000 02247nam a22003858i 4500
001 CR9781108348096
003 UkCbUP
005 20200124160339.0
006 m|||||o||d||||||||
007 cr||||||||||||
008 170710s2018||||enk o ||1 0|eng|d
020 _a9781108348096 (ebook)
020 _z9781108424943 (hardback)
040 _aUkCbUP
_beng
_erda
_cUkCbUP
050 0 0 _aQA242
_b.C67 2018
082 0 0 _a512.7/4
_223
100 1 _aCorvaja, Pietro,
_eauthor.
245 1 0 _aApplications of Diophantine approximation to integral points and transcendence /
_cPietro Corvaja, Universita degli Studi di Udine, Italy, Umberto Zannier, Scuola Normale Superiore, Pisa.
264 1 _aCambridge :
_bCambridge University Press,
_c2018.
300 _a1 online resource (x, 198 pages) :
_bdigital, PDF file(s).
336 _atext
_btxt
_2rdacontent
337 _acomputer
_bc
_2rdamedia
338 _aonline resource
_bcr
_2rdacarrier
490 1 _aCambridge tracts in mathematics ;
_v212
500 _aTitle from publisher's bibliographic system (viewed on 20 Jun 2018).
520 _aThis introduction to the theory of Diophantine approximation pays special regard to Schmidt's subspace theorem and to its applications to Diophantine equations and related topics. The geometric viewpoint on Diophantine equations has been adopted throughout the book. It includes a number of results, some published here for the first time in book form, and some new, as well as classical material presented in an accessible way. Graduate students and experts alike will find the book's broad approach useful for their work, and will discover new techniques and open questions to guide their research. It contains concrete examples and many exercises (ranging from the relatively simple to the much more complex), making it ideal for self-study and enabling readers to quickly grasp the essential concepts.
650 0 _aDiophantine analysis.
650 0 _aTranscendental numbers.
650 0 _aNumber theory.
650 0 _aNumbers, Real.
700 1 _aZannier, U.
_q(Umberto),
_d1957-
_eauthor.
776 0 8 _iPrint version:
_z9781108424943
830 0 _aCambridge tracts in mathematics ;
_v212.
856 4 0 _uhttps://doi.org/10.1017/9781108348096
999 _c523337
_d523335