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Is every bi-invariant Finsler metric on SU(N) Riemanian$SU(N)$ necessarily Riemannian?
If possible I'd also like to know if the right translation of the Shatten $p-norm$ fromon the identityLie algebra gives rise to a bi-invariant metric?
Is every bi-invariant Finsler metric on SU(N) Riemanian?
If possible I'd also like to know if the right translation of the Shatten $p-norm$ from the identity a bi-invariant metric?
Is every bi-invariant Finsler metric on $SU(N)$ necessarily Riemannian?
If possible I'd also like to know if the right translation of the Shatten $p-norm$ on the Lie algebra gives rise to a bi-invariant metric?
More specifically, isIf possible I'd also like to know if the right translation of the Shatten $p-norm$ from the identity a bi-invariant metric?
More specifically, is the right translation of the Shatten $p-norm$ from the identity a bi-invariant metric?
