Minimalist Softmax Attention Provably Learns Constrained Boolean Functions

Abstract

We study the computational limits of learning k-bit Boolean functions (specifically, AND, OR, and their noisy variants), using a minimalist single-head softmax-attention mechanism, where k=(d) relevant bits are selected from d inputs. We show that these simple AND and OR functions are unsolvable with a single-head softmax-attention mechanism alone. However, with teacher forcing, the same minimalist attention is capable of solving them. These findings offer two key insights: Architecturally, solving these Boolean tasks requires only minimalist attention, without deep Transformer blocks or FFNs. Methodologically, one gradient descent update with supervision suffices and replaces the multi-step Chain-of-Thought (CoT) reasoning scheme of [Kim and Suzuki, ICLR 2025] for solving Boolean problems. Together, the bounds expose a fundamental gap between what this minimal architecture achieves under ideal supervision and what is provably impossible under standard training.