Interpolation of subspaces and applications to exponential bases in Sobolev spaces
Abstract
We give precise conditions under which the real interpolation space [Y0,X1]s,p coincides with a closed subspace of the corresponding interpolation space [X0,X1]s,p when Y0 is a closed subspace of X0 of codimension one. This result is applied to study the basis properties of nonharmonic Fourier series in Sobolev spaces Hs on an interval when 0<s<1. The main result: let E be a family of exponentials exp(i λn t) and E forms an unconditional basis in L2 on an interval. Then there exist two number s0, s1 such that E forms an unconditional basis in Hs for s<s0, E forms an unconditional basis in its span with codimension 1 in Hs for s1<s. For s in [s0,s1] the exponential family is not an unconditional basis in its span.
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