OPTICAL OPERATIONS ON WAVE-FUNCTIONS AS THE ABELIAN SUBGROUPS OF THE SPECIAL AFFINE FOURIER TRANSFORMATION

The special affine Fourier transformation (SAFT) is a generalization o f the fractional Fourier transformation (FRT) and represents the most general lossless inhomogeneous linear mapping, in phase space, as the integral transformation of a wave function. Here we first summarize th e most well-known optical operations on lightwave functions (i.e., the FRT, lens transformation, free-space propagation, and magnification), in a unified way, from the viewpoint of the one-parameter Abelian sub groups of the SAFT. Then we present a new operation, which is the Lore ntz-type hyperbolic transformation in phase space and exhibits squeezi ng. We also show that the SAFT including these five operations can be generated from any two independent operations.