Generalized BMO-type seminorms and vector-valued Sobolev functions
Abstract
We establish a pointwise limit theorem for a broad class of pa\-ra\-me\-ter-\-de\-pen\-dent BMO-type seminorms as the parameter tends to zero. By introducing novel BMO-type seminorms, we provide a unified framework that extends several existing results and yields non-distributional characterizations of Sobolev-type spaces, both in the scalar and in the vector-valued setting. More precisely, for any open set ⊂ Rn and any p∈ (1, ∞), we provide a characterization of the Sobolev space W1,p(; Rm). In addition, we characterize the space E1,p(;Rn) of Lp maps with p-integrable distributional symmetric gradient.\\ Finally, for all p∈ [1, ∞), we show that these seminorms converge to integral functionals with convex, p-homogeneous integrands associated with the distributional gradient and the symmetric gradient.
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