Date/Time
Date(s) - Wed 2 October
11:00 - 12:00
Location
Cotton Club, Cotton 350, VUW
School of Mathematics and Statistics Research Seminar
Speaker: A/Prof Erick Li (The University of Sydney)
Abstract
Many management decisions involve accumulated random realizations for which the expected value and variance are assumed to be known or can be accurately estimated. We revisit the tail behaviour of such quantities when individual realizations are independent, and we develop new sharper bounds on the tail probability and expected linear loss. Our bounds complement well-established results in the literature, including those based on aggregation, which often fail to take full account of independence and use less elegant proofs. New insights include a proof that in the non-identical case, the distributions attaining the bounds have the equal range property, and that the impact of each random variable on the expected value of the sum can be isolated using an extension of the Korkine identity. We show that the new bounds open up abundant practical applications, including improved pricing of product bundles, more precise option pricing, more efficient insurance design, and better inventory management. For example, we establish a new solution to the optimal bundling problem, yielding a 17% uplift in per-bundle profits, and a new solution to the inventory problem, yielding a 5.6% cost reduction for a model with $20$ retailers.