New n-mode squeezing operator and squeezed states with standard squeezing

Abstract

We find that the exponential operator V=exp[ilamda (Q1P2+Q2P3+...+Qn-1Pn+QnP1)], Qi, Pi are respectively the coordinate and momentum operators, is an n-mode squeezing operator which engenders standard squeezing. By virtue of the technique of integration within an ordered product of operators we derive V's normally ordered expansion and obtain the n-mode squeezed vacuum states, its Wigner function is calculated by using the Weyl ordering invariance under similar transformations.