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** Eschiva of Lusignan ( c. 1323 or 1322 – 1324 – of the plague, 1363 and buried in Nicosia ), married after 5 March 1337 / 1339, separated since 22 April 1341, Infante Fernando ( Ferran ) of Majorca ( March / April, 1317 – ca.
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** and Lusignan
** Guy of Lusignan ( c. 1316 or 1315 – 1316 – soon before 24 September 1343 and buried in Nicosia ), Constable of Cyprus ( 1336 – 1338 ) and Titular Prince of Galilee ca.
** John of Lusignan ( c. 1329 or 1329 / 1330 – 1375 ), Regent of Cyprus and Titular Prince of Antioch, murdered, married twice, firstly in 1343 to Constance, daughter of Frederick III of Sicily and Eleanor of Anjou, without issue, and secondly in 1350 to Alice d ' Ibelin ( d. after 1373 ), by whom he had issue
** His daughter, Almodis, married firstly with Hugh V of Lusignan, and their son Hugh VI inherited later the county of Marche by her right.
** Eustachie de Lusignan ( d. Carthage, Tunisia, 1270 ), married 1257 Dreux III de Mello ( d. 1310 )
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** Eunectes murinus, the green anaconda, the largest species, is found east of the Andes in Colombia, Venezuela, the Guianas, Ecuador, Peru, Bolivia, Brazil and on the island of Trinidad.
** Eunectes notaeus, the yellow anaconda, a smaller species, is found in eastern Bolivia, southern Brazil, Paraguay and northeastern Argentina.
** Eunectes deschauenseei, the dark-spotted anaconda, is a rare species found in northeastern Brazil and coastal French Guiana.
** Eunectes beniensis, the Bolivian anaconda, the most recently defined species, is found in the Departments of Beni and Pando in Bolivia.
** Tarski's theorem: For every infinite set A, there is a bijective map between the sets A and A × A.
** Trichotomy: If two sets are given, then either they have the same cardinality, or one has a smaller cardinality than the other.
** König's theorem: Colloquially, the sum of a sequence of cardinals is strictly less than the product of a sequence of larger cardinals.
** Zorn's lemma: Every non-empty partially ordered set in which every chain ( i. e. totally ordered subset ) has an upper bound contains at least one maximal element.
** Hausdorff maximal principle: In any partially ordered set, every totally ordered subset is contained in a maximal totally ordered subset.
** Tukey's lemma: Every non-empty collection of finite character has a maximal element with respect to inclusion.
** In the product topology, the closure of a product of subsets is equal to the product of the closures.
** If S is a set of sentences of first-order logic and B is a consistent subset of S, then B is included in a set that is maximal among consistent subsets of S. The special case where S is the set of all first-order sentences in a given signature is weaker, equivalent to the Boolean prime ideal theorem ; see the section " Weaker forms " below.
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