000 02351nam a22003255i 4500
001 64922
005 20210429115029.0
010 _a978-0-8176-8247-7
_dcompra
090 _a64922
100 _a20150401d2011 k||y0pory50 ba
101 _aeng
102 _aUS
200 _aThe heat Kernel Lefschetz fixed point formula for the spin-c Dirac operator
_bDocumento electrónico
_fJ. J. Duistermaat
210 _aBoston, MA
_cBirkhäuser
_d2011
215 _aVIII, 247 p.
225 _aModern Birkhäuser Classics
300 _aColocação: Online
303 _aInterest in the spin-c Dirac operator originally came about from the study of complex analytic manifolds, where in the non-Kähler case the Dolbeault operator is no longer suitable for getting local formulas for the Riemann–Roch number or the holomorphic Lefschetz number. However, every symplectic manifold (phase space in classical mechanics) also carries an almost complex structure and hence a corresponding spin-c Dirac operator. Using the heat kernels theory of Berline, Getzler, and Vergne, this work revisits some fundamental concepts of the theory, and presents the application to symplectic geometry. J.J. Duistermaat was well known for his beautiful and concise expositions of seemingly familiar concepts, and this classic study is certainly no exception. Reprinted as it was originally published, this work is as an affordable text that will be of interest to a range of researchers in geometric analysis and mathematical physics. Overall this is a carefully written, highly readable book on a very beautiful subject. —Mathematical Reviews The book of J.J. Duistermaat is a nice introduction to analysis related [to the] spin-c Dirac operator. ... The book is almost self contained, [is] readable, and will be useful for anybody who is interested in the topic. —EMS Newsletter The author's book is a marvelous introduction to [these] objects and theories. —Zentralblatt MATH
606 _aTopologia diferencial
606 _aTeoria dos operadores
606 _aFísica matemática
606 _aVariedades (Matemática)
680 _aQA613
700 _aDuistermaat
_bJ. J.
801 _aPT
_gRPC
856 _uhttp://dx.doi.org/10.1007/978-0-8176-8247-7
942 _2lcc
_cF
_n0