Sharp Uncertainty Principle for Transitive G-Sets over Arbitrary Fields and Finite Groups
Abstract
For any finite group G, any transitive G-set X and any field F, we consider the vector space FX of all functions from X to F, which is a G-space isomorphic to the permutation F G-module F X. When the group algebra F G is semisimple and split, we find a specific basis X of FX and, for f∈ FX, construct the Fourier transform f∈ F X. We define the rank support rk-supp( f) and prove that rk-supp( f)= F G f, where F G f is the submodule of F X generated by the element f=Σx∈ Xf(x)x. Next, we extend and strengthen the sharpened uncertainty principle for finite abelian groups, established by Feng, Hollmann, and Xiang in 2019, to a broader framework and a sharp version. For 0 f∈ FX, we construct a block X supp(f) of X and a subset S'-\!1 of G determined by the support supp(f) of f, and show that F Gf- F S'-\!1\!f 1 and | supp(f)|· F Gf |X|+ (\! F Gf- F S'-1f) ·| supp(f)| -|X supp(f)|, where F S'-1f denotes the subspace of FX spanned by the subset S'-1f=\α f\,|\,α∈ S'-1\⊂eq F X. We provide necessary and sufficient conditions for the above inequality to achieve equality. As corollaries, we derive many sharpened or classical versions of the finite-dimensional uncertainty principle, address an open question posed by Feng, Hollmann, and Xiang. When |G| is a prime and X=G, we give a lower bound on FGf that recovers Tao's 2005 strong uncertainty principle, along with a precise characterization of the equality case.
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