Self-affine measures and vector-valued representations

Qi-Rong Deng, Xing-Gang He, and Ka-Sing Lau. "Self-affine measures and vector-valued representations." Studia Mathematica 188.3 (2008): 259-289. <http://eudml.org/doc/284581>.

@article{Qi2008,
abstract = {Let A be a d × d integral expanding matrix and let $S_\{j\}(x) = A^\{-1\}(x + d_\{j\})$ for some $d_\{j\} ∈ ℤ^\{d\}$, j = 1,...,m. The iterated function system (IFS) $\{S_\{j\}\}_\{j=1\}^\{m\}$ generates self-affine measures and scale functions. In general this IFS has overlaps, and it is well known that in many special cases the analysis of such measures or functions is facilitated by expressing them in vector-valued forms with respect to another IFS that satisfies the open set condition. In this paper we prove a general theorem on such representation. The proof is constructive; it depends on using a tiling IFS $\{ψ_\{j\}\}_\{j=1\}^\{l\}$ to obtain a graph directed system, together with the associated probability on the vertices to form some transition matrices. As applications, we study the dimension and Lebesgue measure of a self-affine set, the $L^\{q\}$-spectrum of a self-similar measure, and the existence of a scaling function (i.e., an L¹-solution of the refinement equation).},
author = {Qi-Rong Deng, Xing-Gang He, Ka-Sing Lau},
journal = {Studia Mathematica},
language = {eng},
number = {3},
pages = {259-289},
title = {Self-affine measures and vector-valued representations},
url = {http://eudml.org/doc/284581},
volume = {188},
year = {2008},
}

TY - JOUR
AU - Qi-Rong Deng
AU - Xing-Gang He
AU - Ka-Sing Lau
TI - Self-affine measures and vector-valued representations
JO - Studia Mathematica
PY - 2008
VL - 188
IS - 3
SP - 259
EP - 289
AB - Let A be a d × d integral expanding matrix and let $S_{j}(x) = A^{-1}(x + d_{j})$ for some $d_{j} ∈ ℤ^{d}$, j = 1,...,m. The iterated function system (IFS) ${S_{j}}_{j=1}^{m}$ generates self-affine measures and scale functions. In general this IFS has overlaps, and it is well known that in many special cases the analysis of such measures or functions is facilitated by expressing them in vector-valued forms with respect to another IFS that satisfies the open set condition. In this paper we prove a general theorem on such representation. The proof is constructive; it depends on using a tiling IFS ${ψ_{j}}_{j=1}^{l}$ to obtain a graph directed system, together with the associated probability on the vertices to form some transition matrices. As applications, we study the dimension and Lebesgue measure of a self-affine set, the $L^{q}$-spectrum of a self-similar measure, and the existence of a scaling function (i.e., an L¹-solution of the refinement equation).
LA - eng
UR - http://eudml.org/doc/284581
ER -