Florin P. Boca
Published 1998-03-27, updated 2020-06-02Version 2
For each $\alpha \in (0,1)$, $A_\alpha$ denotes the universal $C^*$-algebra generated by two unitaries $u$ and $v$, which satisfy the commutation relation $uv=\exp (2\pi i\alpha)vu$. We consider the order four automorphism $\sigma$ of $A_\alpha$ defined by $\sigma (u)=v$, $\sigma (v)=u^{-1}$ and describe a method for constructing projections in the fixed point algebra $A_\alpha^\sigma$, using Rieffel's imprimitivity bimodules and Jacobi's theta functions. In the case $\alpha =q^{-1}$, $q\in {\mathbf Z}$, $q\geq 2$, we give explicit formulae for such projections and find a lower bound for the norm of the Harper operator $u+u^* +v+v^*$.
Comments: Fixes some numerical issues in the published version
Journal: Communications in Mathematical Physics 202 (1999), 325-357
K-homology of the rotation algebras $A_θ$
Lower bounds in $L^p$-transference for crossed-products
Appendix to V. Mathai and J. Rosenberg's paper "A noncommutative sigma-model"
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