Information Acquisition with $\alpha$-Divergence Costs
摘要
Building on the -information model of Bloedel et al. (2025), this paper introduces a one-parameter family of information acquisition models and characterizes optimal information acquisition. This family extends the mutual information model (Mat\v{e}jka and McKay, 2015) while preserving its analytical tractability. The information cost is derived from the -divergence, which nests the KL-divergence (), the reverse KL-divergence (), and the squared Hellinger distance (), and is represented in closed form via the -integration of Amari (2007). The optimal choice probabilities belong to the -exponential family, which appears in nonextensive statistical mechanics (Tsallis, 1988) and in the -logit model of traffic route choice (Nakayama, 2013). In the KL-divergence special case, this family reduces to the modified logit of Mat\v{e}jka and McKay (2015).
引用
@article{arxiv.2605.28026,
title = {Information Acquisition with $\alpha$-Divergence Costs},
author = {Takashi Ui},
journal= {arXiv preprint arXiv:2605.28026},
year = {2026}
}
备注
Preliminary version. Comments are welcome