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000347721 001__ 347721
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000347721 008__ 090212s2009\\\\riua\\\\\b\\\\001\0\eng\\
000347721 010__ $$a  2009005856
000347721 020__ $$a9780821848166 (pbk. : alk. paper)
000347721 020__ $$a082184816X (pbk. : alk. paper)
000347721 035__ $$a(OCoLC)ocn306803417
000347721 035__ $$a347721
000347721 040__ $$aDLC$$beng$$cDLC$$dUBY$$dDEBBG$$dCDX$$dOCLCQ$$dLMR
000347721 049__ $$aISEA
000347721 05000 $$aQA613$$b.B66 2009
000347721 08200 $$a516/.07$$222
000347721 1001_ $$aBonahon, Francis,$$d1955-
000347721 24510 $$aLow-dimensional geometry :$$bfrom Euclidean surfaces to hyperbolic knots /$$cFrancis Bonahon.
000347721 260__ $$aProvidence, R.I. :$$bAmerican Mathematical Society ;$$aPrinceton, N.J. :$$bInstitute for Advanced Study,$$cc2009.
000347721 300__ $$axvi, 384 p. :$$bill. ;$$c22 cm.
000347721 4901_ $$aStudent mathematical library.$$aIAS/Park City mathematical subseries ;$$vv. 49
000347721 504__ $$aIncludes bibliographical references and index.
000347721 5050_ $$aThe euclidean plane -- The hyperbolic plane -- The 2-dimensional sphere -- Gluing constructions -- Gluing examples -- Tessellations -- Group actions and fundamental domains -- The Farey tessellation and circle packing -- The 3-dimensional hyperbolic space -- Kleinian groups -- The figure-eight knot complement -- Geometrization theorems in dimension 3.
000347721 650_0 $$aManifolds (Mathematics)
000347721 650_0 $$aGeometry, Hyperbolic.
000347721 650_0 $$aGeometry, Plane.
000347721 650_0 $$aKnot theory.
000347721 830_0 $$aStudent mathematical library ;$$vv. 49.
000347721 830_0 $$aStudent mathematical library.$$pIAS/Park City mathematical subseries.
000347721 85200 $$bgen$$hQA613$$i.B66$$i2009
000347721 85641 $$3Table of contents only$$uhttp://catdir.loc.gov/catdir/toc/fy1001/2009005856.html
000347721 909CO $$ooai:library.usi.edu:347721$$pGLOBAL_SET
000347721 980__ $$aBIB
000347721 980__ $$aBOOK