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101 0 $aeng
102   $aDE
200 1 $aPositive polynomials, convex integral polytopes, and a random walk problem$fDavid E. Handelman
210   $aBerlin [etc.]$cSpringer$dc1987
215   $aX, 136 p.$d25 cm.
225 2 $aLecture notes in mathematics$v1282
410  0$12001$aLecture notes in mathematics
606   $aAlgebra
606   $aAnalisi funzionale
676   $a512.55$v(21. ed.)$9Algebre topologiche e algebre connesse, gruppi topologici e gruppi connessi
691   $a06F25$9Ordered structures. Ordered rings, algebras, modules
691   $a13B99$9Commutative rings and algebras. Ring extensions and related topics
691   $a19A99$9K-theory. Grothendieck groups and $K_0$
691   $a19K14$9K-theory and operator algebras. $K_0$ as an ordered group, traces
691   $a46L99$9Functional analysis. Selfadjoint operator algebras (C*-algebras, von Neumann (W*-)algebras, etc.)
691   $a52Axx$9Convex and discrete geometry. General convexity
691   $a60G50$9Stochastic processes. Sums of independent random variables; random walks
700  1$aHandelman,$bDavid E.$058999
801  0$aIT$bUniversità della Basilicata - B.I.A.$gRICA$2unimarc
912   $a000014178
996   $aPositive polynomials, convex integral polytopes, and a random walk problem$980159
997   $aUNIBAS
BAS   $aMONSCI
BAS   $aSCIENZE
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