📝 SummarXiv

Abstract

We show that the quantum smooth label cover problem is RE-hard. This contrasts with the quantum unique label cover problem, which can be decided efficiently by Kempe, Regev, and Toner (FOCS'08). Our result aligns with the RE-hardness of the quantum label cover problem, which follows from the celebrated MIP* = RE result of Ji, Natarajan, Vidick, Wright, and Yuen (ACM'21). Additionally, we show that the quantum oracularized smooth label cover problem is also RE-hard. This aligns with the alternative quantum unique games conjecture on the RE-hardness of the quantum oracularized unique label cover problem proposed by Mousavi and Spirig (ITCS'25). Our techniques employ a series of reductions from the halting problem to the quantum smooth label cover problem, and include a quantum-sound version of Feige's reduction from 3SAT to 3SAT5 (STOC'96), which may be of independent interest.