Questions tagged [chern-simons-theory]
Chern-Simons theory is an example of a topological quantum field theory. Its describes the field dynamics through the so-called Chern-Simons-form, hence its name.
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Chern-Simons Realization of Dijkgraaf-Witten Theory
There is a realization of $Z_N$ Chern-Simons theory (Dijkgraaf-Witten theory) using an instance of $U(1) \times U(1)$ Chern-Simons theory. As explained on page 38 of https://arxiv.org/abs/2007.05915 , ...
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How to Wick rotate differential forms?
The bosonic sector of the Cremmer-Julia-Sherk (CJS) 11D supergravity action is
$$ eR-\frac12 F\wedge *F-\frac16 A\wedge F\wedge F,$$
where $F=dA$ is a 4-form field strength.
How would one perform a ...
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Bulk-edge correspondence in 4D synthetic system
I have been following this paper, which discuss the bulk-edge correspondence in the Harper Model. The Harper model is a model realized on a 2D square lattice, with the following Hamiltonian (see ...
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"Correct" gauge for Chern-Simons terms in 5d?
Consider 5d Einstein-Maxwell-Chern-Simons gravity with action
$$S=\frac{1}{16\pi G}\int d^5x\sqrt{-g}\left[R-\frac{1}{4}F_{\mu\nu}F^{\mu\nu}-\frac{1}{12\sqrt{3}}\frac{\epsilon^{\mu\nu\rho\sigma\lambda}...
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Transformation of Chern-Simons type action under large $SO(4)$ gauge transformation
For the Chern-Simons action
$$S = \kappa \epsilon^{\mu\nu\delta}tr(A_\mu\partial_\nu A_\delta + \frac{2}{3}A_\mu A_\nu A_\delta)$$
under a large gauge transformation
$$A_\mu \rightarrow g^{-1}A_\mu g +...
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What's string operators in a Chern-Simons theory?
In a $\mathbb{Z}_2$ lattice gauge theory or a toric-code model, we have e particles, m particles and their composition, and we have string operators which can create two anyons at the ends of a string,...
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Propagator of four-dimensional Chern-Simons theory
In https://arxiv.org/abs/1903.03601, on page 13, the propagator of 4d Chern-Simons theory is computed, in the gauge $D^iA_i=0$, where $D^i = (\partial_x,\partial_y,4\partial_z)$.
The gauge-fixed ...
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$U(1)$ Chern-Simons from simple integer quantum Hall arguments, basics
I am trying to understand how the Chern-Simons term appear in $U(1)$ effective theory of integer quantum Hall effect (IQHE). I usually read in (90% of) lecture notes "$A dA $ is the Chern-Simons ...
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Derivative of the Chern-Simons form
I want to verify the relation of the Chern-Simons form
$$ d \, \text{tr} (AdA+ \frac{2}{3} AAA) = \text{tr} FF$$
where $\omega \mu\equiv \omega \wedge \mu$ and $F=dA+AA$.
Using the property $d\, \...
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Holography vs edge modes in Chern-Simons theories
There are two facts I have heard about Chern-Simons theories
They are dual to a WZW theory on the boundary (e.g. Relation between CS/WZW and AdS/CFT).
They require a chiral theory on the boundary due ...
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What the role of classical equation of motion in quantum field theory?
I've learnt quantum field theory for a semester but I still can't understand the role of classical equation of motion in QFT.
I have looked up for several books. They all discuss classical field ...
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Quantum Double Model and Chern-Simons with finite gauge group
Is there a relationship between Kitaev's quantum double model for a finite group $ G $ and a Chern Simons theory with finite gauge group $ G $. They are apparently both related to quantum groups and ...
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Can we construct a Chern-Simons theory provided that the ground state is degenerate and gapped, like the Abelian fractional quantum Hall effect?
I am studying the Chern-Simons approach to fractional quantum Hall effect, which a special focus on the topological order in the context of Abelian fractional quantum Hall effect.
To me, the logic to ...
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Knots in 3d pure gravity
Three-dimensional pure gravity on $\mathrm{AdS}_3$ can be described as a Chern-Simons theory with gauge group $\mathrm{SL}(2,\mathbb{R})\times\mathrm{SL}(2,\mathbb{R})$,with action
$$ S[A,\bar{A}] = \...
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Non-abelian Chern-Simons from fermion effective action
(1) Starting from the fermion effective action
$$S_\text{eff}[A,m] = \log \det(i\gamma^\mu{\partial_\mu} + \gamma^\mu A_\mu + m)\tag{223}$$
once can do a loop expansion following https://arxiv.org/abs/...
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Non-Abelian Chern-Simons path integral on a torus
Is it possible to exactly evaluate the Chern-Simons path integral with a non-compact gauge group (say $SU(2)$) on a torus? I am asking this because 3d gravity is an $SL(2,\mathbb{R})$ Chern-Simons ...
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Chern-simons term to total derivative
I'm trying to prove
$$Tr[G_{\mu\nu} \tilde{G}^{\mu\nu}]=2\epsilon^{\mu\nu\rho\sigma}\partial_{\mu}Tr[A_{\nu}G_{\rho\sigma}-\frac{2}{3}iA_{\nu}A_{\rho}A_{\sigma}]$$
expanding the L.H.S.
I don't know ...
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Why can't we define mathematical observables in asymptotic $dS$ or flat space for gravitational theories?
In higher spin currents, the boundary CFT is dual to an asymptotic $AdS$. I have heard that $dS$ is not quantizable. But I don't understand why we want it to be in the first place. Isn't Chern-Simons ...
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Is a Wilson line evaluated in zero cosmological constant equal to correlation functions in 2D CFT's?
The path Integral defined by the Wilson lines over some connection $A\subset Hol$ for correlation functions dominated by the vacuum block is $e^{2iL_0}$ evacuated at <0|$e^{2iL_0}$|0>. Does this ...
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What does it mean for correlation functions to be dominated by the vacuum block for a 2D CFT?
In a 2D CFT, correlation functions dominated by the vacuum block have no conical defects. You can calculate the OPE and determine the correlation function using the D-S equations and cancel out UV ...
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Evaluating the $A \land A \land A$ in the Chern-Simons action
I am trying to evaluate $A \land A \land A$, but I am a bit confused on how exactly to do it and produce the usual notation used in physics. I am trying to use the definition of the wedge product of ...
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Normalization of $U(1)$ gauge fields
In G. W. Moore, “Introduction to Chern-Simons theories.” 2019 TASI School. [Online]. Available: https://www.physics.rutgers.edu/~gmoore/TASI-ChernSimons-StudentNotes.pdf the $U(1)$ gauge field has a ...
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Chern-Simon level quantization and quantum Hall effect
It is well-known that integer and fractional quantum Hall effect can be effectively described by $U(1)$ abelian Chern-Simon theory. In both cases, quantization(fractionalization) of Hall resistance is ...
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Motivation for 3D Quantum Gravity
I was briefly going through the idea of 3d quantum gravity on nLab, where it is stated that:
The case of dimension 3 is noteworthy, because in this case the quantum theory can be and has been fairly ...
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Regarding a possible duality between (2+1)D gravity and Chern-Simons Theory
Is there a duality between (2+1)D gravity and Chern-Simons Theory? Or they merely have related features? If so, of which type and why?
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Is the "Push-Down" Quantization of Chern-Simons Theory part of a more general approach to Quantization?
I've recently started reading Axelrod, Della Pietra and Witten's original paper about the quantization of Chern-Simons theory. I'd like to know if the "push-down" quantization strategy they ...
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Propagator, mass and electrostatic potential of an modified 2+1 dimensional Maxwell action
Consider the modified Maxwell action in 2 + 1 dimensions
$$S=\int d^3x[-\frac{1}{4} F^{\mu\nu} F_{\mu\nu}+\frac{\theta}{2}\epsilon^{\alpha\mu\nu}A_\alpha F_{\mu\nu}] .$$
The action invariant under ...
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Chern-Simons Lagrangian and gauge-fixing
Main question:
Consider (2+1)D Chern-Simons action
$$S = \int dt d^2\mathbf r \frac{k}{4\pi} \epsilon^{\mu\nu\lambda} a_\mu \partial_\nu a_\lambda.$$
Assuming the Coulomb gauge $\nabla\cdot \mathbf a ...
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Are central charges equal or similar to irreducible spinor representations?
First of, if any of the following below does not make sense, please feel free to leave a comment =)
Central charges in Chern Simons in in the Virasoro conformal blocks play an important role for ...
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Chern-Simons term for a non-abelian gauge multiplet
In equation (20.9) of Freedmann and Van Proeyen's Supergravity, it is stated that for the following Chern-Simons term:
$$S_{\mathrm{CS}} = C_{IJK}\int A^I\wedge F^J \wedge F^K$$
to be invariant under ...
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Topological defects in general and Chern-Simons in particular
I'm trying to gain intuition on some physical concepts that I cannot yet fully understand, and I think many of you can help me.
Is it correct to think of of a topological defect as the addition ad hoc ...
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Free homotopy of loops
Given a topological space $X$, a loop based at $x_{0}$ is defined to be a continuous function
$$\gamma \colon [0,1]\to X$$
such that the starting point $γ(0) $ and the end point $γ(1) $ are both equal ...
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Euler-Lagrange equation in a differential form notation
Treating the Lagrangian density as a $d$-form in $d$-dimensional spacetime, how can one write the Euler-Lagrangian equation basis independently in the form notation? If possible, can you also apply ...
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Boundary term for Chern-Simons action
As discussed in David Tong's lecture series on the edge modes in the quantum Hall effect (http://www.damtp.cam.ac.uk/user/tong/qhe.html) (page 203), varying the 2+1D Chern-Simons action yields:
$$\...
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Why is $T^*S^3$ a conifold?
So, I was reading the famous Gopakumar Vafa paper, and they mention that $T^*S^3$ is a conifold. Why is this the case? I would naively expect $T^*S^3$ to be basically the same everywhere ($S^3$ is a ...
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Can one quantize Chern-Simons theory in the covariant phase space formalism?
The covariant phase space, which coincides with the space of solutions to the equations of motion, gives a notion of phase space which does not rely on a decomposition of spacetime of the form $M=\...
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Self-loops in Chern-Simons theory
Consider the dumbbell graph decorated with propagator $P$ one the edges and with integration variables $x$ and $y$ on the vertices.
We associate to it the following integral:
$$ I = \int_{x,y} P(x,x)P(...
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Why doesn't the $3d$ gravitino have a quantized "level"?
The action for the $3d$ gravitino is
$$S_g=-\int d^3x\bar{\Psi}_{\mu}\gamma^{\mu\lambda\nu}\partial_{\lambda}\Psi_{\nu}$$
Where $\gamma^{\mu\lambda\nu}=-\epsilon^{\mu\lambda\nu}$. This has a striking ...
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Topological Quantum Field Theory with Symmetries and Knot Quandles
It is well known that Chern-Simons theory provides an intrinsically three dimensional way to compute knot invariants like the Jones Polynomial. 3D TQFTs also have an algebraic description in terms of ...
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Are Chern-Simons theories classified by bordism groups?
For a long time it was thought that anomalies for a group $G$ were classified by $H^n(BG)$, although it is now understood that they are in fact classified by $\Omega^n(BG)$.
On the other hand, ...
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Chern-Simons Level Quantization for non-compact groups?
Usually for Chern-Simons theory with compact gauge group, which we can take to be $SU(2)$ for simplicity, one has that level $k$ (or coupling) has to be quantized in order for the action to be gauge ...
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Chern number for nonintracing hamiltonian while bands crossing
Is it possible to define and calculate chern number for two bands while they're crossing each other?
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Spontaneous symmetry breaking induced by pure Chern-Simons field?
Maybe this is more of a reference request, but I'd also like an explanation of the example (if there is one). An answer with just a reference would suffice though.
Simply put, are there any known $(2+...
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Chern-Simons, holography, and bibliography
I am looking for review papers / online talks on Chern-Simons theory with particular focus on the gravitational dual description within the AdS/CFT framework.
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Topologically massive $p$-form gauge fields in arbitrary dimensions
$\newcommand{\d}{\mathrm{d}}$In $d=2p+1$ dimensions one can have topologically massive $p$-form abelian gauge fields $A\in\Omega^p(X_{2p+1})$ by considering a Maxwell–Chern–Simons action:
$$S[A] = \...
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Batalin-Vilkovisky (BV) form of the Chern-Simons Action
As seen in Section 4 of Chapter 5 of Costello, K. "Renormalization and Effective Field Theory", or in section 5.2 $L_\infty$-Algebras of Classical Field Theories and the Batalin-Vilkovisky ...
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Verlinde formula requires compact Riemann surface
Assume a Chern-Simons theory on a 3-mfld of the form $\Sigma_g \times S^1$, where $\Sigma_g$ is a Riemann surface of genus $g$. In his paper, Witten shows that one can use the Verlinde formula to get ...
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Chern-Simons theory for FQHE
Recently I have read something about describing FQHE within chern simons field theories. According to Atland's text book,Condensed matter field theory, one can map interacting fermions to composite ...
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Chern-Simons (CS) theory
I have a question about Constructuion of Chern-Simon Action.
In its paper "Non-commutative geometry and string field theory", Witten construct the Action of the String Field Theory inspiring ...
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$F$-symbols for compact Lie groups
Moore and Seiberg (1989) prove that rational CFTs are classified by the braiding matrices
$$
B\begin{bmatrix}j_1&j_2\\i&k
\end{bmatrix}\colon \bigoplus_p V_{j_1p}^i\otimes V_{j_2k}^p\to V_{...
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