On the application of an optimal spline sampling theorem

We introduce the following transform f(t) = j&J) K(w, t) P(o) dw with the Fourier-type inverse J'(o) = s p(t) K(w, t)fW dt. Unless otherwise indicated, the limits of integration are not finite and will be specified for the particular integral transform. The time-varying system function H(w, t) is d

In this paper we derive necessary optimality conditions for an interpolating spline function which minimizes the Holladay approximation of the energy functional and which stays monotone if the given interpolation data are monotone. To this end optimal control theory for state-restricted optimal cont

The Blaschke᎐Lebesgue theorem states that of all plane sets of given constant width the Reuleaux triangle has least area. The area to be minimized is a functional involving the support function and the radius of curvature of the set. The support function satisfies a second order ordinary differentia