Compactifying linear optical unitaries using multiport beamsplitters

Abstract

We show that any N-dimensional unitary matrix can be realized using a finite sequence of concatenated identical fixed multiport beamsplitters (MBSs) and phase shifters (PSs). Our construction is based on a Lie group theorem applied to existing decompositions. Using the Bell-Walmsley-Clements framework, we prove that any N-dimensional unitary requires N+2 phase masks, N-1 fixed MBSs, and N-1 BSs. Our scheme requires only O(N) fixed, identical components (MBSs and BSs) compared to the O(N2) fixed BSs required by conventional schemes (e.g., Clements), all while keeping the same number of PSs. Experimentally, these MBS can be realized as a monolithic element via femtosecond laser writing, offering superior performance through reduced insertion losses. As an application, we present a reconfigurable linear optical circuit that implements a three-dimensional unitary emerging in the unambiguous discrimination of two nonorthogonal qubit states.