Shrinking the Upper Confidence Bound: A Dynamic Product Selection Problem for Urban Warehouses

TL;DR

This paper addresses the challenge of selecting top products for urban warehouses in ultra-fast delivery services by developing a semi-bandit model with linear generalization and proposing a novel algorithm that reduces fixed costs, validated on Alibaba data.

Contribution

The paper introduces a new online learning algorithm that shrinks upper confidence bounds to reduce fixed costs in product selection for urban warehouses.

Findings

The standard UCB algorithm has a regret bound with fixed and variable costs.

The proposed algorithm reduces the fixed cost component by a factor of d.

Experimental results show at least 10% regret reduction on Alibaba data.

Abstract

The recent rising popularity of ultra-fast delivery services on retail platforms fuels the increasing use of urban warehouses, whose proximity to customers makes fast deliveries viable. The space limit in urban warehouses poses a problem for the online retailers: the number of products (SKUs) they carry is no longer "the more, the better", yet it can still be significantly large, reaching hundreds or thousands in a product category. In this paper, we study algorithms for dynamically identifying a large number of products (i.e., SKUs) with top customer purchase probabilities on the fly, from an ocean of potential products to offer on retailers' ultra-fast delivery platforms. We distill the product selection problem into a semi-bandit model with linear generalization. There are in total $N$ different arms, each with a feature vector of dimension $d$. The player pulls $K$ arms in each period and observes the bandit feedback from each of the pulled arms. We focus on the setting where $K$ is much greater than the number of total time periods $T$ or the dimension of product features $d$. We first analyze a standard UCB algorithm and show its regret bound can be expressed as the sum of a $T$-independent part $\tilde O(K d^{3/2})$ and a $T$-dependent part $\tilde O(d\sqrt{KT})$, which we refer to as "fixed cost" and "variable cost" respectively. To reduce the fixed cost for large $K$ values, we propose a novel online learning algorithm, which iteratively shrinks the upper confidence bounds within each period, and show its fixed cost is reduced by a factor of $d$ to $\tilde O(K \sqrt{d})$. Moreover, we test the algorithms on an industrial dataset from Alibaba Group. Experimental results show that our new algorithm reduces the total regret of the standard UCB algorithm by at least 10%.