Optimal Inventory Control with Dual‐Sourcing, Heterogeneous Ordering Costs and Order Size Constraints

In retailing operations, retailers face the challenge of incomplete demand information. We develop a new concept named K‐approximate convexity, which is shown to be a generalization of K‐convexity, to address this challenge. This idea is applied to obtain a base‐stock list‐price policy for the joint inventory and pricing control problem with incomplete demand information and even non‐concave revenue function. A worst‐case performance bound of the policy is established. In a numerical study where demand is driven from real sales data, we find that the average gap between the profits of our proposed policy and the optimal policy is 0.27%, and the maximum gap is 4.6%.

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“…, Zhang et al. ). K ‐approximate convexity can help us construct and analyze well‐structured heuristic policies for these inventory problems.…”

Section: Resultsmentioning

confidence: 99%

Joint Inventory and Pricing Coordination with Incomplete Demand Information

Song

Yang

2016

Production and Operations Management

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“…Fox et al (2006) considered a specific case of piecewise linear concave ordering costs, and proved that a generalized (s, S) policy is optimal for a larger class of demand distributions. Zhang et al (2012) addressed the same problem under limited order capacities. Yu & Benjafaar (2014) extended earlier 2 results by establishing the optimality of generalized (s, S) policies for all demand distributions that are strongly unimodal.…”

Section: Introductionmentioning

confidence: 90%

“…It is easy to see that the setting explained above leads to a piecewise linear concave ordering cost structure, such that each supplier corresponds to a particular linear segment. A piecewise concave ordering cost function implies the following important property on the optimal ordering policy: it is always less costly to procure from a single supplier rather than multiple suppliers in any given period (Zhang et al, 2012). The problem is then to make the supplier selection and to determine replenishment schedule as well as the replenishment quantities so as to minimize the expected total cost.…”

Section: Problem Definition and Preliminariesmentioning

confidence: 99%

The stochastic lot sizing problem with piecewise linear concave ordering costs

Tunç

Kilic

Tarim

et al. 2016

Computers & Operations Research

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“…Related to the order size-restricted setting studied in this paper, Zhang, Hua, and Benjaafar (2012) analyse the inventory control policy of a retailer facing an uncertain demand for a single product. In their setting, the retailer can order from two suppliers under order size restrictions.…”

Section: Literature Reviewmentioning

confidence: 99%

“…In our setting, suppliers have order size constraints which limit the retailer's order size in each order cycle (Hariga and Haouari 1999;Yazlali and Erhun 2009;Zhang, Hua, and Benjaafar 2012). Such order size constraints can be due to physical limits of suppliers' production facilities or can be imposed by the suppliers to ration the capacity effectively among many customers (Yazlali and Erhun 2009).…”

Section: Introductionmentioning

confidence: 99%

Pricing decisions in a strategic single retailer/dual suppliers setting under order size constraints

Ekici

Altan

Özener

2015

International Journal of Production Research

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Due to copyright restrictions, the access to the full text of this article is only available via subscription.In this paper, we study a duopolistic market of suppliers competing for the business of a retailer. The retailer sets the order cycle and quantities from each supplier to minimize its annual costs. Different from other studies in the literature, our work simultaneously considers the order size restriction and the benefit of order consolidation, and shows non-trivial pricing behaviour of the suppliers under different settings. Under asymmetric information setting, we formulate the pricing problem of the preferred supplier as a non-linear programming problem and use Karush–Kuhn–Tucker conditions to find the optimal solution. In general, unless the preferred supplier has high-order size limit, it prefers sharing the market with its competitor when retailer’s demand, benefit of order consolidation or fixed cost of ordering from the preferred supplier is high. We model the symmetric information setting as a two-agent non-zero sum pricing game and establish the equilibrium conditions. We show that a supplier might set a ‘threshold price’ to capture the entire market if its per unit fixed ordering cost is sufficiently small. Finally, we prove that there exists a joint-order Nash equilibrium only if the suppliers set identical prices low enough to make the retailer place full-size orders from both

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Optimal Inventory Control with Dual‐Sourcing, Heterogeneous Ordering Costs and Order Size Constraints

Cited by 33 publications

References 28 publications

Joint Inventory and Pricing Coordination with Incomplete Demand Information

Joint Inventory and Pricing Coordination with Incomplete Demand Information

The stochastic lot sizing problem with piecewise linear concave ordering costs

Pricing decisions in a strategic single retailer/dual suppliers setting under order size constraints

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