论文信息 - The probability monopoly

The probability monopoly

Probability is a very special case of fuzziness. It always faces two limits. First, it works with bivalent sets A. Second, probability measures need small infinities. A probability measure maps the sets in a sigma-algebra to the unit interval /spl lsqb/O, 1/spl rsqb/. Fuzzy theory challenges the probability monopoly. Probabilists have attacked it with gusto to keep their monopoly status, to have, the only uncertainty theory in the unit interval /spl lsqb/O, 1/spl rsqb/. But the fuzzy math is sound. Its world view of shades of gray has a deep intuitive ring. And the new fuzzy products have come into their own in the marketplace. >

Bart Kosko | B. Kosko

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