We shall say that from the point z0 G Raquot;\M it is possible to avoid encounter with the set M if for any measurable function u(t) e P it is possible to construct a measurable variation u(f) of the vector v an Q such that the solution z(t) of the equation z = F{z, u(t), v(t)), z(0) = z0, ... In Theorem 8, which pertains to the nonlinear game (3), the terminal set M is a sufficiently sparse set which is no more than countable;anbsp;...

Title | : | Analytic Number Theory, Mathematical Anaylsis and Their Applications |

Author | : | Sergeĭ Mikhaĭlovich Nikolʹskiĭ |

Publisher | : | American Mathematical Soc. - 1980 |

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