000456531 000__ 01636cam\a2200277Ia\4500
000456531 001__ 456531
000456531 005__ 20210513160736.0
000456531 008__ 120822s2013\\\\nyua\\\\\b\\\\001\0\eng\d
000456531 010__ $$a  2012924095
000456531 020__ $$a9780465022403
000456531 020__ $$a0465022405
000456531 020__ $$z9781846681998 (British ISBN)
000456531 035__ $$a(OCoLC)ocn808413612
000456531 040__ $$aBTCTA$$beng$$cBTCTA$$dYDXCP$$dBDX$$dOCO$$dIFJ$$dABG$$dMOF$$dCGP$$dVP@$$dBWX
000456531 049__ $$aISEA
000456531 05014 $$aQA93$$b.S75 2013
000456531 08204 $$a510$$223
000456531 1001_ $$aStewart, Ian,$$d1945-
000456531 24510 $$aVisions of infinity :$$bthe great mathematical problems /$$cIan Stewart.
000456531 260__ $$aNew York, NY :$$bBasic Books,$$cc2013.
000456531 300__ $$ax, 340 p. :$$bill. ;$$c25 cm.
000456531 504__ $$aIncludes bibliographical references (p. [305]-324) and index.
000456531 5050_ $$aGreat problems -- Prime territory : Goldbach Conjecture -- The puzzle of pi : squaring the circle -- Mapmaking mysteries : Four Color theorem -- Sphereful symmetry : Kepler Conjecture -- New solutions for old : Mordell Conjecture -- Inadequate margins : Fermat's Last Theorem -- Orbital chaos : Three-body problem -- Patterns in prime : Riemann Hypothesis -- What shape is a sphere? : Poincaré Conjecture -- They can't all be easy : P/NP problem -- Fluid thinking : Navier-Stokes Equation -- Quantum conundrum : Mass Gap Hypothesis -- Diophantine dreams : Birch-Swinnerton-Dyer Conjecture -- Complex cycles : Hodge Conjecture -- Where next? -- Twelve for the future.
000456531 520__ $$a"Overview of the most formidable problems mathematicians have vanquished, and those that vex them still"--Dust jacket flap.
000456531 650_0 $$aMathematics.
000456531 650_0 $$aNumber theory.
000456531 85200 $$bgen$$hQA93$$i.S75$$i2013
000456531 909CO $$ooai:library.usi.edu:456531$$pGLOBAL_SET
000456531 980__ $$aBIB
000456531 980__ $$aBOOK