On the Minkowski measurability of self-similar fractals in Rd

Authors : Ali DENİZ, Şahin KOÇAK, Yunus ÖZDEMİR, Andrei RATİU, Ersin ÜREYEN

Pages : 830-846

Doi:10.3906/mat-1103-20

View : 18 | Download : 5

Publication Date : 0000-00-00

Article Type : Research Paper

Abstract :The question of Minkowski measurability of fractals is investigated for different situations by various authors, notably by M. Lapidus. In dimension one it is known that the attractor of an IFS consisting of similitudes insert ignore into journalissuearticles values(and satisfying a certain open set condition); is Minkowski measurable if and only if the IFS is of non-lattice type and it was conjectured that this would be true also in higher dimensions. Half of this conjecture was proved by Gatzouras in 2000, who showed that the attractor of an IFS insert ignore into journalissuearticles values(satisfying the open set condition); is Minkowski measurable if the IFS is of non-lattice type. M. Lapidus and E. Pearse give in their recent work in 2010 a sketch of proof of this conjecture. We give in this work, under certain conditions needed for the application of the Lapidus-Pearse theory, a complete detailed proof of this conjecture, filling in the gaps and resolving the difficulties appearing in their sketch of proof. We also give an alternative proof of Gatzouras` theorem under the same restrictions and give an explicit formula for the Minkowski content.
Keywords : Self similar fractals, Minkowski measurability, tube formulas