Chantal Labbé scite author profile

Chantal Labbé

5Publications

115Citation Statements Received

31Citation Statements Given

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HEC Montréal

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Convex duality in constrained mean-variance portfolio optimization

Labbé

Heunis

2007

Adv. Appl. Probab.

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We apply conjugate duality to establish the existence of optimal portfolios in an asset-allocation problem, with the goal of minimizing the variance of the final wealth which results from trading over a fixed, finite horizon in a continuous-time, complete market, subject to the constraints that the expected final wealth equal a specified target value and the portfolio of the investor (defined by the dollar amount invested in each stock) take values in a given closed, convex set. The asset prices are modelled by Itô processes, for which the market parameters are random processes adapted to the information filtration available to the investor. We synthesize a dual optimization problem and establish a set of optimality relations, similar to the Euler-Lagrange and transversality relations of calculus of variations, giving necessary and sufficient conditions for the given optimization problem and its dual to each have a solution, with zero duality gap. We then solve these relations, to establish the existence of an optimal portfolio.

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The expected discounted penalty function under a risk model with stochastic income

Labbé

Sendova

2009

Applied Mathematics and Computation

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Convex duality in constrained mean-variance portfolio optimization

Labbé

Heunis

2007

Advances in Applied Probability

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The Gerber–Shiu function and the generalized Cramér–Lundberg model

Labbé

Sendov

Sendova

2011

Applied Mathematics and Computation

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Conjugate duality in problems of constrained utility maximization

Labbé

Heunis

2009

Stochastics

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Chantal Labbé

Convex duality in constrained mean-variance portfolio optimization

The expected discounted penalty function under a risk model with stochastic income

Convex duality in constrained mean-variance portfolio optimization

The Gerber–Shiu function and the generalized Cramér–Lundberg model

Conjugate duality in problems of constrained utility maximization

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