Determination of quasiprobability distributions in terms of probability distributions for the rotated quadrature phase

It is shown that the probability distribution for the rotated quadrature phase a^^exp (i) +a exp (-i) /2 can be expressed in terms of quasiprobability distributions such as P, Q, and Wigner functions and that also the reverse is true, i. e. , if the probability distribution for the rotated quadrature phase is known for every in the interval 0<, then the quasiprobability distributions can be obtained.