教師資料查詢 | 類別: 期刊論文 | 教師: 譚必信 Tam Bit-shun (瀏覽個人網頁)

標題:Cross-positive matrices revisted
學年83
學期2
出版(發表)日期1995/07/01
作品名稱Cross-positive matrices revisted
作品名稱(其他語言)
著者Gritzmann, Peter; Klee,Victor; 譚必信; Tam, Bit-shun
單位淡江大學數學學系
出版者Elsevier
著錄名稱、卷期、頁數Linear Algebra and Its Applications 223-224, pp.285-305
摘要For a closed, pointed n-dimensional convex cone K in Rn, let π(K) denote the set of all n × n real matrices A which as linear operators map K into itself. Let ∑(K) denote the set of all n × n matrices that are cross-positive on K, and L(K) = ∑(K) ∩ [− ∑(K)], the lineality space of ∑(K). Let Λ = RI, the set of all real multiples of the n × n identity matrix I. Then
π(K)+Δ⊆π(K)+L(K)⊆cl[π(K)+Δ]=Σ(K).
The final equality was proved in 1970 by Schneider and Vidyasagar, who showed also that π(K) + Λ = ∑(K) when K is polyhedral but not when K is a three-dimensional circular cone. They asked for a general characterization of those K for which the equality holds. It is shown here that if n ⩾ 3 and the cone K is strictly convex or smooth, then π(K) + Λ ≠ ∑(K); hence for n ⩾ 3 the equality fails for “almost all” K in the sense of Baire category. However, the equality does hold for some nonpolyhedral K, as was shown by a construction that appeared in the third author's 1977 dissertation and is explained here in more detail. In 1994 it was shown by Stern and Wolkowicz that the weaker equality π(K) + L(K) = ∑(K) holds for all ellipsoidal (as well as for all polyhedral) K, and they wondered whether this equality holds for all K. However, their equality certainly fails for all strictly convex or smooth K such that L(K) = Λ, and it is shown here that this also includes “almost all” K when n ⩾ 3.
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語言英文(美國)
ISSN0024-3795
期刊性質國外
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產學合作
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審稿制度
國別美國
公開徵稿
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