Quantum Resource Analysis of Low-Round Keccak/SHA-3 Preimage Attack: From Classical 257.8 to Quantum 228.9 using Qiskit Modeling
Abstract
This paper presents a hardware-conscious analysis of the quantum acceleration of the classical 3-round Keccak-256 preimage attack using Grover's Algorithm. While the theoretical quantum speed-up from Tcl=257.8 (classical) to Tqu = 228.9 (quantum) is mathematically sound, the practical implementation overhead is so extreme that attacks remain wholly infeasible in both resource and runtime dimensions. Using Qiskit-based circuit synthesis, we derive that a 3-round Keccak quantum oracle requires: 9,600 Toffoli gates (with uncomputation for reversibility); 3,200 logical qubits (1,600 state + 1,600 auxiliary); 7.47 * 1013 total 2-qubit gates (full Grover search); 3.2 million physical qubits (with quantum error correction)PROHIBITIVE; 0.12 years (43 days) to 2,365+ years execution time, depending on machine assumptions. These barriers -- particularly the physical qubit requirements, circuit depth, and error accumulation -- render the quantum attack infeasible for any foreseeable quantum computer. Consequently, SHA-3 security is not threatened by quantum computers for preimage attacks. We emphasize the critical importance of hardware-aware complexity analysis in quantum cryptanalysis: the elegant asymptotic theory of Grover's Algorithm hides an engineering overhead so prohibitive that the quantum approach becomes infeasible from both resource and implementation perspectives.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.