TY - EJOU AU - Gao, Peng AU - Perkowski, Marek AU - Li, Yiwei AU - Song, Xiaoyu TI - Novel Quantum Algorithms to Minimize Switching Functions Based on Graph Partitions T2 - Computers, Materials \& Continua PY - 2022 VL - 70 IS - 3 SN - 1546-2226 AB - After Google reported its realization of quantum supremacy, Solving the classical problems with quantum computing is becoming a valuable research topic. Switching function minimization is an important problem in Electronic Design Automation (EDA) and logic synthesis, most of the solutions are based on heuristic algorithms with a classical computer, it is a good practice to solve this problem with a quantum processer. In this paper, we introduce a new hybrid classic quantum algorithm using Grover’s algorithm and symmetric functions to minimize small Disjoint Sum of Product (DSOP) and Sum of Product (SOP) for Boolean switching functions. Our method is based on graph partitions for arbitrary graphs to regular graphs, which can be solved by a Grover-based quantum searching algorithm we proposed. The Oracle for this quantum algorithm is built from Boolean symmetric functions and implemented with Lattice diagrams. It is shown analytically and verified by simulations on a quantum simulator that our methods can find all solutions to these problems. KW - Boolean symmetric function; lattice diagrams; Grover’s searching algorithm DO - 10.32604/cmc.2022.020483