Uniform convergence of Hankel transforms

Abstract

We investigate necessary and/or sufficient conditions for the pointwise and uniform convergence of the weighted Hankel transforms Lα,μf(r) = rμ∫0∞ (rt) f(t) jα(rt)\, dt, α≥ -1/2, r≥ 0, where ,μ∈ R are such that 0≤ μ+≤ α+3/2. We subdivide these transforms into two classes in such a way that the uniform convergence criteria is remarkably different on each class. In more detail, we have the transforms satisfying μ+=0 (such as the classical Hankel transform), that generalize the cosine transform, and those satisfying 0<μ+≤ α+3/2, generalizing the sine transform.