10 Metric spaces[0MR]

10.1 Definitions

[2CC]↺↻

10.2 Topology in metric spaces

[2C2]↺↻

10.3 Quotients

[2C3]↺↻

10.4 Distance function

[2C4]↺↻

10.5 Connected set

[2C5]↺↻

10.6 Topology in the real line

[2C6]↺↻

10.7 Topology in Euclidean spaces

[2C7]↺↻

10.8 Fixed points

[2C8]↺↻

10.9 Isometries

[2C9]↺↻

10.10 Compactness

[2CB]↺↻

10.11 Baire’s Theorem and categories

The following is Baire’s category theorem; there are several equivalent statements.

E4

[0VX]↺↻

E4

[0VZ]↺↻

E4

[0W1]↺↻

E4

[0W3]↺↻

The Cantor set is a perfect set, see [09S]↺↻.

10.12 Infinite product of metric spaces

E4

[0W9]↺↻

E4

[0WB]↺↻

E4

[0WC]↺↻

E4

[0WD]↺↻

E4

[0WG]↺↻

E4

[0WJ]↺↻

10.13 Ultrametric

[ [0WK]↺↻]

E5

[0WN]↺↻

E5

[0WP]↺↻

E5

[0WR]↺↻

E5

[0WT]↺↻

E5

[0WW]↺↻

E5

[0WY]↺↻

[ [0WZ]↺↻]

Ultrametric space of sequences

Let’s build this example of ultrametric on the space of sequences.

E7

[0X2]↺↻

E7

[0X4]↺↻

E7

[0X6]↺↻

E7

[0X8]↺↻

E7

[0XC]↺↻

See also [0ZP]↺↻.

10.14 P-adic ultrametric

[2CG]↺↻

10.15 Circle

[2CF]↺↻