Noncommutative differential geometry with higher-order derivatives

We introduce a form of Runge-Kutta in which it is assumed that the user will evaluate both f and f in solving y = f (x, y) numerically. This allows us to introduce new Runge-Kutta parameters that increase the order of accuracy of the solution with evaluations of f replacing evaluations of f . If f i

## Abstract In this paper we prove an existence result of positive periodic solutions to second order differential equations with certain strong repulsive singularities near the origin and with some semilinear growth near infinity. Different from the nonsingular case, the result in this paper shows

We obtain suffiaient conditions for the oscillation of all solutions of the higher order neutral differential equation -[?At) + P(t) YO -.)I + a t ) Y(t -0 ) = 0, t h to where Our results extend and improve several known results in the literature.

## Abstract Higher even order linear differential operators with unbounded coefficients are studied. For these operators the eigenvalues of the characteristic polynomials fall into distinct classes or clusters. Consequently the spectral properties, deficiency indices and spectra, of the underlying

In this paper, some new criteria for the oscillation of higher-order functional differential equations of the form Lnx(t) + F (t, x(g(t))) = O, n is even are established. Some of our results are obtained via comparing it with second-order ordinary linear and first-order delay differential equations.