The Floquet Theory of the Periodic Euler–Bernoulli Equation

For the k x k-matrix-valued version of Hill's equation it is shown that the dimension of the matrix needed to compute the Floquet exponents can be reduced from 2k to k. Also the existence of periodic solutions is equivalent to the non-invertibility of certain k x k-matrices.

## The differential equation describing the three-phase linear synchronous machine containing an arbitrary stator MMF distribution is reformulated and solved as a perturbation theory problem. The solution algorithm presented also produces a transformation capable of reducing to constant coeflcientfo

A numerical method for approximating coefficients in an Euler-Bernoulli beam equation from spectral data is proposed. The technique is based on a shooting method and constructs a beam that has the given spectral data. Numerical examples illustrate the performance of the method.