Local Maxima of the Entrywise 4 Norm on the Orthogonal Group
Abstract
We classify the local maximizers of the entrywise fourth-power objective \[ Q Q44 =Σi,j=1r qij4 \] over the real orthogonal group O(r). We prove that the signed permutation matrices are the only local maximizers, and hence the only global maximizers, in every dimension. More strongly, every other stationary point has an explicit rank-two tangent direction with strictly positive second variation. The proof is based on a maximum-entry pivot for the orthostochastic matrix Q2: the associated full Riemannian Hessian can be evaluated exactly and is positive at a largest nonunit squared entry. The argument is self-contained and handles zeros, repeated magnitudes, reducible support, and Hadamard-type stationary points.
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