Uncertainty principles assert, roughly, that a function and its Fourier transform cannot simultaneously be highly concentrated . Several uncertainty principles have been formulated for complex-valued functions on groups. For finite abelian groups, perhaps the most basic of these is an inequality which relates the sizes of the supports of f and its transform f to the size of the group. In this work, we extend several previously known uncertainty principles for groups; we formulate a general operator-theoretic uncertainty principle for certain bounded operators on L 2 (G) , for G an arbitrary compact groups. Our principle implies that an arbitrary nonzero function in L 2 (G) satisfies[Special characters omitted.] where |·| denotes normalized Haar measure. For finite G , our principle has a nice operator-theoretic corollary. It states that if P and R are projection operators on the group algebra [Special characters omitted.] G , such that P commutes with projection onto elements of G , and R commutes with left-multiplication, then [Special characters omitted.] The aforementioned corollaries extend several previous results, which we discuss in detail. We also provide alternative proofs of our results in the setting of finite groups, using only basic results from representation theory.
