On the Area Bounded by the Curve Πk = 1n |x(kπ/n)-y(kπ/n)| = 1

Abstract

For a positive integer n, let Fn*(X, Y) = Πk = 1n(X(kπn) -Y(kπn)). In 2000 Bean and Laugesen proved that for every n ≥ 3 the area bounded by the curve |Fn*(x, y)| = 1 is equal to 41 - 1/nB(12 - 1n, 12), where B(x, y) is the beta function. We provide an elementary proof of this fact based on the polar formula for the area calculation. We also prove that Fn*(X, Y) = 21 - nΣ1 ≤ k ≤ n\ is odd(-1)k - 12nkXn - kYk and demonstrate that n = 2n - 1 - 2(n) is the smallest positive integer such that the binary form n Fn*(X, Y) has integer coefficients. Here 2(n) denotes the 2-adic order of n.