In this paper we give a number of explicit constructions for II
1
_1
factors and II
1
_1
equivalence relations that have prescribed fundamental group and outer automorphism group. We construct factors and relations that have uncountable fundamental group different from
R
+
∗
\mathbb {R}_{+}^{\ast }
. In fact, given any II
1
_1
equivalence relation, we construct a II
1
_1
factor with the same fundamental group. Given any locally compact unimodular second countable group
G
G
, our construction gives a II
1
_1
equivalence relation
R
\mathcal {R}
whose outer automorphism group is
G
G
. The same construction does not give a II
1
_1
factor with
G
G
as outer automorphism group, but when
G
G
is a compact group or if
G
=
S
L
n
±
R
=
{
g
∈
G
L
n
R
∣
det
(
g
)
=
±
1
}
G=\mathrm {SL}^{\pm }_n\mathbb {R}=\{g\in \mathrm {GL}_n\mathbb {R}\mid \det (g)=\pm 1\}
, then we still find a type II
1
_1
factor whose outer automorphism group is
G
G
.