Generalized Bessel and Frame Measures

Abstract

Considering a finite Borel measure μ on Rd , a pair of conjugate exponents p, q , and a compatible semi-inner product on Lp(μ) , we introduce (p,q) -Bessel and (p,q) -frame measures as a generalization of the concepts of Bessel and frame measures. In addition, we define notions of q -Bessel and q-frame in the semi-inner product space Lp(μ) . Every finite Borel measure is a (p,q)-Bessel measure for a finite measure μ . We construct a large number of examples of finite measures μ which admit infinite (p,q) -Bessel measures . We show that if is a (p,q) -Bessel/frame measure for μ , then is σ -finite and it is not unique. In fact, by using convolutions of probability measures, one can obtain other (p,q) -Bessel/frame measures for μ . We present a general way of constructing a (p,q) -Bessel/frame measure for a given measure.