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Nullhomotopic

Nullhomotopic is a term in algebraic topology describing a property of a continuous map. A map f: X -> Y is nullhomotopic if it is homotopic to a constant map. In other words, there exists a continuous function H: X × I -> Y with H(x,0) = f(x) for all x in X and H(x,1) = y0 for some fixed point y0 in Y. If X and Y are based spaces and f is basepoint-preserving, the homotopy can be chosen so that the basepoint remains fixed throughout.

Several equivalent viewpoints appear in practice. If Y is contractible, every map X -> Y is nullhomotopic.

Examples help illustrate the concept. Constant maps are always nullhomotopic. Any map into a contractible target

If
X
is
contractible,
every
map
f:
X
->
Y
is
nullhomotopic
as
well,
since
f
factors
through
the
contraction
of
X
to
a
point.
Conversely,
f
is
nullhomotopic
precisely
when
it
represents
the
trivial
element
in
the
homotopy
class
[X,
Y].
For
X
=
S^n,
a
map
f:
S^n
->
Y
is
nullhomotopic
exactly
when
the
corresponding
element
of
the
n-th
homotopy
group
π_n(Y)
is
trivial.
space
is
nullhomotopic.
A
map
f:
S^1
->
S^1
has
a
trivial
degree
if
and
only
if
it
is
nullhomotopic.
In
the
context
of
basepointed
spaces,
nullhomotopic
maps
determine
the
zero
element
in
the
set
of
based
homotopy
classes
[X,
Y].