Functional calculus and semilinear evolution equations for the Taibleson operator on non-Archimedean local fields
Abstract
For any non-Archimedean local field K and any integer n ≥ 1, we show that the Taibleson operator admits a bounded H∞(θ) functional calculus on the Bochner space Lp(Kn,Y) for any UMD Banach function space Y and any angle θ > 0, where θ=\ z ∈ C*: | z| < θ \ and 1 < p < ∞. Moreover, we prove that it even admits a bounded H\"ormander functional calculus of order 32. In our study, we explore harmonic analysis on locally compact Spector-Vilenkin groups and establish the R-boundedness of a family of convolution operators. Our results contribute to the theory of functional calculi for operators acting on vector-valued Lp-spaces over totally disconnected spaces. As an application, we obtain maximal regularity results and well-posedness for a class of evolution equations driven by the Taibleson operator.
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