Weak Markov solutions of stochastic equations

In the paper it is shown that weak solutions of linear deterministic and stochastic retarded equations in HILBERT spaces are given by a variation of constants formula. Also, in the deterministic case, a characterization of the unbounded operator appearing in the term without delay is given. ') The

ihstruct. A continuous strong MARKOV process X on the line generated by FELLER'S generalized second order differential operator D,D; is considered. Supposed that the cnnonicnl scale p is locally the difference of two bounded convex functions, that the speed meustire rn contains R strictly positive a

In this paper, a characterization for all pairs \((a, n)\) with \(a \geqslant 2(n-1)^{1 / 2}\) for which the equation \(M_{a, n}: x_{1}^{2}+\cdots+x_{n}^{2}=a x_{1} \cdots x_{n}\) has positive integral solutions is given. It is known that for any pair \((a, n)\), the integral solutions of \(M_{a, n}