Recursion relations for the matrix elements of the two-dimensional harmonic oscillator

The method of generating functions which was previously only employed for the spherical basis of harmonic-oscillator single-particle wave functions is here generalized to the deformed (=cylindrical = asymptotic) basis. One-center and two-center matrix elements which are important in fission or heavy

The methods proposed in previous papers for the treatment of a translationally invariant four body problem in an oscillator basis are further developed. Particularly the use of these methods for the calculation of two body matrix elements and the elastic form factor with orbital functions adapted to

In this Letter, we teach a neural network the solution of the Schrsdinger equation for some model potential energy functions. The network can then predict eigenvalues of other test cases with an error of a few percent.

## Abstract Several algorithms to calculate the vector of regression coefficients and the Jacobian matrix for partial least squares regression have been published. Whereas many efficient algorithms to calculate the regression coefficients exist, algorithms to calculate the Jacobian matrix are ineff