LEADER 01033nam--2200361---450- 001 990000817210203316 005 20091002122858.0 035 $a0081721 035 $aUSA010081721 035 $a(ALEPH)000081721USA01 035 $a0081721 100 $a20011220d1982----km-y0itay0103----ba 101 $apor 102 $aPT 105 $a||||||||001yy 200 1 $a<> discurso na aula$euma análise sociolinguística da prática escolar em Portugal$fEmilia Ribeiro Pedro 210 $aLisboa$cRolim$d1982 215 $a227 p.$d21 cm 410 0$12001 606 0 $aScuola$yPortogallo 676 $a371.009469 700 1$aRIBEIRO PEDRO,$bEmilia$0550787 801 0$aIT$bsalbc$gISBD 912 $a990000817210203316 951 $aI.14.B.3$b474 DSLL 959 $aBK 969 $aDSLL 979 $aPATRY$b90$c20011220$lUSA01$h1340 979 $c20020403$lUSA01$h1728 979 $aPATRY$b90$c20040406$lUSA01$h1656 979 $aDSLL$b90$c20091002$lUSA01$h1228 996 $aDiscurso na aula$9966991 997 $aUNISA LEADER 01098nam--2200349---450- 001 990002203760203316 005 20110126100748.0 035 $a000220376 035 $aUSA01000220376 035 $a(ALEPH)000220376USA01 035 $a000220376 100 $a20041123d1981----km-y0itay0103----ba 101 $ager 102 $aDE 105 $a||||||||001yy 200 1 $aTransnationales Recht$fEugen Langen 210 $aHeidelberg$cVerlagsgesellschaft$dcopyr 1981 215 $a241 p.$cRecht und Wirhschaft$d21 cm 225 2 $aSchriftenreihe recht der internationalen wirtschaft$v20 410 0$12001$aSchriftenreihe recht der internationalen wirtschaft$v20 454 1$12001 461 1$1001-------$12001 801 0$aIT$bsalbc$gISBD 912 $a990002203760203316 951 $aXXIII.3.E. 14 (IG VIII 1 759)$b14838 G.$cXXIII.3.E.$d00239753 959 $aBK 969 $aGIU 979 $aSIAV1$b10$c20041123$lUSA01$h1336 979 $aRSIAV5$b90$c20091006$lUSA01$h1102 979 $aCAPRI$b90$c20110126$lUSA01$h1007 996 $aTransnationales Recht$91032371 997 $aUNISA LEADER 06680nam 2201885 450 001 9910786510203321 005 20230421030941.0 010 $a0-691-00257-6 010 $a1-4008-6518-2 024 7 $a10.1515/9781400865185 035 $a(CKB)3710000000221858 035 $a(EBL)1756204 035 $a(OCoLC)887499708 035 $a(SSID)ssj0001333670 035 $a(PQKBManifestationID)12618247 035 $a(PQKBTitleCode)TC0001333670 035 $a(PQKBWorkID)11394032 035 $a(PQKB)11541986 035 $a(MiAaPQ)EBC1756204 035 $a(DE-B1597)447948 035 $a(OCoLC)922696192 035 $a(DE-B1597)9781400865185 035 $a(Au-PeEL)EBL1756204 035 $a(CaPaEBR)ebr10907682 035 $a(CaONFJC)MIL636773 035 $a(EXLCZ)993710000000221858 100 $a20140822h19981998 uy 0 101 0 $aeng 135 $aur|nu---|u||u 181 $ctxt 182 $cc 183 $acr 200 14$aThe real Fatou conjecture /$fby Jacek Graczyk and Grzegorz Swiatek 210 1$aPrinceton, New Jersey :$cPrinceton University Press,$d1998. 210 4$d{copy}1998 215 $a1 online resource (158 p.) 225 1 $aAnnals of Mathematics Studies ;$vNumber 144 300 $aDescription based upon print version of record. 311 0 $a1-322-05522-X 311 0 $a0-691-00258-4 320 $aIncludes bibliographical references and index. 327 $tFront matter --$tContents --$tChapter 1. Review of Concepts --$tChapter 2. Quasiconformal Gluing --$tChapter 3. Polynomial-Like Property --$tChapter 4. Linear Growth of Moduli --$tChapter 5. Quasi conformal Techniques --$tBibliography --$tIndex 330 $aIn 1920, Pierre Fatou expressed the conjecture that--except for special cases--all critical points of a rational map of the Riemann sphere tend to periodic orbits under iteration. This conjecture remains the main open problem in the dynamics of iterated maps. For the logistic family x- ax(1-x), it can be interpreted to mean that for a dense set of parameters "a," an attracting periodic orbit exists. The same question appears naturally in science, where the logistic family is used to construct models in physics, ecology, and economics. In this book, Jacek Graczyk and Grzegorz Swiatek provide a rigorous proof of the Real Fatou Conjecture. In spite of the apparently elementary nature of the problem, its solution requires advanced tools of complex analysis. The authors have written a self-contained and complete version of the argument, accessible to someone with no knowledge of complex dynamics and only basic familiarity with interval maps. The book will thus be useful to specialists in real dynamics as well as to graduate students. 410 0$aAnnals of mathematics studies ;$vNumber 144. 606 $aGeodesics (Mathematics) 606 $aPolynomials 606 $aMappings (Mathematics) 610 $aAbsolute value. 610 $aAffine transformation. 610 $aAlgebraic function. 610 $aAnalytic continuation. 610 $aAnalytic function. 610 $aArithmetic. 610 $aAutomorphism. 610 $aBig O notation. 610 $aBounded set (topological vector space). 610 $aC0. 610 $aCalculation. 610 $aCanonical map. 610 $aChange of variables. 610 $aChebyshev polynomials. 610 $aCombinatorics. 610 $aCommutative property. 610 $aComplex number. 610 $aComplex plane. 610 $aComplex quadratic polynomial. 610 $aConformal map. 610 $aConjecture. 610 $aConjugacy class. 610 $aConjugate points. 610 $aConnected component (graph theory). 610 $aConnected space. 610 $aContinuous function. 610 $aCorollary. 610 $aCovering space. 610 $aCritical point (mathematics). 610 $aDense set. 610 $aDerivative. 610 $aDiffeomorphism. 610 $aDimension. 610 $aDisjoint sets. 610 $aDisjoint union. 610 $aDisk (mathematics). 610 $aEquicontinuity. 610 $aEstimation. 610 $aExistential quantification. 610 $aFibonacci. 610 $aFunctional equation. 610 $aFundamental domain. 610 $aGeneralization. 610 $aGreat-circle distance. 610 $aHausdorff distance. 610 $aHolomorphic function. 610 $aHomeomorphism. 610 $aHomotopy. 610 $aHyperbolic function. 610 $aImaginary number. 610 $aImplicit function theorem. 610 $aInjective function. 610 $aInteger. 610 $aIntermediate value theorem. 610 $aInterval (mathematics). 610 $aInverse function. 610 $aIrreducible polynomial. 610 $aIteration. 610 $aJordan curve theorem. 610 $aJulia set. 610 $aLimit of a sequence. 610 $aLinear map. 610 $aLocal diffeomorphism. 610 $aMathematical induction. 610 $aMathematical proof. 610 $aMaxima and minima. 610 $aMeromorphic function. 610 $aModuli (physics). 610 $aMonomial. 610 $aMonotonic function. 610 $aNatural number. 610 $aNeighbourhood (mathematics). 610 $aOpen set. 610 $aParameter. 610 $aPeriodic function. 610 $aPeriodic point. 610 $aPhase space. 610 $aPoint at infinity. 610 $aPolynomial. 610 $aProjection (mathematics). 610 $aQuadratic function. 610 $aQuadratic. 610 $aQuasiconformal mapping. 610 $aRenormalization. 610 $aRiemann sphere. 610 $aRiemann surface. 610 $aSchwarzian derivative. 610 $aScientific notation. 610 $aSubsequence. 610 $aTheorem. 610 $aTheory. 610 $aTopological conjugacy. 610 $aTopological entropy. 610 $aTopology. 610 $aUnion (set theory). 610 $aUnit circle. 610 $aUnit disk. 610 $aUpper and lower bounds. 610 $aUpper half-plane. 610 $aZ0. 615 0$aGeodesics (Mathematics) 615 0$aPolynomials. 615 0$aMappings (Mathematics) 676 $a516.3/62 700 $aGraczyk$b Jacek$066776 702 $aSwiatek$b Grzegorz$f1964- 801 0$bMiAaPQ 801 1$bMiAaPQ 801 2$bMiAaPQ 906 $aBOOK 912 $a9910786510203321 996 $aReal Fatou conjecture$91501746 997 $aUNINA