Debye limit of the stochastic rotation operator

## Abstract The limit __q__‐Bernstein operator __B__~__q__~ emerges naturally as an analogue to the Szász–Mirakyan operator related to the Euler distribution. Alternatively, __B__~__q__~ comes out as a limit for a sequence of __q__‐Bernstein polynomials in the case 0<__q__<1. Lately, different prop

The limits on the active isolation of stochastic vibrations are explored. These limits are due to the restricted actuator stroke available for vibration isolation. A one-degree-offreedom system is analyzed using an ideal actuator, resulting in a kinematic representation. The problem becomes one of f

We discuss a useful expansion of the finite rotation operator, exp(-ipA \*J), into partial waves. This expansion is analogous to Rayleigh's expansion of a plane wave, exp(ik \* r), into spherical harmonics and spherical Bessel functions. A close relationship exists between these two expansions in th