Boundaries of symmetric complexes (Ex)
From Manifold Atlas
(Difference between revisions)
(Created page with "<wikitex>; # Show that the boundary of a well connected $1$-dimensional symmetric complex is isomorphic to a $0$-dimensional symmetric complex associated with a symmetric hype...") |
m |
||
Line 3: | Line 3: | ||
# Show that the boundary of a well connected $2$-dimensional symmetric complex is isomorphic to a $1$-dimensional symmetric complex associated with a symmetric hyperbolic formation which is a boundary (in the sense of formations). | # Show that the boundary of a well connected $2$-dimensional symmetric complex is isomorphic to a $1$-dimensional symmetric complex associated with a symmetric hyperbolic formation which is a boundary (in the sense of formations). | ||
</wikitex> | </wikitex> | ||
− | == References == | + | == References== |
{{#RefList:}} | {{#RefList:}} | ||
[[Category:Exercises]] | [[Category:Exercises]] | ||
[[Category:Exercises without solution]] | [[Category:Exercises without solution]] |
Latest revision as of 12:45, 30 July 2013
- Show that the boundary of a well connected -dimensional symmetric complex is isomorphic to a -dimensional symmetric complex associated with a symmetric hyperbolic form.
- Show that the boundary of a well connected -dimensional symmetric complex is isomorphic to a -dimensional symmetric complex associated with a symmetric hyperbolic formation which is a boundary (in the sense of formations).