English

3D Koch-type crystals

Metric Geometry 2023-02-23 v2

Abstract

We consider the construction of a family {KN}\{K_N\} of 33-dimensional Koch-type surfaces, with a corresponding family of 33-dimensional Koch-type ``snowflake analogues" {CN}\{\mathcal{C}_N\}, where N>1N>1 are integers with N≢0(mod3)N \not\equiv 0 \,(\bmod\,\, 3). We first establish that the Koch surfaces KNK_N are sNs_N-sets with respect to the sNs_N-dimensional Hausdorff measure, for sN=log(N2+2)/log(N)s_N=\log(N^2+2)/\log(N) the Hausdorff dimension of each Koch-type surface KNK_N. Using self-similarity, one deduces that the same result holds for each Koch-type crystal CN\mathcal{C}_N. We then develop lower and upper approximation monotonic sequences converging to the sNs_N-dimensional Hausdorff measure on each Koch-type surface KNK_N, and consequently, one obtains upper and lower bounds for the Hausdorff measure for each set CN\mathcal{C}_N. As an application, we consider the realization of Robin boundary value problems over the Koch-type crystals CN\mathcal{C}_N, for N>2N>2.

Cite

@article{arxiv.2302.10628,
  title  = {3D Koch-type crystals},
  author = {Giovanni Ferrer and Alejandro Vélez-Santiago},
  journal= {arXiv preprint arXiv:2302.10628},
  year   = {2023}
}

Comments

28 pages

R2 v1 2026-06-28T08:45:30.956Z