3D Koch-type crystals

Abstract

We consider the construction of a family \KN\ of 3-dimensional Koch-type surfaces, with a corresponding family of 3-dimensional Koch-type ``snowflake analogues" \CN\, where N>1 are integers with N 0 \,(\,\, 3). We first establish that the Koch surfaces KN are sN-sets with respect to the sN-dimensional Hausdorff measure, for sN=(N2+2)/(N) the Hausdorff dimension of each Koch-type surface KN. Using self-similarity, one deduces that the same result holds for each Koch-type crystal CN. We then develop lower and upper approximation monotonic sequences converging to the sN-dimensional Hausdorff measure on each Koch-type surface KN, and consequently, one obtains upper and lower bounds for the Hausdorff measure for each set CN. As an application, we consider the realization of Robin boundary value problems over the Koch-type crystals CN, for N>2.