On summation of non-harmonic Fourier series
Abstract
Let a sequence ⊂C be such that the corresponding system of exponential functions E():=\eiλ t\λ∈ is complete and minimal in L2(-π,π) and thus each function f∈ L2(-π,π) corresponds to a non-harmonic Fourier series in E(). We prove that if the generating function G of satisfies Muckenhoupt (A2) condition on R, then this series admits a linear summation method. Recent results show that (A2) condition cannot be omitted.
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