Knights are 24/13 times faster than the king

Abstract

On an infinite chess board, how much faster can the knight reach a square when compared to the king, in average? More generally, for coprime b>a ∈ Z≥ 1 such that a+b is odd, define the (a,b)-knight and the king as equation* aligned Na,b = \(a,b), (b,a), (-a,b), (-b,a), (-b,-a), (-a,-b), (a,-b), (b, -a)\, K=\(1,0), (1,1), (0,1), (-1,1), (-1,0), (-1,-1), (0,-1), (1,-1)\ ⊂eq Z2, aligned equation* respectively. One way to formulate this question is by asking for the average ratio, for p∈ Z2 in a box, between \h∈ Z≥ 1 ~|~ p∈ hN\ and \h∈ Z≥ 1 ~|~ p∈ hK\, where hA = \a1+·s+ah ~|~ a1,…, ah ∈ A\ is the h-fold sumset of A. We show that this ratio equals 2(a+b)b2/(a2+3b2).

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