Adam H. Berliner, M. Catral, D. Olesky, P. van den Driessche
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引用次数: 0
Abstract
Abstract We investigate refined inertias of positive patterns and patterns that have each off-diagonal entry positive and each diagonal entry zero, i.e., hollow positive patterns. For positive patterns, we prove that every refined inertia ( n + , n − , n z , 2 n p ) \left({n}_{+},{n}_{-},{n}_{z},2{n}_{p}) with n + ≥ 1 {n}_{+}\ge 1 can be realized. For hollow positive patterns, we prove that every refined inertia with n + ≥ 1 {n}_{+}\ge 1 and n − ≥ 2 {n}_{-}\ge 2 can be realized. To illustrate these results, we construct matrix realizations using circulant matrices and bordered circulants. For both patterns of order n n , we show that as n → ∞ n\to \infty , the fraction of possible refined inertias realized by circulants approaches 1/4 for n n odd and 3/4 for n n even.
摘要 我们研究正图案和对角线外各条目为正、对角线内各条目为零的图案(即空心正图案)的精炼惯性。对于正图案,我们证明了每一个 n + ≥ 1 {n}_{+}ge 1 的精炼惯性 ( n + , n - , n z , 2 n p ) \left({n}_{+},{n}_{-},{n}_{z},2{n}_{p})都可以实现。对于空心正向模式,我们证明可以实现 n + ≥ 1 {n}_{+}\ge 1 和 n - ≥ 2 {n}_{-}\ge 2 的每一个细化惯性。为了说明这些结果,我们使用圆周矩阵和有边圆周矩阵构建矩阵实现。对于这两种阶数为 n n 的模式,我们证明当 n → ∞ n\to \infty 时,对于 n n 奇数,圆周率实现的可能精炼惯性的分数接近 1/4,而对于 n n 偶数,则接近 3/4。
期刊介绍:
Special Matrices publishes original articles of wide significance and originality in all areas of research involving structured matrices present in various branches of pure and applied mathematics and their noteworthy applications in physics, engineering, and other sciences. Special Matrices provides a hub for all researchers working across structured matrices to present their discoveries, and to be a forum for the discussion of the important issues in this vibrant area of matrix theory. Special Matrices brings together in one place major contributions to structured matrices and their applications. All the manuscripts are considered by originality, scientific importance and interest to a general mathematical audience. The journal also provides secure archiving by De Gruyter and the independent archiving service Portico.
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