Learning to Price Homogeneous Data

TL;DR

This paper introduces a novel approach for online data pricing with homogeneous data points, developing discretization schemes and algorithms that achieve improved regret bounds in stochastic and adversarial settings.

Contribution

It proposes new discretization methods and algorithms for online data pricing, achieving better regret bounds compared to prior work.

Findings

Discretization schemes scale well with approximation parameters.

Achieved $ ilde{O}(mrac{ ext{sqrt}(T)}{})$ regret in stochastic setting.

Achieved $ ilde{O}(m^{3/2}rac{ ext{sqrt}(T)}{})$ regret in adversarial setting.

Abstract

We study a data pricing problem, where a seller has access to $N$ homogeneous data points (e.g. drawn i.i.d. from some distribution). There are $m$ types of buyers in the market, where buyers of the same type $i$ have the same valuation curve $v_i:[N]\rightarrow [0,1]$, where $v_i(n)$ is the value for having $n$ data points. A priori, the seller is unaware of the distribution of buyers, but can repeat the market for $T$ rounds so as to learn the revenue-optimal pricing curve $p:[N] \rightarrow [0, 1]$. To solve this online learning problem, we first develop novel discretization schemes to approximate any pricing curve. When compared to prior work, the size of our discretization schemes scales gracefully with the approximation parameter, which translates to better regret in online learning. Under assumptions like smoothness and diminishing returns which are satisfied by data, the discretization size can be reduced further. We then turn to the online learning problem, both in the stochastic and adversarial settings. On each round, the seller chooses an anonymous pricing curve $p_t$. A new buyer appears and may choose to purchase some amount of data. She then reveals her type only if she makes a purchase. Our online algorithms build on classical algorithms such as UCB and FTPL, but require novel ideas to account for the asymmetric nature of this feedback and to deal with the vastness of the space of pricing curves. Using the improved discretization schemes previously developed, we are able to achieve $\tilde{O}(m\sqrt{T})$ regret in the stochastic setting and $\tilde{O}(m^{3/2}\sqrt{T})$ regret in the adversarial setting.