02131cam  22003858i 450000100090000000300050000900500170001400600190003100700150005000800410006502000270010604000240013305000210015708200170017810000260019524500790022126300090030026400700030930000340037933600210041333700250043433800230045949000740048250400510055650506430060750600500125053300950130053800360139558800470143160000340147865000250151277601160153785600440165385600480169718196733RPAM20170613145041.0m      b    001 0 cr/|||||||||||170613s2014    riu     ob    001 0 eng    a9781470418960 (online)  aDLCbengerdadRPAM00aQA564b.B53 201400a515/.7332231 aBlei, R. C.q(Ron C.)14aThe Grothendieck inequality revisited /h[electronic resource] cRon Blei.  a1411 1aProvidence, Rhode Island :bAmerican Mathematical Society,c2014.  a1 online resource (pages cm.)  atext2rdacontent  aunmediated2rdamedia  avolume2rdacarrier0 aMemoirs of the American Mathematical Society, x1947-6221 ; vv. 1093  aIncludes bibliographical references and index.00tChapter 1. IntroductiontChapter 2. Integral representations: the case of discrete domainstChapter 3. Integral representations: the case of topological domainstChapter 4. ToolstChapter 5. Proof of Theorem 3.5tChapter 6. Variations on a themetChapter 7. More about $\Phi $tChapter 8. IntegrabilitytChapter 9. A Parseval-like formula for $\langle {\bf {x}}, {\bf {y}}\rangle $, ${\bf {x}} \in l^p$, ${\bf {y}} \in l^q$tChapter 10. Grothendieck-like theorems in dimensions $>2$?tChapter 11. Fractional Cartesian products and multilinear functionals on a Hilbert spacetChapter 12. Proof of Theorem 11.11tChapter 13. Some loose ends1 aAccess is restricted to licensed institutions  aElectronic reproduction.bProvidence, Rhode Island :cAmerican Mathematical Society.d2014  aMode of access : World Wide Web  aDescription based on print version record.10aGrothendieck, A.q(Alexandre) 0aGeometry, Algebraic.0 iPrint version: aBlei, R. C.tGrothendieck inequality revisited /w(DLC)   2014024660x0065-9266z97808218985504 3Contentsuhttp://www.ams.org/memo/1093/4 3Contentsuhttps://doi.org/10.1090/memo/1093