The inequality of Higman for generalized quadrangles of order (s, t) with s > 1 states that t ≤ s 2 . We generalize this by proving that the intersection number c i of a regular near 2d-gon of order (s, t) with s > 1 satisfies the tight bound c i ≤ (s 2i − 1)/(s 2 − 1), and we give properties in case of equality. It is known that hemisystems in generalized quadrangles meeting the Higman bound induce strongly regular subgraphs. We also generalize this by proving that a similar subset in regular near 2d-gons meeting the bounds would induce a distance-regular graph with classical parameters (d, b, α, β) = (d, −q, −(q + 1)/2, −((−q) d + 1)/2) with q an odd prime power.We refer the reader to Sect. 2 for the definitions of, for instance, (finite) generalized polygons, near polygons, and polar spaces.Feit and Higman [18] showed that (finite) generalized n-gons of order (s, t) = (1, 1) with n ≥ 3 can only exist if n ∈ {3, 4, 6, 8, 12}; if n = 12, then s = 1 or t = 1. If s > 1, then the following inequalities must hold: if n = 4, then t ≤ s 2 [20], if n = 6, then t ≤ s 3 [19], and if n = 8, then t ≤ s 2 [21]. Bose and Shrikhande [5] also proved that if n = 4 and t = s 2 , then for any triple of nonadjacent vertices, the number