Few Bilinear Operators on Spaces of Continuous Functions

Abstract

Motivated by recent work exhibiting a locally compact scattered space L constructed under Ostaszewski's -principle, which yielded a complete classification of linear operators on C0(L× L), we extend the analysis to the bilinear setting. We show that, for this space L, every bilinear operator G:C0(L)× C0(L) C0(L) admits a unique decomposition into the sum of trivially predictable components. This establishes a bilinear analogue of the few operators phenomenon.

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