Large sets avoiding linear patterns
classification
🧮 math.CA
math.COmath.MG
keywords
patternsavoidinglinearapplicationscompactcountabledimensionexists
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We prove that for any dimension function $h$ with $h \prec x^d$ and for any countable set of linear patterns, there exists a compact set $E$ with $\mathcal{H}^h(E)>0$ avoiding all the given patterns. We also give several applications and recover results of Keleti, Maga, and M\'{a}th\'{e}.
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