Revision as of 23:43, 8 February 2006

Topology

Open sets.: Sets which do not intersect their boundary, that is if
<m>A \\subset \\R ^n</m> then A is open if <m> A = int(A)</m>
Closed sets.: A set <m> A </m> is said to be closed if it's complement <m>R^{n} - A</m> is open.

Interior points of a set: <m>P \\in int(A) </m> if there exists a Ball <m>B</m> centered at <m>P</m> with radius >0 s.t. <m>B \\subset A</m>

- Exterior point of a set. Exterior of a set.
- Boundary point of a set. Boundary of a set.
- Compact sets.
- Acumulation point of a set.

- The norm-infinity on Rⁿ.
- Open balls in norm-infinity.
- Open sets in the norm-infinity topology.
Fact: The "ball" topology on Rⁿ is the same as the "box" topology on Rⁿ
Induced topology on a subset of Rⁿ

@@ Line 4: / Line 4: @@
 ;Closed sets. : A set <m> A </m> is said to be closed if it's complement <m>R^{n} - A</m> is open.
 **Neighborhood of a point.
-;Interior points of a set: <m>P \\in int(A) </m> if there exists <m> \\delta >0</m> s.t. the Ball <m>B</m> of radius <m>\\delta</m> centered at <m>P</m> is a subset of <m>A</m>
+;Interior points of a set: <m>P \\in int(A) </m> if there exists a Ball <m>B</m> centered at <m>P</m> with radius >0 s.t. <m>B \\subset A</m>
 **Exterior point of a set. Exterior of a set.
 **Boundary point of a set. Boundary of a set.