In this paper we investigate the existence and continuity of Chebyshev centers, best
n
n
-nets and best compact sets. Some of our positive results were obtained using the concept of quasi-uniform convexity. Furthermore, several examples of nonexistence are given, e.g., a sublattice
M
M
of
C
[
0
,
1
]
C[0,\,1]
, and a bounded subset
B
⊂
M
B \subset M
is constructed which has no Chebyshev center, no best
n
n
-net and not best compact set approximant.