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annellations

Annellations is a term found mainly in mathematical literature to describe either the formation or attachment of annuli—ring-shaped regions—in a space. An annulus is the region between two concentric circles (in the plane) or, more generally, a surface homeomorphic to S^1 × [0,1]. The word comes from annulus, Latin for ring, with the agent noun suffix -ation.

In one usage, annellation refers to creating an annulus inside a space by removing a disk; for

Another usage describes attaching an annulus along its boundary to a space. This operation, common in low-dimensional

Because the term is uncommon and its precise meaning varies by author, definitions should be checked within

Related notions include the annulus itself, boundary components, and various forms of handle or tube attachments

example,
removing
an
open
disk
from
a
surface
yields
a
doubly
connected
region
homeomorphic
to
an
annulus.
topology,
can
change
the
boundary
structure
or
connect
boundary
components
by
adding
a
cylindrical
tube.
Depending
on
the
context,
annellations
may
be
described
as
annular
attachments
or
as
annulus-based
cobordisms.
its
specific
context.
In
practice,
annellations
are
discussed
mainly
in
relation
to
surface
topology,
geometric
topology,
and
complex
analysis
when
considering
doubly
connected
regions
or
modular
annuli
in
Riemann
surfaces.
used
in
modifying
surfaces.