Фирменный каталог на винтовки Mauser моделей M03 ит M98 за 2007 год.
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M. j and S are convex sets. They are also disjoint, and it follows that there exists a nonzero vector P E Em such that for every b int Qa and a E S, PTb < Pra. ,p,} such that p,< 0, then PTb is unbounded above for proper choice of b E int Qfi . We may normalize P so that Z t , pi = 1. Hence, P E @* and one can write P = 8,*. , m. i 11 = 0. By the continuity of the inner product /3bi+(1-/3)ci 3. Some General Results In Section 1 we presented the definition of an (essentially) complete class of control policies. It is important to investigate conditions under which some appropriately chosen proper subset of r* is (essentially) complete since this means that only control policies in some proper subset of r* need be considered in finding optimal control policies. From the previous definitions it is clear that some relations exist between complete classes of control rules and admissible control rules. Thus, inf sup H(v*, e*) = sup vw-* O*E@* O*EB* inf H(v*, e*) v*er* = H. Since B,* is least favorable and vo* is minimax, inf H(v*, B,*) v*w* = H(v,*, Oo*), and vo* is Bayes with respect to B0*. 3, if the support of the least favorable distribution, Bo*, is 0, then the minimax rule, vo*, is admissible. This is a rather important property to note because admissibility is certainly a very desirable attribute for any control policy which is to be termed optimal. If there is no least favorable Bo* E @*,then the admissibility of the minimax policy must be investigated separately.