Open AccessSpectral asymptotics of one-dimensional fractal Laplacians in the absence of second-order identities
Author(s) -
Sze-Man Ngai,
Wei Tang,
Yuanyuan Xie
Publication year - 2018
Publication title -
discrete and continuous dynamical systems
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.289
H-Index - 70
eISSN - 1553-5231
pISSN - 1078-0947
DOI - 10.3934/dcds.2018076
Subject(s) - iterated function system , mathematics , measure (data warehouse) , iterated function , fractal , spectral measure , pure mathematics , dimension (graph theory) , laplace operator , order (exchange) , fractal dimension , function (biology) , class (philosophy) , mathematical analysis , computer science , finance , economics , database , evolutionary biology , artificial intelligence , biology
We observe that some self-similar measures defined by finite or infinite iterated function systems with overlaps are in certain sense essentially of finite type, which allows us to extract useful measure-theoretic properties of iterates of the measure. We develop a technique to obtain a closed formula for the spectral dimension of the Laplacian defined by a self-similar measure satisfying this condition. For Laplacians defined by fractal measures with overlaps, spectral dimension has been obtained earlier only for a small class of one-dimensional self-similar measures satisfying Strichartz second-order self-similar identities. The main technique we use relies on the vector-valued renewal theorem proved by Lau, Wang and Chu[ 24 ].
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