Počet záznamov: 1
Generalizated local divergence measures
SYS 0248414 LBL 01522^^^^^2200217^^^450 005 20240513082003.7 014 $a 000404286400029 $2 CCC 014 $a 000404286400029 $2 WOS CC. SCIE 014 $a 2-s2.0-85021271525 $2 SCOPUS 017 70
$a 10.3233/JIFS-161647 $2 DOI 100 $a 20170711d2017 m y slo 03 ba 101 0-
$a eng 102 $a NL 200 1-
$a Generalizated local divergence measures $f Vladimír Kobza, Vladimír Janiš, Susana Montes 330 0-
$a The comparison of sets is an important topic with application in several fields. Divergence measures were introduced as an adequate measure of comparison of two fuzzy sets and an alternative of the dissimilarities. The particular study for local divergences is here generalized to any t-conorm instead just the sum. The concept of divergence is revisited and studied in detail. This study is complemented with the whole characterization of a new family of divergence measures, the generalized local divergence measures. Some applications of these divergences in pattern recognition and decision making illustrate their utility. 463 -1
$1 001 umb_un_cat*0288005 $1 200 1 $a Journal of Intelligent & Fuzzy Systems $v Vol. 33, no. 1 (2017), pp. 337-350 $1 210 $a Amsterdam $c IOS Press $d 2017 $1 011 $a 1064-1246 $1 011 $a 1875-8967 606 0-
$3 umb_un_auth*0118265 $a divergence measure 606 0-
$3 umb_un_auth*0171110 $a t-conorms 606 0-
$3 umb_un_auth*0160582 $a localities 606 0-
$3 umb_un_auth*0261354 $a S-locality 606 0-
$3 umb_un_auth*0035809 $a aggregation operators 615 $n 51 $a Matematika 675 $a 51 700 -1
$3 umb_un_auth*0178208 $a Kobza $b Vladimír $p UMBFP10 $9 45 $q 1 $f 1988- $4 070 $T Katedra matematiky 701 -0
$3 umb_un_auth*0001319 $a Janiš $b Vladimír $p UMBFP10 $4 070 $9 45 $f 1963- $T Katedra matematiky 701 -0
$3 umb_un_auth*0031149 $a Montes $b Susana $4 070 $9 10 801 $a SK $b BB301 $g AACR2 $9 unimarc sk T85 $x existuji fulltexy
Počet záznamov: 1