On the existence of optimizers for time-frequency concentration problems
Abstract
We consider the problem of the maximum concentration in a fixed measurable subset ⊂R2d of the time-frequency space for functions f∈ L2(Rd). The notion of concentration can be made mathematically precise by considering the Lp-norm on of some time-frequency distribution of f such as the ambiguity function A(f). We provide a positive answer to an open maximization problem, by showing that for every subset ⊂R2d of finite measure and every 1≤ p<∞, there exists an optimizer for \[ \\|A(f)\|Lp():\ f∈ L2(Rd),\ \|f\|L2=1 \. \] The lack of weak upper semicontinuity and the invariance under time-frequency shifts make the problem challenging. The proof is based on concentration compactness with time-frequency shifts as dislocations, and certain integral bounds and asymptotic decoupling estimates for the ambiguity function. We also discuss the case p=∞ and related optimization problems for the time correlation function, the cross-ambiguity function with a fixed window, and for functions in the modulation spaces Mq(Rd), 0<q<2, equipped with continuous or discrete-type (quasi-)norms.
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