On the $\ell^s$-boundedness of a family of integral operators

Abstract: Abstract. In this paper we prove an ℓ s -boundedness result for integral operators with operator-valued kernels. The proofs are based on extrapolation techniques with weights due to Rubio de Francia. The results will be applied by the first and third author in a subsequent paper where a new approach to maximal L p -regularity for parabolic problems with time-dependent generator is developed. IntroductionIn the influential work [34,35], Weis has found a characterization of maximal L p -regularity in terms of R-… Show more

“…The above proposition and its corollary remain valid for q = ∞. In this case the norm estimate corresponding to (29) can be obtained in a similar way, from which the unique extendability to a bounded linear operator (29) can be derived via the Fatou property, (10) and the case q = 1. The remaining statements can be established in the same way as for the case q < ∞.…”

“…These two inequalities imply (29) and (30), respectively. Let us finally show that the extension operator ext from Lemma 4.5 (withd = d [i] and a = a [i] , modified in the obvious way to the i-th multidimensional coordinate) restricts to a coretraction for tr [d ;i] .…”

“…Proof of Proposition 4.10. Let us first establish (29) and (30). Thanks to the Sobolev embedding Proposition 5.1 we may restrict ourselves to the case γ ∈ (−1,…”

“…Proof. This can be easily derived from [29,Theorem 2.6], which is a weighted version of the special case of the L p -boundedness of the Banach lattice version of the Hardy-Littlewood maximal function [8,30,58,64] for mixed-norm spaces (also see [29, Remark 2.7]).…”

Maximal regularity with weights for parabolic problems with inhomogeneous boundary conditions

“…The above proposition and its corollary remain valid for q = ∞. In this case the norm estimate corresponding to (29) can be obtained in a similar way, from which the unique extendability to a bounded linear operator (29) can be derived via the Fatou property, (10) and the case q = 1. The remaining statements can be established in the same way as for the case q < ∞.…”

“…These two inequalities imply (29) and (30), respectively. Let us finally show that the extension operator ext from Lemma 4.5 (withd = d [i] and a = a [i] , modified in the obvious way to the i-th multidimensional coordinate) restricts to a coretraction for tr [d ;i] .…”

“…Proof of Proposition 4.10. Let us first establish (29) and (30). Thanks to the Sobolev embedding Proposition 5.1 we may restrict ourselves to the case γ ∈ (−1,…”

“…Proof. This can be easily derived from [29,Theorem 2.6], which is a weighted version of the special case of the L p -boundedness of the Banach lattice version of the Hardy-Littlewood maximal function [8,30,58,64] for mixed-norm spaces (also see [29, Remark 2.7]).…”

Maximal regularity with weights for parabolic problems with inhomogeneous boundary conditions

“…However none of these are applicable to the operator family of {I k : k ∈ K}. Therefore in [12] Gallarati, Veraar and the author show a sufficient condition for the R-boundedness of {I k : k ∈ K} on L p (R; X) in the special case where X = L q . This is done through the notion of ℓ s -boundedness, which states that for all finite sequences…”

The ℓ s-Boundedness of a Family of Integral Operators on UMD Banach Function Spaces

R-boundedness