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Questions tagged [non-commutative-theory]

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In this article, after Equation (2.26), it is claimed that: Equations (2.26) remarkably show the decoupling of the U(1) component associated with the generator $t^0 ∝ \mathbf{1}$ The non-planar ...
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So I have been doing some numerics on a 2- band disordered Chern insulator model (QWZ) and have been calculating the non-commutative Chern number given by the formula $ \frac{1}{2\pi i} \Im\Tr P[X,P]...
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I came across the applications of noncommutative (NCG) geometry to quantum field theory (QFT) and quantum gravity (QG). I'm trying to understand the status of the field so that I can evaluate if I ...
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I am just beginning to study string theory, and am reading a bit of literature. Following this, I have a question which is probably not very well framed: I want to know whether string theory is a ...
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We use quantum field theory in condensed matter physics regularly. Let us focus on bosons. Usually, the field theory picture is motivated using a trotterization of the Hamiltonian using the coherent ...
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Levinson's theorem is a fundamental result from the scattering theory of spherically symmetric potentials in ordinary quantum mechanics. It relates the number of bound states $n$ for a given potential ...
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Let $F:\mathbb R ^n\to\mathbb R$ be a function that has a Taylor expansion, then it can be written (expanded at $a$) as $$ F(x)=\sum_{\alpha} \frac{(x_1 - a_1)^{\alpha_1}\dots(x_n - a_n)^{\alpha_n}}{\...
Physor's user avatar
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My question regards an argument appearing on page 19 of the review: Quantum Field Theory on Non-commutative Spaces - Szabo. The Fourier integral kernel representation of the star-product of two fields ...
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In the original paper defining the Seiberg-Witten map, I have been confused about the following step in their derivation. Using the gauge transformation constraint, they write \begin{align*} A'_i (A+ \...
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What is the meaning of the second, third and fourth graph? The image is from arXiv:hep-th/9912072.
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Given the following algebra, $$[\hat{x}_i,\hat{p}_j] = i\hbar\delta_{ij};~[\hat{x}_i,\hat{x}_j] = i\theta_{ij};~[\hat{p}_i,\hat{p}_j] = i\eta_{ij}$$ in a space, where $\theta_{ij},\eta_{ij}$ are ...
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If $\hat{S}_{1}=i \int d^{d} x \mathcal{L}_{I}$ and $$ \begin{aligned} V\left(x_{1}, x_{2}, \ldots, x_{n}\right) & \equiv \int\left[\prod_{j=1}^{n} \frac{d k_{j}}{(2 \pi)^{d}}\right] e^{i k_{\mu}^{...
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In the news report Physicists propose test of quantum gravity using current technology (Lisa Zyga, Phys.org, 27 October 2017), a test is proposed to determine if gravity has a quantum structure. From ...
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From my understanding the Seiberg-Witten map is a way to convert a non-commutative field theory into a commutative field theory. For example for the commutative relation between positions $[x, y]=i \...
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In the literature I have read about non-commutative field theory where the spacetime coordinates obey $$[x_i, x_j] = \theta_{ij}, \quad \theta_{ij} \neq 0.$$ However, I have also non-commutative ...
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