000 | 01629nam 2200301| 4500 | ||
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001 | 82468 | ||
005 | 20210308114332.0 | ||
010 |
_a978-3-7643-7316-0 _dcompra |
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090 | _a82468 | ||
100 | _a20190128d2005 k||y0pory50 ba | ||
101 | _aeng | ||
102 | _aUS | ||
200 |
_aQuadrature domains and their applications _bDocumento eletrónico _ethe Harold S. Shapiro anniversary volume _fedited by Peter Ebenfelt ... [et al.] |
||
210 |
_aBasel _cBirkhäuser _d2005 |
||
215 | _aXXVIII, 278 p. | ||
225 |
_aOperator Theory _eAdvances and Applications _h156 |
||
300 | _aColocação: Online | ||
303 | _aQuadrature domains were singled out about 30 years ago by D. Aharonov and H.S. Shapiro in connection with an extremal problem in function theory. Since then, a series of coincidental discoveries put this class of planar domains at the center of crossroads of several quite independent mathematical theories, e.g., potential theory, Riemann surfaces, inverse problems, holomorphic partial differential equations, fluid mechanics, operator theory. The volume is devoted to recent advances in the theory of quadrature domains, illustrating well the multi-facet aspects of their nature. The book contains a large collection of open problems pertaining to the general theme of quadrature domains. | ||
410 |
_x0255-0156 _v156 |
||
606 | _aFunções de várias variáveis complexas | ||
606 | _aTeoria do potencial (Matemática) | ||
680 | _aQA331.7 | ||
702 |
_aEbenfelt _bPeter _4340 _931852 |
||
801 |
_gRPC _aPT |
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856 | _uhttps://doi.org/10.1007/b137105 | ||
942 |
_2lcc _cF _n0 |