Saved in:
| Main Authors: | , |
|---|---|
| Format: | Preprint |
| Published: |
2024
|
| Subjects: | |
| Online Access: | https://arxiv.org/abs/2407.09258 |
| Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
Table of Contents:
- We consider properties of the diagonal of a continuum that are used later in the paper. We continue the study of $T$-closed subsets of a continuum $X$. We prove that for a continuum $X$, the statements: $Δ_X$ is a nonblock subcontinuum of $X^2$, $Δ_X$ is a shore subcontinuum of $X^2$ and $Δ_X$ is not a strong centre of $X^2$ are equivalent, this result answers in the negative Questions 35 and 36 and Question 38 ($i\in\{4,5\}$) of the paper ``Diagonals on the edge of the square of a continuum, by A. Illanes, V. Martínez-de-la-Vega, J. M. Martínez-Montejano and D. Michalik''. We also include an example, giving a negative answer to Question 1.2 of the paper ``Concerning when $F_1(X)$ is a continuum of colocal connectedness in hyperspaces and symmetric products, Colloquium Math., 160 (2020), 297-307'', by V. Martínez-de-la-Vega, J. M. Martínez-Montejano. We characterised the $T$-closed subcontinua of the square of the pseudo-arc. We prove that the $T$-closed sets of the product of two continua is compact if and only if such product is locally connected. We show that for a chainable continuum $X$, $Δ_X$ is a $T$-closed subcontinuum of $X^2$ if and only if $X$ is an arc. We prove that if $X$ is a continuum with the property of Kelley, then the following are equivalent: $Δ_X$ is a $T$-closed subcontinuum of $X^2$, $X^2\setminusΔ_X$ is strongly continuumwise connected, $Δ_X$ is a subcontinuum of colocal connectedness, and $X^2\setminusΔ_X$ is continuumwise connected. We give models for the families of $T$-closed sets and $T$-closed subcontinua of various families of continua.