Dynamic lot-sizing in sequential online retail auctions
From MaRDI portal
Publication:421653
DOI10.1016/j.ejor.2011.05.051zbMath1237.91112OpenAlexW2054083384MaRDI QIDQ421653
Archis Ghate, Xi Chen, Arvind K. Tripathi
Publication date: 14 May 2012
Published in: European Journal of Operational Research (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.ejor.2011.05.051
Stochastic programming (90C15) Dynamic programming (90C39) Auctions, bargaining, bidding and selling, and other market models (91B26)
Related Items (9)
Optimal minimum bids and inventory scrapping in sequential, single-unit, Vickrey auctions with demand learning ⋮ Circumventing the Slater conundrum in countably infinite linear programs ⋮ Optimal bidding in auctions from a game theory perspective ⋮ On bidding for a fixed number of items in a sequence of auctions ⋮ On optimal bidding and inventory control in sequential procurement auctions: the multi period case ⋮ Optimal Design of Online Sequential Buy-Price Auctions with Consumer Valuation Learning ⋮ Analysis and design for multi-unit online auctions ⋮ Dynamic procurement management by reverse auctions with fixed setup costs and sales levers ⋮ Approaches to multistage one-shot decision making
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Using bid data for the management of sequential, multi-unit, online auctions with uniformly distributed bidder valuations
- Bidding agents for online auctions with hidden bids
- Predicting Bidders' Willingness to Pay in Online Multiunit Ascending Auctions: Analytical and Empirical Insights
- Optimal Dynamic Auctions for Revenue Management
- Analysis and Design of Business-to-Consumer Online Auctions
- Dynamic Multipriority Patient Scheduling for a Diagnostic Resource
- Optimal Auctioning and Ordering in an Infinite Horizon Inventory-Pricing System
- Optimal Auction Design
- On Moments of Order Statistics from the Weibull Distribution
This page was built for publication: Dynamic lot-sizing in sequential online retail auctions
