01985nam 2200457 450 00001417820050718115500.03-540-18400-720030617d1987----km-y0itay0103----baengDEPositive polynomials, convex integral polytopes, and a random walk problemDavid E. HandelmanBerlin [etc.]Springerc1987X, 136 p.25 cm.Lecture notes in mathematics12822001Lecture notes in mathematicsAlgebraAnalisi funzionale512.55(21. ed.)Algebre topologiche e algebre connesse, gruppi topologici e gruppi connessi06F25Ordered structures. Ordered rings, algebras, modules13B99Commutative rings and algebras. Ring extensions and related topics19A99K-theory. Grothendieck groups and $K_0$19K14K-theory and operator algebras. $K_0$ as an ordered group, traces46L99Functional analysis. Selfadjoint operator algebras (C*-algebras, von Neumann (W*-)algebras, etc.)52AxxConvex and discrete geometry. General convexity60G50Stochastic processes. Sums of independent random variables; random walksHandelman,David E.58999ITUniversità della Basilicata - B.I.A.RICAunimarc000014178Positive polynomials, convex integral polytopes, and a random walk problem80159UNIBASMONSCISCIENZEEXT0020120030617BAS01100820050601BAS011755batch0120050718BAS01105220050718BAS01111120050718BAS01114120050718BAS011155BAS01BAS01BOOKBASA2Polo Tecnico-ScientificoGENCollezione generaleMAT58773S587732003061751Riservati