Mixing and rigidity along asymptotically linearly independent sequences
Abstract
We utilize Gaussian measure preserving systems to prove the existence and genericity of Lebesgue measure preserving transformations T:[0,1]→ [0,1] which exhibit both mixing and rigidity behavior along families of asymptotically linearly independent sequences. Let λ1,...,λN∈[0,1] and let φ1,...,φN: N→ Z be asymptotically linearly independent (i.e. for any (a1,...,aN)∈ ZN\ 0\, k→∞|Σj=1Najφj(k)|=∞). Then the class of invertible Lebesgue measure preserving transformations T:[0,1]→[0,1] for which there exists a sequence (nk)k∈ N in N with k→∞μ(A T-φj(nk) B)= (1-λj)μ(A B)+λjμ(A)μ(B), for any measurable A,B⊂eq [0,1] and any j∈\1,...,N\, is generic. This result is a refinement of a result due to A. M. St\"epin (see Theorem 2 in "Spectral properties of generic dynamical systems") and a generalization of a result due to V. Bergelson, S. Kasjan, and M. Lema\'nczyk (see Corollary F in "Polynomial actions of unitary operators and idempotent ultrafilters").
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.