Some Intrinsic Characterizations of Besov-Triebel-Lizorkin-Morrey-type Spaces on Lipschitz Domains
Abstract
We give Littlewood-Paley type characterizations for Besov-Triebel-Lizorkin-type spaces Bpqsτ, Fpqsτ and Besov-Morrey spaces Nuqps on a special Lipschitz domain ⊂ Rn: for a suitable sequence of Schwartz functions (φj)j=0∞, \|f\| Bpqsτ()≈P dyadic cubes|P|-τ\|(2jsφj f)j=2(P)∞\|q(Lp( P)); \|f\| Fpqsτ()≈P dyadic cubes|P|-τ\|(2jsφj f)j=2(P)∞\|Lp( P;q); \|f\| Nuqps()≈\|(P dyadic cubes|P|1u-1p· 2js\|φj f\|Lp( P))j=0∞\|q. We also show that \|f\| Bpqsτ(), \|f\| Fpqsτ() and \|f\| Nuqps() have equivalent (quasi-)norms via derivatives: for X∈\ Bpq,τ, Fpq,τ, Nuqp\, we have \|f\| Xs()≈Σ|α| m\|∂α f\| Xs-m(). In particular \|f\| F∞ qs()≈Σ|α| m\|∂α f\| F∞ qs-m()≈P|P|-n/q\|(2jsφj f)j=2(P)∞\|q(Lq( P)) for all 0<q<∞.
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