Single-Event Multinomial Full Kelly via Implicit State Positions
Abstract
For a single event with finitely many mutually exclusive outcomes, the full Kelly problem is to maximize expected log wealth over nonnegative stakes together with an optional cash position. The optimal formula is classical, but the support-selection step is often presented via Lagrange multipliers. This note gives a shorter state-price derivation. A cash fraction c acts as an implicit position in every outcome: in terminal-wealth terms, it is equivalent to a baseline stake cqi on outcome i, where qi is the state price. On any active support, explicit bets therefore only top up favorable outcomes from this baseline cqi to the optimal total stake pi. This yields the formula xi = (pi - c qi)+, the threshold rule pi/qi > c, and, after sorting outcomes by pi/qi, a one-pass greedy algorithm for support selection. The result is standard in substance, but the implicit-position viewpoint gives a compact proof and a convenient way to remember the solution.
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