English

Testing by Betting while Borrowing and Bargaining

Statistics Theory 2026-05-13 v4 Probability Mathematical Finance Methodology Statistics Theory

Abstract

Testing by betting has been a cornerstone of the game-theoretic statistics literature. One bets against the null hypothesis, and the accumulated wealth WtW_t quantifies the evidence against the null hypothesis after tt rounds, and the null can be rejected at level α\alpha whenever Wt1/αW_t \geq 1/\alpha. A key assumption permeating the literature is that one cannot bet more money than they currently have (the wealth must stay nonnegative). In this work, we examine the consequences of allowing the bettor to borrow money in each round (for example after going bankrupt). Specifically, we ask how the threshold of 1/α1/\alpha must be accordingly adjusted to retain the desired level α\alpha. Our findings are twofold. First, if the new rejection rule is Wtg(α,Lt)W_t \geq g(\alpha,L_t) where LtL_t is the total liability at time tt, then we show that g(α,0)>1/αg(\alpha,0)>1/\alpha if g(α,Lt)<g(\alpha,L_t)<\infty for any Lt>0L_t > 0; in words, we must pay for the possibility of borrowing, even if in fact we do not borrow. Second, and in contrast to the first, if one employs a path dependent threshold h(α,W0,L1,,Wt1,Lt)h(\alpha,W_0,L_1,\dots,W_{t-1},L_t), that is a function of past leverage ratios, then there is in fact no extra price to pay for the possibility of borrowing.

Keywords

Cite

@article{arxiv.2407.11465,
  title  = {Testing by Betting while Borrowing and Bargaining},
  author = {Hongjian Wang and Muriel F. Pérez-Ortiz and Wouter M. Koolen and Aaditya Ramdas},
  journal= {arXiv preprint arXiv:2407.11465},
  year   = {2026}
}
R2 v1 2026-06-28T17:42:39.076Z