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Partial Convergence and Continuity of Lattice-Valued Possibilistic Measures

In: Computing and Informatics, vol. 27, no. 3
I. Kramosil

Details:

Year, pages: 2008, 297 - 313
Keywords:
Partially ordered set, (complete) lattice, set function, lattice-valued possibilistic (possibility) measure, (complete) maxivity, convergence and continuity from above (upper convergence and continuity), convergence and continuity from below (lower conver
About article:
The notion of continuity from above (upper continuity) for lattice-valued possibilistic measures as investigated in [7] has been proved to be a rather strong condition when imposed as demand on such a measure. Hence, our aim will be to introduce some versions of this upper continuity weakened in the sense that the conditions imposed in [7] to the whole definition domain of the possibilistic measure in question will be restricted just to certain subdomains. The resulting notion of partial upper convergence and continuity of lattice-valued possibilistic measures will be analyzed in more detail and some results will be introduced and proved.
How to cite:
ISO 690:
Kramosil, I. 2008. Partial Convergence and Continuity of Lattice-Valued Possibilistic Measures. In Computing and Informatics, vol. 27, no.3, pp. 297-313. 1335-9150.

APA:
Kramosil, I. (2008). Partial Convergence and Continuity of Lattice-Valued Possibilistic Measures. Computing and Informatics, 27(3), 297-313. 1335-9150.