Abstract
For $n \ge 2$, we show that on the standard Poisson homogeneous space $\mathbb{S}^{2n−1}$ (including $SU (2) \approx \mathbb{S}3$), there exists a Poisson scaling $\phi_\lambda$ at any scale $\lambda \gt 0$ that is smooth on each symplectic leaf and continuous globally. A generalization to the case of the standard Bruhat-Poisson compact simple Lie groups endowed with a stronger topology is also valid.
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