How Thick Is the Sierpi\'nski Triangle?

Abstract

Although the Sierpi\'nski triangle has planar area 0, it is uniformly non-flat: at every point and every scale, its nearby points span a two-dimensional region of comparable size. We prove a sharp version of this statement, showing that the Feng--Wu thickness of E is exactly 3/6, the inradius of a unit equilateral triangle. More precisely, if E is the standard Sierpi\'nski triangle of side length 1 and B(x,r) denotes the closed disk of radius r centered at x, then for every x∈ E and every 0<r 1, the convex hull of E B(x,r) contains an equilateral triangle of side length r. Consequently, conv(E B(x,r)) contains a closed disk of radius (3/6)r; this constant is best possible. The proof is elementary -- boundary edges of all construction triangles survive in the limit set, and self-similarity reduces the problem to the normalized range 1/2 r 1.