Frame eversion and contextual geometric rigidity

Abstract

We prove rigidity results describing contextually-constrained maps defined on Grassmannians and manifolds of ordered independent line tuples in finite-dimensional vector or Hilbert spaces. One statement in the spirit of the Fundamental Theorem of Projective Geometry classifies maps between full Grassmannians of two n-dimensional Hilbert spaces, n 3, preserving dimension and lattice operations for pairs with commuting orthogonal projections, as precisely those induced by semilinear injections unique up to scaling. In a different but related direction, denote the manifolds of ordered orthogonal (linearly-independent) n-tuples of lines in an n-dimensional Hilbert space V by F(V) (respectively F(V)) and, for partitions π of the set \1..n\, call two tuples π-linked if the spans along π-blocks agree. A Wigner-style rigidity theorem proves that the symmetric maps F(Cn) F(Cn), n 3 respecting π-linkage are precisely those induced by semilinear injections, hence by linear or conjugate-linear maps if also assumed measurable. On the other hand, in the F(Cn)-defined analogue the only other possibility is a qualitatively new type of purely-contextual-global symmetry transforming a tuple (i)i of lines into ((j ij))i.