th 2012

    Thanks! I’m happy with this for the moment and will go back to studying DW-theory.

    I guess I’ll see you and/or some other knowledgeable people in Nijmegen next week. Looking forward!

    • CommentRowNumber22.
    • CommentAuthorUrs
    • CommentTimeNov 28th 2012

    Ah, you’ll be here next week. Great, let’s talk then.