$q$-invariance of quantum quaternion spheres

Bipul Saurabh

arXiv:1510.01862·math.OA·October 8, 2015·1 cites

$q$-invariance of quantum quaternion spheres

Bipul Saurabh

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TL;DR

This paper proves that the $C^*$-algebra of the quantum quaternion sphere $H_q^{2n}$ is isomorphic to that of the quantum sphere $S_q^{4n-1}$ for all $q$ in [0,1), establishing a form of $q$-invariance.

Contribution

It demonstrates the $q$-invariance of the $C^*$-algebra structure of quantum quaternion spheres, extending classical topological results to the noncommutative setting.

Findings

01

$C(H_q^{2n})$ is isomorphic to $C(S_q^{4n-1})$ for all $q eq 1$

02

The $C^*$-algebras for different $q$ are isomorphic, showing $q$-invariance

03

Noncommutative analogue of classical sphere quotient result established

Abstract

The $C^{*}$ -algebra of continuous functions on the quantum quaternion sphere $H_{q}^{2 n}$ can be identified with the quotient algebra $C (S P_{q} (2 n) / S P_{q} (2 n - 2))$ . In commutative case i.e. for $q = 1$ , the topological space $S P (2 n) / S P (2 n - 2)$ is homeomorphic to the odd dimensional sphere $S^{4 n - 1}$ . In this paper, we prove the noncommutative analogue of this result. Using homogeneous $C^{*}$ -extension theory, we prove that the $C^{*}$ -algebra $C (H_{q}^{2 n})$ is isomorphic to the $C^{*}$ -algebra $C (S_{q}^{4 n - 1})$ . This further implies that for different values of $q \in [0, 1)$ , the $C^{*}$ -algebras underlying the noncommutative space $H_{q}^{2 n}$ are isomorphic.

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Taxonomy

TopicsAdvanced Operator Algebra Research · Algebraic structures and combinatorial models · Noncommutative and Quantum Gravity Theories