📝 SummarXiv

Abstract

Linear operations, e.g., vector-matrix or vector-vector multiplications, are core operations of modern neural networks. To diminish computational time, these operations are implemented by parallel computations using different coprocessors. In this work we show that open quantum system consisting of bosonic modes and interacting with bosonic reservoirs can be used as analog coprocessor implementing multiple vector-matrix multiplications with stochastic matrices in parallel. Input vectors are encoded in occupancies of reservoirs, and output result is presented by stationary energy flows. The operation takes time needed for the system's transition to non-equilibrium stationary state independently on number of the reservoirs, i.e., on the input vector dimension. The computations are accompanied by entropy growth. We construct a direct mapping between open quantum systems and electrical crossbar structures, showing that dissipation rates multiplied by OQS's modes frequencies can be seen as conductivities, reservoirs' occupancies can be seen as potentials, and stationary energy flows can be seen as electric currents.