The distribution of linear combinations of the sample occupancy numbers

Gradients of the total energy with respect to nuclear displacements using fractionally occupied orbitals within a linear combination of Gaussian-type orbitals density-functional theoretical approach are discussed. Expressions for the gradient in the fractional occupation number solution as well as f

The distribution function of a linear combination of independent central chi-square random variables is obtained in a straightfoward manner by inverting the moment generating function. The distribution is expressed as an infinite gamma series whose terms can be computed efficiently to a sufficient d

We consider a stationary time series \(\left\{X_{t}\right\}\) given by \(X_{1}=\sum_{k} \psi_{k} Z_{l-k}\), where the driving stream \(\left\{Z_{i}\right\}\) consists of independent and identically distributed random variables with mean zero and finite variance. Under the assumption that the filteri