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finitely linear

A function $f\: I \to Y$$ , where

is a closed interval of the real line, is called finitely linear provided there exists a positive integer

such that

can be decomposed, for each $\varepsilon > 0$$ , into a finite number of closed subintervals $I_1, I_2, \cdots, I_k$$ each of length less than $\varepsilon$$ and with the property that the set

meets at most

of the sets $f(I_1), f(I_2), \cdots, f(I_k)$$ for $i = 1, 2, \cdots, k$$ .

Next: fixed point Up: Definitions Previous: finitely Suslinean

Janusz J. Charatonik, Pawel Krupski and Pavel Pyrih
2001-11-30