Tropical Fréchet Means
Abstract: The Fr\'echet mean is a key measure of central tendency as a barycenter for a given set of points in a general metric space. It is computed by solving an optimization problem and is a fundamental quantity in statistics. In this paper, we study Fr\'echet means in tropical geometry -- a piecewise linear, combinatorial, and polyhedral variant of algebraic geometry that has gained prominence in applications. A key property of Fr\'echet means is that uniqueness is generally not guaranteed, which is true in tropical settings. In solving the tropical Fr\'echet mean optimization problem, we obtain a geometric characterization of the collection of all Fr\'echet means in a general tropical space as a tropically and classically convex polytope. Furthermore, we prove that a certificate of positivity for finitely many quadratic polynomials in $\mathbb{R}[x_1,\ldots,x_n]$ always exists, given that their quadratic homogeneous components are sums of squares. We propose an algorithm to symbolically compute the Fr\'echet mean polytope based on our exact quadratic optimization result and study its complexity.
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