Cover's Rebalancing Option With Discrete Hindsight Optimization
Portfolio Management
2022-10-24 v2 General Economics
Theoretical Economics
Economics
Mathematical Finance
Pricing of Securities
Abstract
We study T. Cover's rebalancing option (Ordentlich and Cover 1998) under discrete hindsight optimization in continuous time. The payoff in question is equal to the final wealth that would have accrued to a \1depositintothebestofsomefinitesetof(perhapslevered)rebalancingrulesdeterminedinhindsight.Arebalancingrule(orfixed−fractionbettingscheme)amountstofixinganassetallocation(i.e.200\%stocksand-100\%bonds)andthencontinuouslyexecutingrebalancingtradestocounteractallocationdrift.Restrictingthehindsightoptimizationtoasmallnumberofrebalancingrules(i.e.2)hassomeadvantagesoverthepioneeringapproachtakenbyCover\&Companyintheirbrillianttheoryofuniversalportfolios(1986,1991,1996,1998),whereone′son−linetradingperformanceisbenchmarkedrelativetothefinalwealthofthebestunleveredrebalancingruleofanykindinhindsight.Ourapproachletspractitionersexpressanaprioriviewthatoneofthefavoredassetallocations("bets")b\in\{b_1,...,b_n\}willturnouttohaveperformedspectacularlywellinhindsight.Inlimitingourrobustnesstosomediscretesetofassetallocations(ratherthanallpossibleassetallocations)wereducethepriceoftherebalancingoptionandguaranteetoachieveacorrespondinglyhigherpercentageofthehindsight−optimizedwealthattheendoftheplanningperiod.Apractitionerwholivestodelta−hedgethisvariantofCover′srebalancingoptionthroughseveraldecadesisguaranteedtoseethedaythathisrealizedcompound−annualcapitalgrowthrateisveryclosetothatofthebestb_i$ in hindsight. Hence the point of the rock-bottom option price.
Cite
@article{arxiv.1903.00829,
title = {Cover's Rebalancing Option With Discrete Hindsight Optimization},
author = {Alex Garivaltis},
journal= {arXiv preprint arXiv:1903.00829},
year = {2022}
}
Comments
This paper has been withdrawn by the author