Schauder frames of discrete translates in Lp(R)
Abstract
For every p > (1 + 5)/2 we construct a uniformly discrete real sequence \λn\n=1∞ satisfying |λn| = n + o(1), a function g ∈ Lp(R), and continuous linear functionals \g*n\n=1∞ on Lp(R), such that every f ∈ Lp(R) admits a series expansion \[ f(x) = Σn=1∞ gn*(f) g(x-λn) \] convergent in the Lp(R) norm. We moreover show that g can be chosen nonnegative.
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