English

Efficient Quantum Pseudorandomness from Hamiltonian Phase States

Quantum Physics 2025-07-23 v3 Cryptography and Security

Abstract

Quantum pseudorandomness has found applications in many areas of quantum information, ranging from entanglement theory, to models of scrambling phenomena in chaotic quantum systems, and, more recently, in the foundations of quantum cryptography. Kretschmer (TQC '21) showed that both pseudorandom states and pseudorandom unitaries exist even in a world without classical one-way functions. To this day, however, all known constructions require classical cryptographic building blocks which are themselves synonymous with the existence of one-way functions, and which are also challenging to realize on realistic quantum hardware. In this work, we seek to make progress on both of these fronts simultaneously -- by decoupling quantum pseudorandomness from classical cryptography altogether. We introduce a quantum hardness assumption called the Hamiltonian Phase State (HPS) problem, which is the task of decoding output states of a random instantaneous quantum polynomial-time (IQP) circuit. Hamiltonian phase states can be generated very efficiently using only Hadamard gates, single-qubit Z-rotations and CNOT circuits. We show that the hardness of our problem reduces to a worst-case version of the problem, and we provide evidence that our assumption is plausibly fully quantum; meaning, it cannot be used to construct one-way functions. We also show information-theoretic hardness when only few copies of HPS are available by proving an approximate tt-design property of our ensemble. Finally, we show that our HPS assumption and its variants allow us to efficiently construct many pseudorandom quantum primitives, ranging from pseudorandom states, to quantum pseudoentanglement, to pseudorandom unitaries, and even primitives such as public-key encryption with quantum keys.

Keywords

Cite

@article{arxiv.2410.08073,
  title  = {Efficient Quantum Pseudorandomness from Hamiltonian Phase States},
  author = {John Bostanci and Jonas Haferkamp and Dominik Hangleiter and Alexander Poremba},
  journal= {arXiv preprint arXiv:2410.08073},
  year   = {2025}
}

Comments

53 pages and 1 figure. Proceedings of TQC 2025. Minor revisions. Note: an earlier version of the paper included an analysis of an iterative construction of pseudorandom unitaries. This section has been removed due to a bug

R2 v1 2026-06-28T19:16:32.756Z