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One-Shot Klein Cutting Planes for Lipschitz Geodesically Convex Optimization in Hyperbolic Space

Published 17 May 2026 in cs.DS | (2605.17540v1)

Abstract: We solve the negative constant-curvature case of the COLT 2023 open problem of Criscitiello, Martínez-Rubio, and Boumal on deterministic first-order methods for Lipschitz geodesically convex optimization. Let [ \HHd_{-\kappaC2}={X\in\R{d+1}:\ipL{X}{X}=-1,\ X_0>0}, \qquad \ip{U}{V}{X}=\kappaC{-2}\ipL{U}{V}, ] so the sectional curvature is $-\kappaC2$. If [ f:\bar B{\HH}(x_0,r)\to\R ] is geodesically convex and $M$-Lipschitz, and $s=\kappaC r$, our one-shot Klein cutting-plane method returns a queried point $\hat x$ with [ f(\hat x)-\min_{\bar B_{\HH}(x_0,r)}f\le \eps Mr ] using at most [ \left\lceil 2d(d+1) \log!\left(\frac{16\sinh s\cosh s}{s\eps}\right)\right\rceil ] oracle calls. For $d\ge2$ each localization update costs $O(d2)$ arithmetic operations; for $d=1$ an interval variant satisfies the same bound. Consequently [ N=O\bigl(d2(s+\log(e/\eps))\bigr) =O\bigl(d2ζ_s\log(e/\eps)\bigr), \qquad ζs=s/\tanh s . ] The argument is not a convex coordinate pullback: in the Beltrami--Klein chart the objective is generally only quasiconvex. The key point is that every Riemannian subgradient halfspace becomes an exact Euclidean central cut. For [ θ=\kappaC\dist(X,Y), ] [ \ip{g}{\log_XY}{X} =\fracθ{\kappaC2\sinhθ}\ipL{g}{Y}, ] and tangency at $X$ turns $\ipL{g}{Y}\le0$ into [ \gbar{\mathsf T}(u-c)\le0, \qquad u=Φ(Y),\quad c=Φ(X). ] Thus a fixed Euclidean ellipsoid localizes the whole hyperbolic ball. The only curvature payment is the Klein distortion factor [ \log\left(\frac{\sinh s\cosh s}{s\eps}\right) =\log(1/\eps)+2s-\log(4s)+O(e{-4s}). ]

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