Resource analysis of quantum algorithms for coarse-grained protein folding models
Journal article, 2024

Protein folding processes are a vital aspect of molecular biology that is hard to simulate with conventional computers. Quantum algorithms have been proven superior for certain problems and may help tackle this complex life science challenge. We analyze the resource requirements for simulating simplified yet computationally challenging protein folding models on a quantum computer, assessing the feasibility of these existing approaches in the current and near-future technological landscape. We calculate the minimum number of qubits, interactions, and two-qubit gates necessary to build a heuristic quantum algorithm with the specific information of a folding problem. Particularly, we focus on the resources needed to build quantum operations based on the Hamiltonian linked to the protein folding models for a given amino acid count. Such operations are a fundamental component of these quantum algorithms, guiding the evolution of the quantum state for efficient computations. Specifically, we study coarse-grained folding models on the lattice and the fixed backbone side-chain conformation model and assess their compatibility with the constraints of existing quantum hardware given different bit encodings. We conclude that the number of qubits required falls within current technological capabilities. However, the limiting factor is the high number of interactions in the Hamiltonian, resulting in a quantum gate count unavailable today.

Author

Hanna Linn

Chalmers, Microtechnology and Nanoscience (MC2), Applied Quantum Physics

Isak Brundin

Chalmers, Microtechnology and Nanoscience (MC2), Applied Quantum Physics

Laura Garcia Alvarez

Chalmers, Microtechnology and Nanoscience (MC2), Applied Quantum Physics

Göran Johansson

Chalmers, Microtechnology and Nanoscience (MC2), Applied Quantum Physics

Physical Review Research

26431564 (ISSN)

Vol. 6 3 033112

Subject Categories

Computer and Information Science

Physical Sciences

DOI

10.1103/PhysRevResearch.6.033112

More information

Latest update

8/6/2024 1