@article { author = {Koushesh, M. R.}, title = {Connectifying a topological space by adding one point}, journal = {Journal of the Iranian Mathematical Society}, volume = {2}, number = {2}, pages = {81-110}, year = {2021}, publisher = {Iranian Mathematical Society}, issn = {2717-1612}, eissn = {2717-1612}, doi = {10.30504/jims.2022.321037.1050}, abstract = {P. Alexandroff proved that a locally compact $T_2$-space has a $T_2$ one-point compactification (obtained by adding a ``point at infinity'') if and only if it is non-compact. Also he asked for characterizations of spaces which have one-point connectifications. Here, we study one-point connectifications, and in an attempt to answer Alexandroff's question (and in analogy with Alexandroff's theorem) we prove that in the class of $T_i$-spaces ($i=3\frac{1}{2},4,5$) a locally connected space has a one-point connectification if and only if it has no compact component. We extend this theorem to the case $i=6$ by assuming the set-theoretic assumption $\mathbf{MA}+\neg\mathbf{CH}$, and to the case $i=2$ by slightly modifying its statement. We further extended the theorem by proving that a locally connected metrizable (resp. paracompact) space has a metrizable (resp. paracompact) one-point connectification if and only if it has no compact component. Contrary to the case of the one-point compactification, a one-point connectification, if exists, may not be unique. We instead consider the collection of all one-point connectifications of a locally connected locally compact space in the class of $T_i$-spaces ($i=3\frac{1}{2},4,5$). We prove that this collection, naturally partially ordered, is a compact conditionally complete lattice whose order structure determines the topology of all Stone--$\rm‎\check{C}$‎ech remainders of components of the space.}, keywords = {One-point connectification,one-point compactification,Stone-Cech compactification,Local connectedness,Component}, url = {https://jims.ims.ir/article_147063.html}, eprint = {https://jims.ims.ir/article_147063_b75fa640bd903974143bcd38d88c197f.pdf} }