{"title":"Cover基于离散后见之明优化的再平衡选择","authors":"Alex Garivaltis","doi":"10.3905/jod.2021.1.135","DOIUrl":null,"url":null,"abstract":"The author studies 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 an initial deposit of 1 unit of the numéraire into the best of some finite set of (perhaps levered) rebalancing rules determined in hindsight. A rebalancing rule (or fixed-fraction betting scheme) amounts to fixing an asset allocation (i.e., 200% equities and −100% bonds) and then continuously executing rebalancing trades so as to counteract allocation drift. Restricting the hindsight optimization to a small number of rebalancing rules (i.e., 2) has some advantages over the pioneering approach taken by Cover & Company in their theory of universal portfolios (1986, 1991, 1996, 1998), wherein one’s trading performance is benchmarked relative to the final wealth of the best unlevered rebalancing rule (of any kind) in hindsight. Our approach lets practitioners express an a priori view that one of the favored asset allocations (“bets”) in the set {b1, …, bn} will turn out to have performed spectacularly well in hindsight. In limiting our robustness to some discrete set of asset allocations (rather than all possible asset allocations), we reduce the price of the rebalancing option and guarantee that we will achieve a correspondingly higher percentage of the hindsight-optimized wealth at the end of the planning period. A practitioner who lives to delta-hedge this variant of Cover’s rebalancing option through several decades is guaranteed to see the day that his realized compound-annual capital growth rate is very close to that of the best bi in hindsight, hence the point of the rock-bottom option price.","PeriodicalId":501089,"journal":{"name":"The Journal of Derivatives","volume":"48 5","pages":"8-29"},"PeriodicalIF":0.0000,"publicationDate":"2021-04-20","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":"{\"title\":\"Cover’s Rebalancing Option with Discrete Hindsight Optimization\",\"authors\":\"Alex Garivaltis\",\"doi\":\"10.3905/jod.2021.1.135\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"The author studies 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 an initial deposit of 1 unit of the numéraire into the best of some finite set of (perhaps levered) rebalancing rules determined in hindsight. A rebalancing rule (or fixed-fraction betting scheme) amounts to fixing an asset allocation (i.e., 200% equities and −100% bonds) and then continuously executing rebalancing trades so as to counteract allocation drift. Restricting the hindsight optimization to a small number of rebalancing rules (i.e., 2) has some advantages over the pioneering approach taken by Cover & Company in their theory of universal portfolios (1986, 1991, 1996, 1998), wherein one’s trading performance is benchmarked relative to the final wealth of the best unlevered rebalancing rule (of any kind) in hindsight. Our approach lets practitioners express an a priori view that one of the favored asset allocations (“bets”) in the set {b1, …, bn} will turn out to have performed spectacularly well in hindsight. In limiting our robustness to some discrete set of asset allocations (rather than all possible asset allocations), we reduce the price of the rebalancing option and guarantee that we will achieve a correspondingly higher percentage of the hindsight-optimized wealth at the end of the planning period. 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引用次数: 0
摘要
作者研究了连续时间离散后见之明优化下T. Cover的再平衡选择(Ordentlich and Cover 1998)。所讨论的收益等于最初存入1个单位的numsamraire的最终财富,这些财富将累积到一些有限的(可能是杠杆的)后见之明确定的再平衡规则的最佳集合中。再平衡规则(或固定分数投注方案)相当于固定资产配置(即,200%的股票和- 100%的债券),然后不断执行再平衡交易,以抵消分配漂移。将后见之明优化限制在少数再平衡规则(即2)中,比Cover & Company在其通用投资组合理论(1986、1991、1996、1998)中采用的开创性方法有一些优势,其中一个人的交易绩效是相对于后见之明的最佳无杠杆再平衡规则(任何类型)的最终财富进行基准测试的。我们的方法让从业者表达一种先验的观点,即集合{b1,…,bn}中最受青睐的资产配置(“赌注”)之一在事后会表现得非常好。通过将我们的稳健性限制在一些离散的资产配置(而不是所有可能的资产配置)上,我们降低了再平衡选项的价格,并保证在规划期结束时,我们将获得相应更高比例的后见之明优化财富。一个实践者在几十年的时间里通过delta对冲来实现Cover的这种再平衡期权的变体,他肯定会看到有一天,他的已实现的复合年资本增长率非常接近后见之明的最佳水平,因此期权价格才会跌至谷底。
Cover’s Rebalancing Option with Discrete Hindsight Optimization
The author studies 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 an initial deposit of 1 unit of the numéraire into the best of some finite set of (perhaps levered) rebalancing rules determined in hindsight. A rebalancing rule (or fixed-fraction betting scheme) amounts to fixing an asset allocation (i.e., 200% equities and −100% bonds) and then continuously executing rebalancing trades so as to counteract allocation drift. Restricting the hindsight optimization to a small number of rebalancing rules (i.e., 2) has some advantages over the pioneering approach taken by Cover & Company in their theory of universal portfolios (1986, 1991, 1996, 1998), wherein one’s trading performance is benchmarked relative to the final wealth of the best unlevered rebalancing rule (of any kind) in hindsight. Our approach lets practitioners express an a priori view that one of the favored asset allocations (“bets”) in the set {b1, …, bn} will turn out to have performed spectacularly well in hindsight. In limiting our robustness to some discrete set of asset allocations (rather than all possible asset allocations), we reduce the price of the rebalancing option and guarantee that we will achieve a correspondingly higher percentage of the hindsight-optimized wealth at the end of the planning period. A practitioner who lives to delta-hedge this variant of Cover’s rebalancing option through several decades is guaranteed to see the day that his realized compound-annual capital growth rate is very close to that of the best bi in hindsight, hence the point of the rock-bottom option price.