A fractal Plancherel theorem
A measure μ on Rn is called locally and uniformly h-dimensional if μ(Br(x)) ≤ h(r) for all x ∈ Rn and for all 0 < r < 1, where h is a real valued function. If f ∈ L2(μ) and Fμf denotes its Fourier transform with respect to μ, it is not true (in general) that Fμf ∈ L2 (e.g. [10]). Howev...
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todo:paper_01471937_v34_n1_p69_Molter2023-10-03T15:00:29Z A fractal Plancherel theorem Molter, U.M. Zuberman, L. Dimension Fourier transform Hausdorff measures Plancherel A measure μ on Rn is called locally and uniformly h-dimensional if μ(Br(x)) ≤ h(r) for all x ∈ Rn and for all 0 < r < 1, where h is a real valued function. If f ∈ L2(μ) and Fμf denotes its Fourier transform with respect to μ, it is not true (in general) that Fμf ∈ L2 (e.g. [10]). However in this paper we prove that, under certain hypothesis on h, for any f ∈ L2(μ) the L2-norm of its Fourier transform restricted to a ball of radius r has the same order of growth as rnh(r-1) when r → ∞. Moreover we prove that the ratio between these quantities is bounded by the L2(μ)-norm of f (Theorem 3.2). By imposing certain restrictions on the measure μ, we can also obtain a lower bound for this ratio (Theorem 4.3). These results generalize the ones obtained by Strichartz in [10] where he considered the particular case in which h(x) = xα. JOUR info:eu-repo/semantics/openAccess http://creativecommons.org/licenses/by/2.5/ar http://hdl.handle.net/20.500.12110/paper_01471937_v34_n1_p69_Molter |
institution |
Universidad de Buenos Aires |
institution_str |
I-28 |
repository_str |
R-134 |
collection |
Biblioteca Digital - Facultad de Ciencias Exactas y Naturales (UBA) |
topic |
Dimension Fourier transform Hausdorff measures Plancherel |
spellingShingle |
Dimension Fourier transform Hausdorff measures Plancherel Molter, U.M. Zuberman, L. A fractal Plancherel theorem |
topic_facet |
Dimension Fourier transform Hausdorff measures Plancherel |
description |
A measure μ on Rn is called locally and uniformly h-dimensional if μ(Br(x)) ≤ h(r) for all x ∈ Rn and for all 0 < r < 1, where h is a real valued function. If f ∈ L2(μ) and Fμf denotes its Fourier transform with respect to μ, it is not true (in general) that Fμf ∈ L2 (e.g. [10]). However in this paper we prove that, under certain hypothesis on h, for any f ∈ L2(μ) the L2-norm of its Fourier transform restricted to a ball of radius r has the same order of growth as rnh(r-1) when r → ∞. Moreover we prove that the ratio between these quantities is bounded by the L2(μ)-norm of f (Theorem 3.2). By imposing certain restrictions on the measure μ, we can also obtain a lower bound for this ratio (Theorem 4.3). These results generalize the ones obtained by Strichartz in [10] where he considered the particular case in which h(x) = xα. |
format |
JOUR |
author |
Molter, U.M. Zuberman, L. |
author_facet |
Molter, U.M. Zuberman, L. |
author_sort |
Molter, U.M. |
title |
A fractal Plancherel theorem |
title_short |
A fractal Plancherel theorem |
title_full |
A fractal Plancherel theorem |
title_fullStr |
A fractal Plancherel theorem |
title_full_unstemmed |
A fractal Plancherel theorem |
title_sort |
fractal plancherel theorem |
url |
http://hdl.handle.net/20.500.12110/paper_01471937_v34_n1_p69_Molter |
work_keys_str_mv |
AT molterum afractalplanchereltheorem AT zubermanl afractalplanchereltheorem AT molterum fractalplanchereltheorem AT zubermanl fractalplanchereltheorem |
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1782025495827709952 |