On the dimension of orthogonal projections of self-similar measures
Abstract
Let be a self similar measure on Rd, d≥ 2, and let π be an orthogonal projection onto a k-dimensional subspace. We formulate a criterion on the action of the group generated by the orthogonal parts of the IFS on π, and show that it ensures the dimension of π is preserved; this significantly refines previous results by Hochman-Shmerkin (2012) and Falconer-Jin (2014), and is sharp for projections to lines and hyperplanes. A key ingredient in the proof is an application of a restricted projection theorem of Gan-Guo-Wang (2024).
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