Convex duality in constrained mean-variance portfolio optimization

Labbé, Chantal; Heunis, Andrew J.

doi:10.1239/aap/1175266470

Cited by 21 publications

(24 citation statements)

References 12 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…, T − 1. Constrained dynamic mean-variance portfolio selection problems with various constraints have been attracting increasing attention in the last decade, e.g., Li, Zhou, and Lim (2002), Zhu, Li, and Wang (2004), Bielecki et al (2005), Sun and Wang (2006), Labbé and Heunis (2007), and Czichowsky and Schweizer (2010). Recently, Czichowsky and Schweizer (2013) further considered cone-constrained continuous-time mean-variance portfolio selection with semimartingale price processes.…”

Section: Optimal Mean-variance Policy In a Discrete-time Cone-constramentioning

confidence: 99%

Mean‐variance Policy for Discrete‐time Cone‐constrained Markets: Time Consistency in Efficiency and the Minimum‐variance Signed Supermartingale Measure

Cui

2015

Mathematical Finance

View full text Add to dashboard Cite

The discrete‐time mean‐variance portfolio selection formulation, which is a representative of general dynamic mean‐risk portfolio selection problems, typically does not satisfy time consistency in efficiency (TCIE), i.e., a truncated precommitted efficient policy may become inefficient for the corresponding truncated problem. In this paper, we analytically investigate the effect of portfolio constraints on the TCIE of convex cone‐constrained markets. More specifically, we derive semi‐analytical expressions for the precommitted efficient mean‐variance policy and the minimum‐variance signed supermartingale measure (VSSM) and examine their relationship. Our analysis shows that the precommitted discrete‐time efficient mean‐variance policy satisfies TCIE if and only if the conditional expectation of the density of the VSSM (with respect to the original probability measure) is nonnegative, or once the conditional expectation becomes negative, it remains at the same negative value until the terminal time. Our finding indicates that the TCIE property depends only on the basic market setting, including portfolio constraints. This motivates us to establish a general procedure for constructing TCIE dynamic portfolio selection problems by introducing suitable portfolio constraints.

show abstract

Section: Optimal Mean-variance Policy In a Discrete-time Cone-constramentioning

confidence: 99%

Mean‐variance Policy for Discrete‐time Cone‐constrained Markets: Time Consistency in Efficiency and the Minimum‐variance Signed Supermartingale Measure

Cui

2015

Mathematical Finance

View full text Add to dashboard Cite

show abstract

“…To see that this can also be handled in our formulation, let C π be a closed-valued predictable correspondence which describes constraints on the cash amounts. Extending [13] and [19], this need not be deterministic. SinceS i > 0, we can define the correspondence C ϑ by C ϑ (ω, t) := diag(S i (ω, t)) −1 C π (ω, t), which is, by Proposition 2.3 again, a closed-valued predictable correspondence and describes by definition the same constraints as C π , but in the number of shares.…”

Section: A Predictable Correspondence With Closed Values and Such Thamentioning

confidence: 99%

“…whereā > 0 and 1/ā are in L ∞ (P),c ∈ L 2 (P), q ∈ R, and C π ≡ K ⊆ R d is a fixed closed and convex set; see Equation (5.2) of [19]. To obtain a solution to this problem, we observe thatāS 0 T (x + G T ( X (C π ))) is convex and closed in L 2 (P), sinceā and 1/ā are in L ∞ (P), and that we can write…”

Section: Existence Of a Solutionmentioning

confidence: 99%

“…In the Itô process framework of Example 3.1 and if F is the P-augmentation of the filtration generated by W , the above dual problem (5.20) for stochastic processes specialises to the dual problem considered in [19,Equation 5.37]; this only requires some adjustments to the notation, along the lines of Remark 4.1(b). Now set G c := G T ( S (C)) so that Lemma 5.4 gives an explicit representation of the support function δ(·|G c ).…”

Section: Remark 52mentioning

confidence: 99%

See 1 more Smart Citation

Convex Duality in Mean-Variance Hedging Under Convex Trading Constraints

Czichowsky

Schweizer

2012

Adv. Appl. Probab.

View full text Add to dashboard Cite

We study mean-variance hedging under portfolio constraints in a general semimartingale model. The constraints are formulated via predictable correspondences, meaning that the trading strategy is restricted to lie in a closed convex set which may depend on the state and time in a predictable way. To obtain the existence of a solution, we first establish the closedness in L 2 of the space of all gains from trade (i.e. the terminal values of stochastic integrals with respect to the price process of the underlying assets). This is a first main contribution which enables us to tackle the problem in a systematic and unified way. In addition, using the closedness allows us to explain and generalise in a systematic way the convex duality results obtained previously by other authors via ad-hoc methods in specific frameworks.

show abstract

“…Czichowsky and Schweizer [5] studied dynamic mean-variance hedging problem with general convex constraints. Labbe and Heunis [11], Sun and Wang [18] considered dynamic mean-variance models with general convex constraints. Gülpinar et al [9] solves multiperiod mean-variance model with presence of transaction costs.…”

Section: Introductionmentioning

confidence: 99%