Obata's rigidity theorem in free probability
Abstract
We establish a free analogue of Obata's rigidity theorem. More precisely, Cheng and Zhou (2017) proved that on a weighted Riemannian manifold, the sharp spectral gap (Poincar\'e constant) is achieved only when the space splits isometrically off a one-dimensional Gaussian factor, providing an infinite-dimensional counterpart of Obata's rigidity theorem. We obtain the corresponding phenomenon in free probability, extending it beyond the setting of analytic self-adjoint potentials: Assume a self-adjoint n-tuple X=(X1,…,Xn) admits Lipschitz conjugate variables in the sense of Dabrowski (2014). Under a suitable non-commutative curvature-dimension condition, we show that any non-zero saturator of Voiculescu's free Poincar\'e inequality must be an affine function of the generators. Consequently, we deduce that the von Neumann algebra M=W*(X1,…,Xn) necessarily splits off a freely complemented semicircular component W*(Y1) L∞([-2,2],μ sc), which is also maximal amenable in M. More generally, whenever the first eigenspace of the free Laplacian =∂*∂ is finite-dimensional of rank r 1, our rigidity argument shows that these r extremal directions form a free semicircular family, yielding a free product decomposition with an L(Fr) factor. This provides a free-probability analogue of the classical Gaussian splitting phenomenon and reveals a rigidity mechanism under non-commutative curvature.
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