Full rotational symmetry from reflections or rotational symmetries in finitely many subspaces

Abstract

Two related questions are discussed. The first is when reflection symmetry in a finite set of i-dimensional subspaces, i∈ \1,…,n-1\, implies full rotational symmetry, i.e., the closure of the group generated by the reflections equals O(n). For i=n-1, this has essentially been solved by Burchard, Chambers, and Dranovski, but new results are obtained for i∈ \1,…,n-2\. The second question, to which an essentially complete answer is given, is when (full) rotational symmetry with respect to a finite set of i-dimensional subspaces, i∈ \1,…,n-2\, implies full rotational symmetry, i.e., the closure of the group generated by all the rotations about each of the subspaces equals SO(n). The latter result also shows that a closed set in Rn that is invariant under rotations about more than one axis must be a union of spheres with their centers at the origin.