{"author_url":"https://blog.hatena.ne.jp/chaos_kiyono/","published":"2026-02-18 15:04:24","html":"<iframe src=\"https://hatenablog-parts.com/embed?url=https%3A%2F%2Fchaos-r.hatenadiary.jp%2Fentry%2F2026%2F02%2F18%2F150424\" title=\"Fractal Dimension of Fractional Brownian Motion: Why  D=2\u2212H - Ken-Chaos\u2019s Random Notes on R\" class=\"embed-card embed-blogcard\" scrolling=\"no\" frameborder=\"0\" style=\"display: block; width: 100%; height: 190px; max-width: 500px; margin: 10px 0px;\"></iframe>","height":"190","author_name":"chaos_kiyono","blog_url":"https://chaos-r.hatenadiary.jp/","description":"In a previous post, I introduced the box-counting dimension. In the box-counting method, we cover a graph or a geometric set with boxes (intervals, squares, cubes, or higher-dimensional hypercubes) whose side length is . Some explanations describe placing boxes on a fixed grid, but in general the bo\u2026","title":"Fractal Dimension of Fractional Brownian Motion: Why  D=2\u2212H","provider_url":"https://hatena.blog","type":"rich","url":"https://chaos-r.hatenadiary.jp/entry/2026/02/18/150424","categories":["Fundamentals of Fractal Time Series Analysis"],"blog_title":"Ken-Chaos\u2019s Random Notes on R","image_url":"https://cdn-ak.f.st-hatena.com/images/fotolife/c/chaos_kiyono/20251124/20251124181443.png","provider_name":"Hatena Blog","width":"100%","version":"1.0"}