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Higher dimensional Bott classes and the stability of rotation relations

Let $Θ=(θ_{jk})_{n\times n}$ be a real skew-symmetric $n\times n$ matrix for $n\geq 2$. Under some mild non-integrality conditions on $Θ,$ we construct Rieffel-type projections as higher dimensional Bott classes in the $n$-dimensional noncommutative torus $\mathcal{A}_Θ.$ These projections generate $\operatorname{K}_0(\mathcal{A}_Θ)$ when $Θ$ is strongly totally irrational. As an application, when $Θ$ is strongly totally irrational, we show that: For any $\varepsilon>0,$ there exists $δ>0$ (depending only on $\varepsilon$ and $Θ$) satisfying the following: For any unital simple separable $C^*$-algebra $\mathcal{A}$ with tracial rank at most one, and for any $n$-tuple of unitaries $u_1,u_2,\dots,u_n$ in $\mathcal{A}$, if $u_1,u_2,\dots,u_n$ satisfy certain trace conditions and \begin{eqnarray*}\|u_ku_j-e^{2πiθ_{jk}}u_ju_k\|<δ,\,j,k=1,2,\dots,n, \end{eqnarray*} then there exists an $n$-tuple of unitaries $\tilde{u}_1,\tilde{u}_2,\dots,\tilde{u}_n$ in $\mathcal{A}$ such that \begin{eqnarray*}\tilde{u}_k\tilde{u}_j=e^{2πiθ_{jk}}\tilde{u}_j\tilde{u}_k\, {\rm and}\, \|\tilde{u}_j-u_j\|<\varepsilon,\, j,k=1,2,\dots,n. \end{eqnarray*} We also show that these trace conditions are also necessary in the above application.