000708429 000__ 01693cam\a2200349\a\4500
000708429 001__ 708429
000708429 005__ 20210515100314.0
000708429 006__ m\\\\\o\\d\\\\\\\\
000708429 007__ cr\cn\nnnunnun
000708429 008__ 121126s2013\\\\njuad\\\ob\\\\001\0\eng\d
000708429 010__ $$z  2012046042
000708429 020__ $$z9789814417396$$qhardcover
000708429 020__ $$z9814417394$$qhardcover
000708429 020__ $$z9789814417402$$qelectronic book
000708429 035__ $$a(CaPaEBR)ebr10691974
000708429 035__ $$a(OCoLC)839388513
000708429 040__ $$aCaPaEBR$$cCaPaEBR
000708429 05014 $$aQA272.4$$b.M35 2013eb
000708429 08204 $$a519.3$$223
000708429 1001_ $$aMcCain, Roger A.
000708429 24510 $$aValue solutions in cooperative games$$h[electronic resource] /$$cRoger A. McCain.
000708429 260__ $$aHackensack, N.J. :$$bWorld Scientific Pub.,$$cc2013.
000708429 300__ $$aix, 225 p. :$$bill.
000708429 504__ $$aIncludes bibliographical references and index.
000708429 5050_ $$aValue solutions for superadditive transferable utility games in coalition function form -- Zeuthen-Nash bargaining -- Nontransferable utility games and games in partition function form -- A shapley value algorithm for games in partition function form -- Extension of the nucleolus to nontransferable utility games in partition function form -- A core imputation with variable bargaining power -- Bargaining power biform games -- Intertemporal cooperative games: a sketch of a theory -- A theory of enterprise.
000708429 506__ $$aAccess limited to authorized users.
000708429 650_0 $$aCooperative games (Mathematics)
000708429 650_0 $$aGame theory.
000708429 650_0 $$aValues.
000708429 852__ $$bebk
000708429 85640 $$3ProQuest Ebook Central Academic Complete$$uhttps://univsouthin.idm.oclc.org/login?url=http://site.ebrary.com/lib/usiricelib/Doc?id=10691974$$zOnline Access
000708429 909CO $$ooai:library.usi.edu:708429$$pGLOBAL_SET
000708429 980__ $$aEBOOK
000708429 980__ $$aBIB
000708429 982__ $$aEbook
000708429 983__ $$aOnline