Continuous bijection (not necessarily homeo)
- From: Harun Al-Rashid <abdul@xxxxxxxxxxx>
- Date: Wed, 04 Jun 2008 07:51:30 EDT
Hi! My problem is:
Show that there is no continuous bijection from {z in C | |z| < 2}
to {z in C | |z| < 2 and z is not in [-1,1]}.
(here the real interval [-1,1] is considered as a subset of C)
TIA
.
- Follow-Ups:
- Re: Continuous bijection (not necessarily homeo)
- From: Mariano Suárez-Alvarez
- Re: Continuous bijection (not necessarily homeo)
- From: Adrian Duma
- Re: Continuous bijection (not necessarily homeo)
- From: Dominijanni Simone
- Re: Continuous bijection (not necessarily homeo)
- Prev by Date: Re: Open sets in R^n
- Next by Date: Re: Partitioning a square to a fixed sized rectangles.
- Previous by thread: Science Earthquake Prediction
- Next by thread: Re: Continuous bijection (not necessarily homeo)
- Index(es):
