Bilinear maximal functions associated with degenerate surfaces

Abstract

We study Lp× Lq→ Lr-boundedness of (sub)bilinear maximal functions associated with degenerate hypersurfaces. First, we obtain the maximal bound on the sharp range of exponents p,q,r (except some border line cases) for the bilinear maximal functions given by the model surface \(y,z)∈Rn× Rn:|y|l1+|z|l2=1\, (l1,l2)∈ [1,∞)2, n 2. Our result manifests that nonvanishing Gaussian curvature is not good enough, in contrast with Lp-boundedness of the (sub)linear maximal operator associated to hypersurfaces, to characterize the best possible maximal boundedness. Secondly, we consider the bilinear maximal function associated to the finite type curve in R2 and obtain a complete characterization of the maximal bound. We also prove multilinear generalizations of the aforementioned results.

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