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Miklós Schweitzer
1998 Miklós Schweitzer
9
9
Part of
1998 Miklós Schweitzer
Problems
(1)
simple arc in domain
Source: Miklos Schweitzer 1998 q9
9/14/2021
Let G be a domain (connected open set) in the
R
2
R^2
R
2
plane whose boundary is locally connected. Prove that for every point q of the boundary of G there exists a simple arc
v
q
v_q
v
q
in which
q
∈
v
q
q\in v_q
q
∈
v
q
and
v
q
∖
{
q
}
⊂
G
v_q\setminus\{q\}\subset G
v
q
∖
{
q
}
⊂
G
.other questions: (i) Show that local connectedness cannot be replaced by connectedness. (ii) Show that if we replace the
R
2
R^2
R
2
plane with
R
3
R^3
R
3
space, the statement does not hold.
real analysis