Difference between revisions of "Pseudo-arc"
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− | The | + | The pseudo-arc is the only [[decomposable | hereditarily indecomposable]] [[chainable continuum]]. |
=Properties= | =Properties= | ||
− | + | [[Being a pseudo-arc is a Whitney property]]<br /> | |
− | + | [[Being a pseudo-arc is a sequential strong Whitney-reversible property]]<br /> | |
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=References= | =References= | ||
− | [https://staff.fnwi.uva.nl/j.vanmill/papers/papers2015/pseudoarc.pdf A Note on an Unusual Characterization of the Pseudo-arc by Jan Van Mill] | + | [https://staff.fnwi.uva.nl/j.vanmill/papers/papers2015/pseudoarc.pdf A Note on an Unusual Characterization of the Pseudo-arc by Jan Van Mill]<br /> |
− | [http://topology.auburn.edu/pm/pseudodraw.pdf Drawing the pseudo-arc by Wayne Lewis and Piotr Minc] | + | [http://topology.auburn.edu/pm/pseudodraw.pdf Drawing the pseudo-arc by Wayne Lewis and Piotr Minc]<br /> |
+ | [http://scholarworks.sjsu.edu/cgi/viewcontent.cgi?article=4143&context=etd_theses An introduction to some properties of the pseudo arc] |
Latest revision as of 03:39, 24 December 2018
The pseudo-arc is the only hereditarily indecomposable chainable continuum.
Properties
Being a pseudo-arc is a Whitney property
Being a pseudo-arc is a sequential strong Whitney-reversible property
References
A Note on an Unusual Characterization of the Pseudo-arc by Jan Van Mill
Drawing the pseudo-arc by Wayne Lewis and Piotr Minc
An introduction to some properties of the pseudo arc