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100   $a20121112d1993    |||||ita|0103    ba
101   $aeng
102   $aGB
200 1 $a<<6: The >>Victorians$fedited by Arthur Pollard
210   $aLondon$cPenguin books$d1993
215   $aIX, 569 p.$d20 cm
461  1$1001SOBE00028502$12001 $aThe Penguin history of literature
702  1$aPollard, Arthur$3A600200029313$4070
801  0$aIT$bUNISOB$c20150715$gRICA
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852   $aUNISOB$j820|Let$m81646
912   $aSOBE00028508
940   $aM 102 Monografia moderna SBN
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020   $a9783319022727 (pbk.)
035   $ab1431616x-39ule_inst
040   $aBibl. Dip.le Aggr. Matematica e Fisica - Sez. Matematica$beng
082 04$a515.35$223
084   $aAMS 35L45
084   $aAMS 35L40
084   $aAMS 35L55
100 1 $aNishitani, Tatsuo$059540
245 10$aHyperbolic systems with analytic coefficients :$bwell-posedness of the Cauchy problem /$cTatsuo Nishitani
264  1$aCham :$bSpringer,$c2014
300   $aviii, 237 p. :$bill. ;$c24 cm
336   $atext$2rdacontent
337   $aunmediated$2rdamedia
338   $avolume$2rdacarrier
490 1 $aLecture notes in mathematics,$x0075-8434 ;$v2097
504   $aIncludes bibliographical references and index
505 0 $aNecessary conditions for strong hyperbolicity ; Two by two systems with two independent variables ; Systems with nondegenerate characteristics
520   $aThis monograph focuses on the well-posedness of the Cauchy problem for linear hyperbolic systems with matrix coefficients. Mainly two questions are discussed: (A) Under which conditions on lower order terms is the Cauchy problem well posed? (B) When is the Cauchy problem well posed for any lower order term? For first order two by two systems with two independent variables with real analytic coefficients, we present complete answers for both (A) and (B). For first order systems with real analytic coefficients we prove general necessary conditions for question (B) in terms of minors of the principal symbols. With regard to sufficient conditions for (B), we introduce hyperbolic systems with nondegenerate characteristics, which contains strictly hyperbolic systems, and prove that the Cauchy problem for hyperbolic systems with nondegenerate characteristics is well posed for any lower order term. We also prove that any hyperbolic system which is close to a hyperbolic system with a nondegenerate characteristic of multiple order has a nondegenerate characteristic of the same order nearby
650  0$aCauchy problem
650  0$aDifferential equations, Hyperbolic
907   $a.b1431616x$b07-02-17$c07-02-17
912   $a991003324909707536
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996   $aHyperbolic systems with analytic coefficients$9820703
997   $aUNISALENTO
998   $ale013$b07-02-17$cm$da  $e-$feng$gsz $h0$i0