Multiphoton Interference with a symmetric SU(N) beam splitter and the generalization of the extended Hong-Ou-Mandel effect

Abstract

We examine multiphoton interference with a symmetric SU(N) beam splitter SN, an extension of features of the SU(2) 50/50 beam splitter extended Hong-Ou-Mandel (eHOM) effect, whereby one obtains a zero amplitude (probability) for the output coincidence state (defined by equal number of photons n/N in each output port), when a total number n of photons impinges on the N-port device. These are transitions of the form |n1,n2,…,nNSN|n/N N, where n=Σi=1N ni, which generalize the Hong-Ou-Mandel (HOM) effect |1,1 S2|1,1 , the eHOM effect |n1,n2 S2|n1+n22,n1+n22 , and the generalized HOM effect (gHOM) |1 NSN|1 N, which have previously been studied in the literature. The emphasis of this work is on illuminating how the overall destructive interference occurs in separate groups of destructive interferences of sub-amplitudes of the total zero amplitude. We develop symmetry properties for the generalized eHOM effect (geHOM) |n1,n2,…,nNSN|n/N N involving a zero amplitude governed by Perm()=0, for an appropriately constructed matrix (SN) built from the matrix elements of SN. We develop an analytical constraint equation for Perm() for arbitrary N that allows us to determine when it is zero. We generalize the SU(2) beam splitter feature of central nodal line (CNL), which has a zero diagonal along the output probability distribution when one of the input states is of odd parity (containing only odd number of photons), to the general case of N = 2 * N' where N'∈ odd.