Algebraic intersection in regular polygons
Abstract
We study the function KVol : (X,ω) Vol (X,ω) α,β Int (α,β)lg (α) lg (β) defined on the moduli spaces of translation surfaces. More precisely, let Tn be the Teichm\"uller discs of the original Veech surface (Xn,ωn) arising from right-angled triangle with angles (π/2,π/n,(n-2)π/2n) by the unfolding construction for n≥ 5. For n 1 2 and any (X,ω)∈ Tn, we establish the (sharp) bounds n2 πn ≤ KVol(X,ω) ≤ n2 πn · 1 2πn. The lower bound is uniquely realized at (Xn,ωn).
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