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Author: Antoine Désir
Publisher:
ISBN:
Category :
Languages : en
Pages : 0
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Book Description
Assortment optimization is an important problem that arises in many practical applications such as retailing and online advertising. In this problem, the goal is to select a subset of items that maximizes the expected revenue in the presence of (1) the substitution behavior of consumers specified by a choice model, and (2) a potential capacity constraint bounding the total weight of items in the assortment. The latter is a natural constraint arising in many applications. We begin by showing how challenging these two aspects are from an optimization perspective. First, we show that adding a general capacity constraint makes the problem NP-hard even for the simplest choice model, namely the multinomial logit model. Second, we show that even the unconstrained assortment optimization for the mixture of multinomial logit model is hard to approximate within any reasonable factor when the number of mixtures is not constant.In view of these hardness results, we present near-optimal algorithms for the capacity constrained assort- ment optimization problem under a large class of parametric choice models including the mixture of multinomial logit, Markov chain, nested logit and d-level nested logit choice models. In fact, we develop near-optimal algorithms for a general class of capacity constrained optimization problems whose objective function depends on a small number of linear functions. For the mixture of multinomial logit model (resp. Markov chain model), the running time of our algorithm depends exponentially on the number of segments (resp. rank of the transition matrix). Therefore, we get efficient algorithms only for the case of constant number of segments (resp. constant rank). However, in light of our hardness result, any near-optimal algorithm will have a super polynomial dependence on the number of mixtures for the mixture of multinomial logit choice model.
Author: Antoine Désir
Publisher:
ISBN:
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Languages : en
Pages : 0
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Book Description
Assortment optimization is an important problem that arises in many practical applications such as retailing and online advertising. In this problem, the goal is to select a subset of items that maximizes the expected revenue in the presence of (1) the substitution behavior of consumers specified by a choice model, and (2) a potential capacity constraint bounding the total weight of items in the assortment. The latter is a natural constraint arising in many applications. We begin by showing how challenging these two aspects are from an optimization perspective. First, we show that adding a general capacity constraint makes the problem NP-hard even for the simplest choice model, namely the multinomial logit model. Second, we show that even the unconstrained assortment optimization for the mixture of multinomial logit model is hard to approximate within any reasonable factor when the number of mixtures is not constant.In view of these hardness results, we present near-optimal algorithms for the capacity constrained assort- ment optimization problem under a large class of parametric choice models including the mixture of multinomial logit, Markov chain, nested logit and d-level nested logit choice models. In fact, we develop near-optimal algorithms for a general class of capacity constrained optimization problems whose objective function depends on a small number of linear functions. For the mixture of multinomial logit model (resp. Markov chain model), the running time of our algorithm depends exponentially on the number of segments (resp. rank of the transition matrix). Therefore, we get efficient algorithms only for the case of constant number of segments (resp. constant rank). However, in light of our hardness result, any near-optimal algorithm will have a super polynomial dependence on the number of mixtures for the mixture of multinomial logit choice model.
Author: Ruxian Wang
Publisher:
ISBN:
Category :
Languages : en
Pages : 7
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Book Description
We consider an assortment and price optimization problem where a retailer chooses an assortment of competing products and determines their prices to maximize the total expected profit subject to a capacity constraint. Customers' purchase behavior follows the multinomial logit choice model with general utility functions. This paper simplifies it to a problem of finding a unique fixed point of a single-dimensional function and visualizes the assortment optimization process. An efficient algorithm to find the optimal assortment and prices is provided.
Author: Kai Schaal
Publisher:
ISBN:
Category :
Languages : en
Pages : 19
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Book Description
Assortment optimization is of crucial importance for retailers. By selecting items to be offered to customers, retailers make fundamental decisions that will influence what customers see, what they buy and to which extent their demand can be fulfilled. When taking these assortment decisions, it is therefore important to thoroughly consider customer demand characteristics on the one hand as well as all relevant costs occuring to the retailer on the other hand. Various models and solution approaches have been proposed to support retailers in these assortment decisions. We pick one of the recently contributed heuristical approaches and show how it can be improved. The improvement consists of slightly increased profits through better solutions as well as a significant decrease in runtime. Thus, the improved heuristic supports retailers in increasing retail profits in a more efficient manner. As such, the proposed improvement is of high practical relevance.
Author: Heng Zhang
Publisher:
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Category :
Languages : en
Pages : 0
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Book Description
We consider uncapacitated and capacitated assortment problems under the paired combinatorial logit model, where the goal is to fi nd a set of products to maximize the expected revenue obtained from each customer. In the uncapacitated setting, we can offer any set of products, whereas in the capacitated setting, there is a limit on the number of products that we can offer. We establish that even the uncapacitated assortment problem is strongly NP-hard. To develop an approximation framework for our assortment problems, we transform the assortment problem into an equivalent problem of finding the fi xed point of a function, but computing the value of this function at any point requires solving a nonlinear integer program. Using a suitable linear programming relaxation of the nonlinear integer program and randomized rounding, we obtain a 0.6-approximation algorithm for the uncapacitated assortment problem. Using randomized rounding on a semidefi nite programming relaxation, we obtain an improved, but a more complicated, 0.79-approximation algorithm. Finally, using iterative variable fi xing and coupled randomized rounding, we obtain a 0.25-approximation algorithm for the capacitated assortment problem. Our computational experiments demonstrate that our approximation algorithms, on average, yield expected revenues that are within 3.6% of a tractable upper bound on the optimal expected revenues.
Author: Danny Segev
Publisher:
ISBN:
Category :
Languages : en
Pages : 31
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The main contribution of this paper resides in proposing a novel approximate dynamic programming approach for capacitated assortment optimization under the Nested Logit model in its utmost generality. Specifically, we show that the optimal revenue can be efficiently approached within any degree of accuracy through purely combinatorial techniques, synthesizing ideas related to continuous dynamic programming, state space discretization, and sensitivity analysis of modified revenue functions. These developments allow us to devise the first fully polynomial-time approximation scheme in this context, thus resolving fundamental open questions posed in previous papers.
Author: Ruxian Wang
Publisher:
ISBN:
Category :
Languages : en
Pages : 23
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Book Description
We consider an assortment optimization problem where a retailer chooses a set of substitutable products to maximize the total expected revenue or profit subject to a capacity constraint. The customer purchase behavior follows the generalized attraction model (GAM), of which the multinomial logit model and the independent demand model are special cases. We visualize the efficient assortments and propose a nonrecursive polynomial-time algorithm to find the optimal one for the static problem. We then connect it with the concept of efficient set in the context of revenue management and show that the efficient sets, the only candidates for the optimal assortments under the capacitated GAM formulation, are of polynomial size. Moreover, the efficient sets significantly reduce the computational complexity in the dynamic assortment management and the optimal policy has a time-threshold structure.
Author: Jens Vygen
Publisher: Springer Nature
ISBN: 3031598350
Category :
Languages : en
Pages : 474
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Author: Qingwei Jin
Publisher:
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Category :
Languages : en
Pages : 0
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We study assortment optimization problems under multinomial logit choice model with two tree structured consideration set models, i.e., the subtree model and the induced paths model. In each model, there are multiple customer types and each customer type has a different consideration set. A customer of a particular type only purchases product within his consideration set. The tree structure means all products form a tree with each node representing one product and all consideration sets are induced from this tree. In the subtree model, each consideration set consists of products in a subtree and in the induced paths model, each consideration set consists of products on the path from one node to the root. All customers make purchase decisions following the same multinomial logit choice model except that different customer types have different consideration sets. The goal of the assortment optimization is to determine a set of products offered to customers such that the expected revenue is maximized. We consider both unconstrained problem and capacitated problem. We show that these problems are all NP-hard problems and propose a unified framework, which captures the tree structure in both models, to design fully polynomial time approximation schemes (FPTAS) for all these problems. Besides, we identify a special case under the induced paths model, showing that it can be solved in $O(n)$ operations.
Author: Sumit Kunnumkal
Publisher:
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Languages : en
Pages : 0
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We consider the assortment optimization problem under the nested logit model and obtain new bounds on the gap between the optimal expected revenue and an upper bound based on a certain continuous relaxation of the assortment problem. Our bounds can be tighter than the existing bounds in the literature and provide more insight into the key drivers of tractability for the assortment optimization problem under the nested logit model. Moreover, our bounds scale with the nest dissimilarity parameters and we recover the well-known tractability results for the assortment optimization problem under the multinomial logit model when all the nest dissimilarity parameters are equal to one. We extend our results to the cardinality constrained assortment problem where there are constraints that limit the number of products that can be offered within each nest.
Author: Xin Chen
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Languages : en
Pages : 0
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We study an assortment optimization problem under a multi-purchase choice model in which customers choose a bundle of up to one product from each of two product categories. Different bundles have different utilities and the bundle price is the summation of the prices of products in it. For the uncapacitated setting where any set of products can be offered, we prove that this problem is strongly NP-hard. We show that an adjusted-revenue-ordered assortment provides a 1/2-approximation. Furthermore, we develop an approximation framework based on a linear programming relaxation of the problem and obtain a 0.74-approximation algorithm. This approximation ratio almost matches the integrality gap of the linear program, which is proven to be at most 0.75. For the capacitated setting, we prove that there does not exist a constant-factor approximation algorithm assuming the Exponential Time Hypothesis. The same hardness result holds for settings with general bundle prices or more than two categories. Finally, we conduct numerical experiments on randomly generated problem instances. The average approximation ratios of our algorithms are over 99%.
