论文信息 - Some Selection Theorems for Measurable Functions

Some Selection Theorems for Measurable Functions

Let F: X → Y be a multifunction from X to Y. Then, given measure-theoretic or topological structures on X and Y, it is possible in various ways to define the measurability of F. The selection problem is to determine which structures on X and Y and which definitions of measurability of F ensure that F will have a measurable selector. This problem has been studied recently in papers by Castaing (2) and Kuratowski and Ryll-Nardzewski (6). In the latter paper, the problem is studied for its own interest. The former uses solutions of the problem to obtain general Filippov-type theorems. (See, for example, the corollaries following Theorems 2 and 3 of Castaing's paper.) For other material on Filippov's results see, among others, (3; 4; 5; 7; 9).

C. J. Himmelberg | F. S. Van vleck

[1] A. F. Filippov. On Certain Questions in the Theory of Optimal Control , 1962 .

[2] H. Hermes,et al. A note on the range of a vector measure; application to the theory of optimal control , 1964 .

[3] L. M. Sonneborn,et al. The Bang-Bang Principle for Linear Control Systems , 1964 .

[4] H. Kushner. On the Existence of Optimal Stochastic Controls , 1965 .

[5] E. J. McShane,et al. On Filippov’s implicit functions lemma , 1967 .

[6] M. Jacobs. Attainable sets in systems with unbounded controls , 1968 .