Compactness and Spectral Properties of Multiplier Operators in the Walsh System

Abstract

We investigate compactness and spectral properties of multiplier operators associated with the Walsh system in the spaces Lp[0,1], 1<p<∞. Building upon previously established criteria for boundedness of Walsh multipliers, we prove an exact compactness criterion in the Lp Lp regime for all 1<p<∞(assuming boundedness of the multiplier), and also in the Lp L2 regime for 2<p<∞. The key result states that compactness is equivalent to the condition an 0 for the multiplier symbol. We also examine in detail the point spectrum and derive strict spectral inclusions; in the Hilbert space case p=2 we obtain a complete description of the spectrum. For p≠ 2, we emphasize the limitations of transferring "diagonal" arguments and formulate results in a form that does not admit incorrect generalizations.