Multipliers in the scale of periodic Bessel potential spaces with smoothness indices of different signs
Abstract
We prove a general type description result for the multipliers acting between two periodic Bessel potential spaces, defined on the n--dimensional torus, in a case when their smoothness indices are of different signs. This is done through the detailed examination of a periodic analogue of the linear operator Js, which is employed in the definition of the scale of the Bessel potential space defined on the whole space Rn. Our method of defining this periodic analogue of Js uses the results about an asymptotic behaviour of the generalized Fourier coefficients and existence of a natural homeomorphism between the spaces D'(Tn) and S'2 · π(Rn), where the latter consists of all 2 · π--periodic distributions from the dual Schwartz space S'(Rn).
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