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17:
419:. The independency relation is symmetric and irreflexive. Conversely, given any symmetric and irreflexive relation
991:
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24:
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27:, which is a generalization of the concept of linear dependence among members of a vector space.
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79:
800:
1379:{\displaystyle D=\{(a,b),\,(b,a),\,(a,c),\,(c,a),\,(a,a),\,(b,b),\,(c,c)\}}
399:
That is, the independency is the set of all ordered pairs that are not in
1137:
by a finite sequence of swaps of adjacent independent symbols. The
1624:
IJsbrand Jan
Aalbersberg and Grzegorz Rozenberg (Mar 1988).
1619:
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52:
479:{\displaystyle D=(\Sigma \times \Sigma )\setminus I}
389:{\displaystyle I=(\Sigma \times \Sigma )\setminus D}
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411:
388:
342:
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298:
274:
240:
202:
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135:
93:
58:
829:of all possible strings of finite length by:
568:, but this term may also refer to the triple
8:
1439:
1402:
1373:
1241:
1215:
1197:
1666:
1641:
1573:
1541:
1509:
1483:
1478:are independent of one another, and e.g.
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651:
631:
611:
573:
533:
497:
447:
424:
404:
357:
335:
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291:
267:
256:; thus, they generalize the notion of an
252:In general, dependency relations are not
215:
189:
148:
110:
86:
51:
1689:. In Rozenberg, G.; Diekert, V. (eds.).
1609:
1026:{\displaystyle \equiv _{(\Sigma ,D,I)}}
779:, a symmetric and irreflexive relation
470:
380:
1659:Trace semantics for concurrent objects
1657:Vasconcelos, Vasco Thudichum (1992).
7:
1228:, a possible dependency relation is
1445:{\displaystyle I=\{(b,c),\,(c,b)\}}
439:on a finite alphabet, the relation
1389:The corresponding independency is
1191:
1043:
1003:
905:{\displaystyle x,y\in \Sigma ^{*}}
893:
810:
751:
665:
578:
538:
502:
464:
458:
374:
368:
269:
197:
78:. That is, it is a finite set of
53:
14:
1221:{\displaystyle \Sigma =\{a,b,c\}}
1693:. Singapore: World Scientific.
1661:(MsC thesis). Keio University.
866:{\displaystyle xaby\doteq xbay}
1728:Properties of binary relations
1684:"Introduction to Trace Theory"
1436:
1424:
1417:
1405:
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671:{\displaystyle x,y\in \Sigma }
593:
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455:
377:
365:
229:
217:
162:
150:
124:
112:
1:
1682:Mazurkiewicz, Antoni (1995).
1064:{\displaystyle (\Sigma ,D,I)}
772:{\displaystyle (\Sigma ,D,I)}
599:{\displaystyle (\Sigma ,D,I)}
1643:10.1016/0304-3975(88)90051-5
1630:Theoretical Computer Science
912:and all independent symbols
260:by discarding transitivity.
203:{\displaystyle a\in \Sigma }
822:{\displaystyle \Sigma ^{*}}
553:{\displaystyle (\Sigma ,I)}
517:{\displaystyle (\Sigma ,D)}
18:Dependency (disambiguation)
1744:
1600:, but to no other string.
1504:are dependent. The string
1071:-equivalence. Informally,
741:Given a reliance alphabet
489:is a dependency relation.
241:{\displaystyle (a,a)\in D}
174:{\displaystyle (b,a)\in D}
136:{\displaystyle (a,b)\in D}
22:
15:
1090:{\displaystyle p\equiv q}
1452:. Then e.g. the symbols
1117:can be transformed into
937:{\displaystyle a,b\in I}
23:Not to be confused with
1154:{\displaystyle \equiv }
981:{\displaystyle \equiv }
961:{\displaystyle \doteq }
792:{\displaystyle \doteq }
330:is the binary relation
275:{\displaystyle \Sigma }
59:{\displaystyle \Sigma }
1594:
1562:
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799:can be defined on the
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95:
60:
1595:
1593:{\displaystyle abbca}
1563:
1561:{\displaystyle abcba}
1531:
1529:{\displaystyle acbba}
1499:
1473:
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1381:
1223:
1180:
1165:, and are studied in
1156:
1132:
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983:
963:
939:
907:
868:
824:
794:
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641:
621:
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562:independency alphabet
555:
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96:
61:
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1097:holds if the string
1075:
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992:
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290:
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258:equivalence relation
214:
188:
147:
109:
85:
50:
16:For other uses, see
1497:{\displaystyle a,b}
1471:{\displaystyle b,c}
1184:Given the alphabet
1139:equivalence classes
946:equivalence closure
731:{\displaystyle xIy}
701:{\displaystyle xDy}
526:concurrent alphabet
282:is also called the
46:on a finite domain
40:dependency relation
34:, in particular in
25:Dependence relation
1691:The Book of Traces
1626:"Theory of traces"
1590:
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91:
76:tolerance relation
56:
36:concurrency theory
1536:is equivalent to
1130:{\displaystyle q}
1110:{\displaystyle p}
639:{\displaystyle D}
619:{\displaystyle I}
566:reliance alphabet
432:{\displaystyle I}
412:{\displaystyle D}
343:{\displaystyle I}
323:{\displaystyle D}
299:{\displaystyle D}
94:{\displaystyle D}
1735:
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32:computer science
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44:binary relation
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1700:981-02-2058-8
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88:
81:
80:ordered pairs
77:
73:
69:
45:
41:
37:
33:
26:
19:
1704:. Retrieved
1690:
1677:
1658:
1652:
1633:
1629:
1388:
1183:
1167:trace theory
740:
709:
679:
646:). Elements
565:
561:
525:
491:
488:
398:
308:independency
307:
262:
251:
101:, such that
39:
29:
1636:(1): 1–82.
1161:are called
1033:and called
968:is denoted
801:free monoid
710:independent
708:holds, and
678:are called
626:induced by
528:. The pair
310:induced by
248:(reflexive)
181:(symmetric)
1604:References
254:transitive
1663:CiteSeerX
1192:Σ
1149:≡
1082:≡
1044:Σ
1004:Σ
997:≡
976:≡
956:≐
929:∈
898:∗
894:Σ
890:∈
849:≐
815:∗
811:Σ
787:≐
752:Σ
680:dependent
666:Σ
663:∈
579:Σ
539:Σ
503:Σ
492:The pair
471:∖
465:Σ
462:×
459:Σ
381:∖
375:Σ
372:×
369:Σ
286:on which
270:Σ
233:∈
198:Σ
195:∈
166:∈
128:∈
72:reflexive
68:symmetric
54:Σ
1722:Category
1706:18 April
1173:Examples
738:holds).
284:alphabet
210:, then
1568:and to
1697:
1665:
1163:traces
944:. The
606:(with
143:then
70:, and
1687:(PDF)
42:is a
1708:2021
1695:ISBN
38:, a
1638:doi
1141:of
988:or
948:of
682:if
564:or
184:If
105:If
30:In
1724::
1634:60
1632:.
1628:.
1612:^
1169:.
66:,
1710:.
1671:.
1646:.
1640::
1588:a
1585:c
1582:b
1579:b
1576:a
1556:a
1553:b
1550:c
1547:b
1544:a
1524:a
1521:b
1518:b
1515:c
1512:a
1492:b
1489:,
1486:a
1466:c
1463:,
1460:b
1440:}
1437:)
1434:b
1431:,
1428:c
1425:(
1421:,
1418:)
1415:c
1412:,
1409:b
1406:(
1403:{
1400:=
1397:I
1374:}
1371:)
1368:c
1365:,
1362:c
1359:(
1355:,
1352:)
1349:b
1346:,
1343:b
1340:(
1336:,
1333:)
1330:a
1327:,
1324:a
1321:(
1317:,
1314:)
1311:a
1308:,
1305:c
1302:(
1298:,
1295:)
1292:c
1289:,
1286:a
1283:(
1279:,
1276:)
1273:a
1270:,
1267:b
1264:(
1260:,
1257:)
1254:b
1251:,
1248:a
1245:(
1242:{
1239:=
1236:D
1216:}
1213:c
1210:,
1207:b
1204:,
1201:a
1198:{
1195:=
1125:q
1105:p
1085:q
1079:p
1059:)
1056:I
1053:,
1050:D
1047:,
1041:(
1019:)
1016:I
1013:,
1010:D
1007:,
1001:(
932:I
926:b
923:,
920:a
887:y
884:,
881:x
861:y
858:a
855:b
852:x
846:y
843:b
840:a
837:x
767:)
764:I
761:,
758:D
755:,
749:(
726:y
723:I
720:x
696:y
693:D
690:x
660:y
657:,
654:x
634:D
614:I
594:)
591:I
588:,
585:D
582:,
576:(
548:)
545:I
542:,
536:(
512:)
509:D
506:,
500:(
474:I
468:)
456:(
453:=
450:D
427:I
407:D
384:D
378:)
366:(
363:=
360:I
338:I
318:D
294:D
236:D
230:)
227:a
224:,
221:a
218:(
192:a
169:D
163:)
160:a
157:,
154:b
151:(
131:D
125:)
122:b
119:,
116:a
113:(
89:D
20:.
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