Equalities for the extent of infinite products and Σ-products

被引：1

作者：

Hirata, Yasushi ^{[1
]}

Usuba, Toshimichi ^{[2
]}

Yajima, Yukinobu ^{[1
]}

机构：

[1] Kanagawa Univ, Dept Math, Yokohama, Kanagawa 2218686, Japan

[2] Waseda Univ, Fac Sci & Engn, Tokyo 1698555, Japan

来源：

TOPOLOGY AND ITS APPLICATIONS | 2022年 / 307卷

关键词：

Extent; Product; Sigma-product; Strict p-space; Strong Sigma-space; Semi-stratifiable space; Strong beta-space; p-Space; SPACES; NORMALITY; SUBSETS; COVERS;

D O I：

10.1016/j.topol.2021.107946

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

For a space X, let e(X) = omega middot sup{|D| : D is a closed discrete subset in X}, which is called the extent of X. Here we deal with the following two questions: (1) For a product space X = HA is an element of Lambda XA, when is e(X) = |Lambda| middot sup{e(XA) : lambda is an element of Lambda}? (2) For a Sigma-product Sigma of spaces XA, lambda is an element of Lambda, when is e(Sigma) = sup{e(XA) : lambda is an element of Lambda}? We show that the equalities in these questions hold if each XA is a strict p-space or a strong Sigma-space and, in the case of the first question, if the cardinality of the index set Lambda is less than the first weakly inaccessible. For semi-stratifiable spaces, we show that a slightly weaker form of these equalities holds. (C) 2021 Elsevier B.V. All rights reserved.

引用

页数：12

共 50 条

[1] Weak infinite products of Blaschke products
Izuchi, K
PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY, 2001, 129 (12) : 3611 - 3618
[2] ON THE PARTIAL PRODUCTS OF INFINITE PRODUCTS OF ALEPHS
BAGEMIHL, F
AMERICAN JOURNAL OF MATHEMATICS, 1948, 70 (01) : 207 - 211
[3] Spectral inequalities and equalities involving products of matrices
Li, CK
Poon, YT
LINEAR ALGEBRA AND ITS APPLICATIONS, 2001, 323 (1-3) : 131 - 143
[4] Infinite products of infinite measures
Loeb, PA
Ross, DA
ILLINOIS JOURNAL OF MATHEMATICS, 2005, 49 (01) : 153 - 158
[5] Dual discreteness of Σ-products and irreducibility of infinite products
Hirata, Yasushi
Yajima, Yukinobu
TOPOLOGY AND ITS APPLICATIONS, 2024, 356
[6] INFINITE PRODUCTS AND T-PRODUCTS OF EXPONENTIALS
KARASEV, MV
MOSOLOVA, MV
THEORETICAL AND MATHEMATICAL PHYSICS, 1976, 28 (02) : 721 - 729
[7] THEOREM IN INFINITE PRODUCTS
PRICE, WLV
PROCEEDINGS OF THE CAMBRIDGE PHILOSOPHICAL SOCIETY, 1974, 76 : 191 - 193
[8] INFINITE PRODUCTS OF CONTRACTIONS
HILDEBRANDT, S
INDIANA UNIVERSITY MATHEMATICS JOURNAL, 1971, 20 (10) : 909 - +
[9] Three infinite products
Desbrow, Darrell
MATHEMATICAL GAZETTE, 2012, 96 (535): : 130 - +
[10] ON CERTAIN INFINITE PRODUCTS
TOYOIZUMI, M
MATHEMATIKA, 1983, 30 (59) : 4 - 10

← 1 2 3 4 5 →