000772510 000__ 02906cam\a2200481Mc\4500
000772510 001__ 772510
000772510 005__ 20230306142542.0
000772510 006__ m\\\\\o\\d\\\\\\\\
000772510 007__ cr\un\nnnunnun
000772510 008__ 170113s2016\\\\sz\a\\\\o\\\\\000\0\eng\d
000772510 020__ $$a9783319488172$$q(electronic book)
000772510 020__ $$a3319488171$$q(electronic book)
000772510 020__ $$z9783319488165
000772510 0247_ $$a10.1007/978-3-319-48817-2$$2doi
000772510 0248_ $$a10.1007/978-3-319-48817-2
000772510 035__ $$aSP(OCoLC)ocn968300993
000772510 035__ $$aSP(OCoLC)968300993
000772510 040__ $$aDKDLA$$beng$$epn$$cDKDLA$$dOCLCO$$dAZU$$dGW5XE$$dYDX$$dUAB$$dCOO$$dOCLCQ$$dOCLCO
000772510 049__ $$aISEA
000772510 050_4 $$aQA242
000772510 050_4 $$aQA241-247.5
000772510 08204 $$a512.7/4$$223
000772510 08204 $$a512.7$$223
000772510 24500 $$aDiophantine analysis :$$bcourse notes from a Summer School /$$cJörn Steuding, editor
000772510 264_1 $$aCham :$$bBirkhäuser,$$c2016
000772510 300__ $$a1 online resource (xi, 232 pages) :$$billustrations.
000772510 336__ $$atext$$btxt$$2rdacontent
000772510 337__ $$acomputer$$bc$$2rdamedia
000772510 338__ $$aonline resource$$bcr$$2rdacarrier
000772510 347__ $$atext file$$bPDF$$2rda
000772510 4901_ $$aTrends in Mathematics,$$x2297-0215
000772510 5050_ $$a1. Linear Forms in Logarithms (by Sanda Bujaďić, Alan Filipin) -- 2. Metric Diophantine Approximation -- From Continued Fractions to Fractals (by Simon Kristensen) -- 3. A Geometric Face of Diophantine Analysis (by Tapani Matala-aho) -- 4. Historical Face of Number Theory(ists) at the turn of the 19th Century (by Nicola M.R. Oswald)
000772510 506__ $$aAccess limited to authorized users.
000772510 5208_ $$aThis collection of course notes from a number theory summer school focus on aspects of Diophantine Analysis, addressed to Master and doctoral students as well as everyone who wants to learn the subject. The topics range from Baker's method of bounding linear forms in logarithms (authored by Sanda Bujaďić and Alan Filipin), metric diophantine approximation discussing in particular the yet unsolved Littlewood conjecture (by Simon Kristensen), Minkowski's geometry of numbers and modern variations by Bombieri and Schmidt (Tapani Matala-aho), and a historical account of related number theory(ists) at the turn of the 19th Century (Nicola M.R. Oswald). Each of these notes serves as an essentially self-contained introduction to the topic. The reader gets a thorough impression of Diophantine Analysis by its central results, relevant applications and open problems. The notes are complemented with many references and an extensive register which makes it easy to navigate through the book
000772510 650_0 $$aDiophantine analysis.
000772510 650_0 $$aMathematics.
000772510 650_0 $$aNumber theory.
000772510 7001_ $$aSteuding, Jörn,$$eeditor
000772510 830_0 $$aTrends in mathematics.
000772510 852__ $$bebk
000772510 85640 $$3SpringerLink$$uhttps://univsouthin.idm.oclc.org/login?url=http://link.springer.com/10.1007/978-3-319-48817-2$$zOnline Access$$91397441.1
000772510 909CO $$ooai:library.usi.edu:772510$$pGLOBAL_SET
000772510 980__ $$aEBOOK
000772510 980__ $$aBIB
000772510 982__ $$aEbook
000772510 983__ $$aOnline
000772510 994__ $$a92$$bISE