Resonance between planar self-affine measures
Pyörälä, A. (2024). Resonance between planar self-affine measures. Advances in Mathematics, 451, Article 109770. https://doi.org/10.1016/j.aim.2024.109770
Julkaistu sarjassa
Advances in MathematicsPäivämäärä
2024Tekijänoikeudet
© 2024 the Authors
We show that if {ϕi}i∈Γ and {ψj}j∈Λ are self-affine iterated function systems on the plane that satisfy strong separation, domination and irreducibility, then for any associated self-affine measures µ and ν, the inequality
dimH(µ ∗ ν) < min{2, dimH µ + dimH ν}
implies that there is algebraic resonance between the eigenvalues of the linear parts of ϕi and ψj . This extends to planar non-conformal setting the existing analogous results for self-conformal measures on the line.
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The research of this project was conducted as part of the author's doctoral studies at University of Oulu, and has been partly supported by the Research Council of Finland via the project GeoQuantAM: Geometric and Quantitative Analysis on Metric spaces, grant no. 354241.Lisenssi
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