nLab quantum group Fourier transform

Literature

Quantum group Fourier transform refers to several variants of Fourier transforms attached to Hopf algebras or their analytic versions.

The usual Fourier transform is between functions on locally compact abelian group $G$ and functions on its Pontrjagin dual locally compact abelian group $\hat{G}$ (the group of continuous characters on $G$ with the topology of uniform convergence on compact sets), cf. wikipedia, Pontrjagin duality.

In noncommutative case, the role of Pontrjagin duality is played by a version of Tannaka-Krein duality.

To avoid analytic details for starters, and still to introduce elements of the general story, one can look at the case when $G$ is finite. Then, over a field $k$ , the group Hopf algebra $k \hat{G}$ is isomorphic with the dual Hopf algebra $(k G)^*$ of the group Hopf algebra $k G$ which is itself isomorphic as a Hopf algebra to the function algebra $k(G)$ . The composition is giving the Fourier transform $k \hat{G}\cong k(G)$ , which is a linear map from the convolution algebra of $G$ to the function algebra on $G$ . In such a situation one has a discrete version of Haar measure. Define

\mathcal{F}(h)(u) := \sum_{\chi\in \hat{G}} h (\chi)\chi(u)

\mathcal{F}^{-1}(\phi)(\chi) := \frac{1}{|G|}\sum_{u\in G}\chi(u^{-1})\phi(u)

\Lambda = \sum_{u\in G} u \in k G

\Lambda^* = \sum_{\chi} \chi

where one assumes that $|G|$ is invertible in $k$ . It holds that

$\chi \Lambda^* = \epsilon(\chi)\Lambda^*$ for all $\chi\in k \hat{G}$ and $\Lambda \phi = \Lambda \epsilon(\phi)$ for all $\phi\in k G$ . In other words, $\Lambda$ is a right integral in $k G$ and $\Lambda^*$ is a left integral in $(k G)^*$ .

One can write

\mathcal{F}(h) = \Lambda_{(1)}\langle h, \Lambda_{(2)}\rangle,

for $h\in k \hat{G} = (k G)^*$ (notice the usage of left coregular action) and

\mathcal{F}^{-1}(\phi) = \frac{\Lambda^*_{(1)}\langle \Lambda^*_{(2)},S \phi\rangle}{\langle \Lambda^*, \Lambda \rangle}

for $\phi\in k G$ and where $S: k G\to (k G)^{op,cop}$ is the antipode. These formulas make sense for more general Hopf algebras in duality provided there are appropriate analogues of $\Lambda$ and $\Lambda^*$ and $\langle \Lambda^*, \Lambda\rangle$ is invertible in $k$ . That generalization is called the quantum group Fourier transform.

They can also be related to the fundamental operator in Hopf algebra $H$ , see under multiplicative unitary.

Literature

V. Lyubashenko, Modular transformations and tensor categories, J. Pure Appl. Algebra 98 (1995) 279–327 doi

For an abelian tensor category we investigate a Hopf algebra F in it, the “algebra of functions” or “automorphisms of the identity functor”. We show the existence of the object of integrals for any Hopf algebra in a rigid abelian category. If some assumptions of finiteness and non-degeneracy are satisfied, the Hopf algebra F has an integral and there are morphisms $S, T : F \to F$ , called modular transformations. They yield a representation of a modular group. The properties of $S$ are similar to those of the Fourier transform.

V. Lyubashenko, S. Majid, Fourier transform identities in quantum mechanics and the quantum line, Phys. Lett. B284 (1992) 66-70 doi; Braided groups and quantum Fourier transform, J. Algebra 166 506-28 doi
T H Koornwinder, B J Schroers, J K Slingerland, F A Bais, Fourier transform and the Verlinde formula for the quantum double of a finite group, J. Phys. A32: 48 doi
Shahn Majid, Foundations of quantum group theory, 1995, 2nd. ed 2000
M. Enock, J. M. Schwartz, Kac algebras and duality of locally compact groups, Springer-Verlag, 1992, , x+257 pp. gBooks, MR94e:46001
Massoud Amini, Tannaka–Krein duality for compact groupoids I, Representation theory, Advances in Mathematics 214, n. 1, 2007, 78-91 doi
Laurent Freidel, Shahn Majid, Noncommutative harmonic analysis, sampling theory and the Duflo map in $2+1$ quantum gravity, Classical Quantum Gravity 25 (2008), no. 4, 045006 MR2009f:83058, doi
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Last revised on October 19, 2019 at 18:38:25. See the history of this page for a list of all contributions to it.