Complex structure on quantum-braided planes

arXiv - MATH - Quantum Algebra Pub Date : 2024-09-09 DOI:arxiv-2409.05253

Edwin Beggs, Shahn Majid

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Abstract

We construct a quantum Dolbeault double complex $\oplus_{p,q}\Omega^{p,q}$ on the quantum plane $\Bbb C_q^2$. This solves the long-standing problem that the standard differential calculus on the quantum plane is not a $*$-calculus, by embedding it as the holomorphic part of a $*$-calculus. We show in general that any Nichols-Woronowicz algebra or braided plane $B_+(V)$, where $V$ is an object in an abelian $\Bbb C$-linear braided bar category of real type is a quantum complex space in this sense with a factorisable Dolbeault double complex. We combine the Chern construction on $\Omega^{1,0}$ in such a Dolbeault complex for an algebra $A$ with its conjugate to construct a canonical metric compatible connection on $\Omega^1$ associated to a class of quantum metrics, and apply this to the quantum plane. We also apply this to finite groups $G$ with Cayley graph generators split into two halves related by inversion, constructing such a Dolbeault complex $\Omega(G)$ in this case, recovering the quantum Levi-Civita connection for any edge-symmetric metric on the integer lattice with $\Omega(\Bbb Z)$ now viewed as a quantum complex structure. We also show how to build natural quantum metrics on $\Omega^{1,0}$ and $\Omega^{0,1}$ separately where the inner product in the case of the quantum plane, in order to descend to $\otimes_A$, is taken with values in an $A$-bimodule.

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量子编织平面上的复杂结构

我们在量子平面 $\Bbb C_q^2$ 上构造了一个量子多尔贝双复数 $\oplus_{p,q}\Omega^{p,q}$ 。这就解决了一个长期存在的问题，即量子平面上的标准微分计算不是一个 $*$ 计算，方法是把它嵌入到一个 $*$ 计算的全形部分中。我们一般地证明，任何尼科尔斯-沃罗诺维奇代数或编织平面 $B_+(V)$，其中 $V$ 是实型的非比$\Bbb C$ 线性编织条范畴中的一个对象，在这个意义上都是具有可因式多尔贝双复的泛复空间。我们结合在这样一个多尔贝复数中对代数 $A$ 的切尔恩构造及其共轭，在 $\Omega^1$ 上构造了一个与一类量子度量相关的泛函度量兼容连接，并将其应用于量子平面。我们还将其应用于具有卡莱图生成器的无限群 $G$，这些生成器通过反转分成两半，在这种情况下构建了这样一个多尔贝复数 $\Omega(G)$，为整数网格上的任何边对称度量恢复了量子列维-奇维塔连接，而 $\Omega(\BbbZ)$现在被视为一个量子复数结构。我们还展示了如何分别在$\Omega^{1,0}$和$\Omega^{0,1}$上建立自然量子度量，其中量子平面上的内积为了下降到$\otimes_A$，是在$A$-双模块中取值的。

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arXiv - MATH - Quantum Algebra

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