Name
compact — Is a normal surface/hypersurface compact?
Description
A compact element stores whether or not a normal surface
or hypersurface is compact.
Here compact has the following meaning:
a normal surface in a 3-manifold triangulation is compact if it
contains finitely many normal discs,
and a normal hypersurface in a 4-manifold triangulation is compact if it
contains finitely many normal pieces.
Parents
The following elements contain compact (in the
context of the compactness of a normal surface/hypersurface):
hypersurface, surface.
Children
Element compact (in the context of the
compactness of a normal surface/hypersurface) has no children.
Attributes
value
Either T or F, according to
whether the parent (hyper)surface is or is not compact.
