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handtagslutningar

Handtagslutningar, or handle closures, is a term used in differential topology to describe the closure of a single handle in a handle decomposition of a manifold. In this framework, a smooth n-manifold M is built by attaching handles h^k ≅ D^k × D^{n−k} along their boundary ∂D^k × D^{n−k} to a previously constructed submanifold. The handtagslutning associated with a given handle is the closure in M of the image of the attached k-handle, i.e., the subspace obtained after the attachment, which is homeomorphic to D^k × D^{n−k}.

Construction and properties: Begin with M_0 a manifold (possibly with boundary). Attach a k-handle h^k via an

Applications: Handtagslutningar are used to analyze how attaching a handle affects topological invariants such as homology

Terminology: The term is rooted in Swedish usage; in English literature the same concept is typically called

attaching
map
φ:
∂D^k
×
D^{n−k}
→
∂M_{i−1}
or
into
M_{i−1}.
The
resulting
manifold
M_i
contains
the
image
of
φ
on
its
boundary.
The
handtagslutning
for
h^k
is
the
closure
of
h^k’s
image
in
M_i,
and
is
homeomorphic
to
D^k
×
D^{n−k}.
Its
boundary
intersects
the
rest
of
the
boundary
along
∂D^k
×
∂D^{n−k}.
The
process
is
local,
and
the
global
topology
of
M
changes
according
to
the
handle’s
index
k.
and
the
fundamental
group.
They
are
central
in
Morse
theory,
surgery
theory,
and
Heegaard
splittings,
where
one
tracks
the
contribution
of
each
handle
to
the
evolving
manifold.
the
closure
of
a
handle
or
simply
a
handle
in
a
handle
decomposition.
Different
authors
may
use
slight
variations
in
terminology,
but
the
underlying
idea
is
the
same.