Abstract
               We study L
                  
                     q
                  -spectra of planar self-affine measures generated by diagonal matrices. We introduce a new technique for constructing and understanding examples based on combinatorial estimates for the exponential growth of certain split binomial sums. Using this approach we disprove a theorem of Falconer and Miao from 2007 and a conjecture of Miao from 2008 concerning a closed form expression for the generalised dimensions of generic self-affine measures. We also answer a question of Fraser from 2016 in the negative by proving that a certain natural closed form expression does not generally give the L
                  
                     q
                  -spectrum. As a further application we provide examples of self-affine measures whose L
                  
                     q
                  -spectra exhibit new types of phase transitions. Finally, we provide new non-trivial closed form bounds for the L
                  
                     q
                  -spectra, which in certain cases yield sharp results.</jats:p

Fraser, JM

Lee, LD

Morris, ID

Yu, H

Nonlinearity

Apollo (Cambridge)

L<sup>q</sup>-spectra of self-affine measures: Closed forms, counterexamples, and split binomial sums

Abstract: We study L q -spectra of planar self-affine measures generated by diagonal matrices. We introduce a new technique for constructing and understanding examples based on combinatorial estimates for the exponential growth of certain split binomial sums. Using this approach we disprove a theorem of Falconer and Miao from 2007 and a conjecture of Miao from 2008 concerning a closed form expression for the generalised dimensions of generic self-affine measures. We also answer a question of Fraser from 2016 in the negative by proving that a certain natural closed form expression does not generally give the L q -spectrum. As a further application we provide examples of self-affine measures whose L q -spectra exhibit new types of phase transitions. Finally, we provide new non-trivial closed form bounds for the L q -spectra, which in certain cases yield sharp results

Fraser, Jonathan M

Lee, Lawrence D

Morris, Ian D

Yu, Han

L q -spectra of self-affine measures: closed forms, counterexamples, and split binomial sums

We study Lq-spectra of planar self-affine measures generated by diagonal matrices. We introduce a new technique for constructing and understanding examples based on combinatorial estimates for the exponential growth of certain split binomial sums. Using this approach we disprove a theorem of Falconer and Miao from 2007 and a conjecture of Miao from 2008 concerning a closed form expression for the generalised dimensions of generic self-affine measures. We also answer a question of Fraser from 2016 in the negative by proving that a certain natural closed form expression does not generally give the Lq-spectrum. As a further application we provide examples of self-affine measures whose Lq-spectra exhibit new types of phase transitions. Finally, we provide new nontrivial closed form bounds for the Lq-spectra, which in certain cases yield sharp results

Fraser, Jonathan

Lee, Lawrence D.

Morris, Ian D.

University of St. Andrews - Pure

L<sup>q</sup>-spectra of self-affine measures:closed forms, counterexamples, and split binomial sums

We study Lq-spectra of planar self-affine measures generated by diagonal matrices. We introduce a new technique for constructing and understanding examples based on combinatorial estimates for the exponential growth of certain split binomial sums. Using this approach we disprove a theorem of Falconer and Miao from 2007 and a conjecture of Miao from 2008 concerning a closed form expression for the generalised dimensions of generic self-affine measures. We also answer a question of Fraser from 2016 in the negative by proving that a certain natural closed form expression does not generally give the Lq-spectrum. As a further application we provide examples of self-affine measures whose Lq-spectra exhibit new types of phase transitions. Finally, we provide new non-trivial closed form bounds for the Lq-spectra, which in certain cases yield sharp results

Queen Mary Research Online

Funding: Jonathan Fraser was financially supported by a Leverhulme Trust Research Fellowship (RF-2016-500) and an EPSRC Standard Grant (EP/R015104/1). Lawrence Lee was supported by an EPSRC Doctoral Training Grant (EP/N509759/1). Ian Morris was supported by a Leverhulme Trust Research Project Grant (RPG-2016-194). Han Yu was financially supported by the University of St Andrews.We study Lq-spectra of planar self-affine measures generated by diagonal matrices. We introduce a new technique for constructing and understanding examples based on combinatorial estimates for the exponential growth of certain split binomial sums. Using this approach we disprove a theorem of Falconer and Miao from 2007 and a conjecture of Miao from 2008 concerning a closed form expression for the generalised dimensions of generic self-affine measures. We also answer a question of Fraser from 2016 in the negative by proving that a certain natural closed form expression does not generally give the Lq-spectrum. As a further application we provide examples of self-affine measures whose Lq-spectra exhibit new types of phase transitions. Finally, we provide new nontrivial closed form bounds for the Lq-spectra, which in certain cases yield sharp results.Peer reviewe

St Andrews Research Repository

English

Lq-spectra of self-affine measures : closed forms, counterexamples, and split binomial sums

https://www.repository.cam.ac.uk/bitstream/handle/1810/326329/pdf.pdf?sequence=3&isAllowed=y

L<sup>q</sup>-spectra of self-affine measures: Closed forms, counterexamples, and split binomial sums

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University of St. Andrews - Pure

Queen Mary Research Online

Apollo (Cambridge)

University of St. Andrews - Pure

St Andrews Research Repository