Persistency Model and Its Applications in Choice Modeling

Natarajan, Karthik; Song, Miao; Teo, Chung‐Piaw

doi:10.1287/mnsc.1080.0951

Cited by 95 publications

(62 citation statements)

References 14 publications

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“…(a) The proof of Theorem 1 is inspired from the proofs in Bertsimas et al (2006) and Natarajan et al (2009b) for univariate marginals and Doan and Natarajan (2012) for nonoverlapping multivariate marginals. Theorem 1 extends these results to overlapping multivariate marginals.…”

Section: Then the Fréchet Boundmentioning

confidence: 99%

Robustness to Dependency in Portfolio Optimization Using Overlapping Marginals

Doan

Natarajan

2015

Operations Research

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In this paper, we develop a distributionally robust portfolio optimization model where the robustness is across different dependency structures among the random losses. For a Fréchet class of discrete distributions with overlapping marginals, we show that the distributionally robust portfolio optimization problem is efficiently solvable with linear programming. To guarantee the existence of a joint multivariate distribution consistent with the overlapping marginal information, we make use of a graph theoretic property known as the running intersection property. Building on this property, we develop a tight linear programming formulation to find the optimal portfolio that minimizes the worst-case Conditional Value-at-Risk measure. Lastly, we use a data-driven approach with financial return data to identify the Fréchet class of distributions satisfying the running intersection property and then optimize the portfolio over this class of distributions. Numerical results in two different datasets show that the distributionally robust portfolio optimization model improves on the sample-based approach

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Section: Then the Fréchet Boundmentioning

confidence: 99%

Robustness to Dependency in Portfolio Optimization Using Overlapping Marginals

Doan

Natarajan

2015

Operations Research

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“…Recently, a new class of semi-parametric choice model (SCM) was proposed by Natarajan et al (2009). Unlike the random utility model where a certain distribution of the random utility ǫ is specified, in the semi-parametric choice model, one considers a set of distributions Θ for ǫ.…”

Section: Semi-parametric Choice Modelmentioning

confidence: 99%

“…In the representative agent model, there is again a utility associated with each alternative, and the representative agent maximizes a weighted utility of the choice (which is a vector of proportions for each alternative) plus a regularization term, which typically encourages diversification of the choice (Anderson et al 1988). More recently, a class of semi-parametric models has been proposed (see Natarajan et al 2009). This model is similar to the random utility model.…”

Section: Introductionmentioning

confidence: 99%

Analysis of Discrete Choice Models: A Welfare-Based Framework

Feng

Wang

2015

SSRN Journal

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“…Then for instance, one might be interested to determine whether in an optimal solution x * (y) of P y , and for some index i ∈ I, one has x * i (y) = 1 (or x * i (y) = 0) for almost all values of the parameter y ∈ Y. In [3,17] the probability that x * k (y) is 1 is called the persistency of the boolean variable x * k (y) Corollary 3.7. Let K, Y be as in (2.2) and (3.1) respectively.…”

Section: Persistence For Boolean Variablesmentioning

confidence: 99%

“…In particular, for discrete optimization problems where cost coefficients are random variables with joint distribution ϕ, some bounds on the expected optimal value have been obtained. More recently Natarajan et al [17] extended the earlier work in [3] to even 1991 Mathematics Subject Classification. 65 D15, 65 K05, 46 N10, 90 C22.…”

Section: Introductionmentioning

confidence: 99%

A “Joint+Marginal” Approach to Parametric Polynomial Optimization

Lasserre¹

2010

SIAM J. Optim.

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Abstract. Given a compact parameter set Y ⊂ R p , we consider polynomial optimization problems (Py) on R n whose description depends on the parameter y ∈ Y. We assume that one can compute all moments of some probability measure ϕ on Y, absolutely continuous with respect to the Lebesgue measure (e.g. Y is a box or a simplex and ϕ is uniformly distributed). We then provide a hierarchy of semidefinite relaxations whose associated sequence of optimal solutions converges to the moment vector of a probability measure that encodes all information about all global optimal solutions x * (y) of Py, as y ∈ Y. In particular, one may approximate as closely as desired any polynomial functional of the optimal solutions, like e.g. their ϕ-mean. In addition, using this knowledge on moments, the measurable function y → x * k (y) of the k-th coordinate of optimal solutions, can be estimated, e.g. by maximum entropy methods. Also, for a boolean variable x k , one may approximate as closely as desired its persistency ϕ({y : x * k (y) = 1}, i.e. the probability that in an optimal solution x * (y), the coordinate x * k (y) takes the value 1. At last but not least, from an optimal solution of the dual semidefinite relaxations, one provides a sequence of polynomial (resp. piecewise polynomial) lower approximations with L 1 (ϕ) (resp. almost uniform) convergence to the optimal value function. IntroductionRoughly speaking, given a set parameters Y and an optimization problem whose description depends on y ∈ Y (call it P y ), parametric optimization is concerned with the behavior and properties of the optimal value as well as primal (and possibly dual) optimal solutions of P y , when y varies in Y. This a quite challenging problem and in general one may obtain information locally around some nominal value y 0 of the parameter. There is a vast and rich literature on the topic and for a detailed treatment, the interested reader is referred to e.g. Bonnans and Shapiro [4] and the many references therein. Sometimes, in the context of optimization with data uncertainty, some probability distribution ϕ on the parameter set Y is available and in this context one is also interested in e.g. the distribution of the optimal value, optimal solutions, all viewed as random variables. In particular, for discrete optimization problems where cost coefficients are random variables with joint distribution ϕ, some bounds on the expected optimal value have been obtained. More recently Natarajan et al. [17] extended the earlier work in [3] to even 1991 Mathematics Subject Classification. 65 D15, 65 K05, 46 N10, 90 C22.

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Persistency Model and Its Applications in Choice Modeling

Cited by 95 publications

References 14 publications

Robustness to Dependency in Portfolio Optimization Using Overlapping Marginals

Robustness to Dependency in Portfolio Optimization Using Overlapping Marginals

Analysis of Discrete Choice Models: A Welfare-Based Framework

A “Joint+Marginal” Approach to Parametric Polynomial Optimization

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