Journal of Formalized Mathematics
Volume 14, 2002
University of Bialystok
Copyright (c) 2002
Association of Mizar Users
Sequences of Metric Spaces and
an Abstract Intermediate Value Theorem
-
Yatsuka Nakamura
-
Shinshu University,
Nagano
-
Andrzej Trybulec
-
University of Bialystok
Summary.
-
Relations of convergence of real sequences and convergence of
metric spaces are investigated.
An abstract intermediate value theorem for two closed sets in the
range is presented.
At the end, it is proven that an arc connecting the west minimal point
and the east maximal point in a simple closed curve must be identical to
the upper arc or lower arc of the closed curve.
This work has been partially supported by the European Community
TYPES grant IST-1999-29001 and CALCULEMUS grant HPRN-CT-2000-00102.
The terminology and notation used in this paper have been
introduced in the following articles
[22]
[24]
[1]
[23]
[25]
[4]
[5]
[3]
[13]
[19]
[7]
[2]
[21]
[8]
[6]
[9]
[17]
[15]
[14]
[16]
[12]
[20]
[18]
[10]
[11]
Contents (PDF format)
Bibliography
- [1]
Grzegorz Bancerek.
The ordinal numbers.
Journal of Formalized Mathematics,
1, 1989.
- [2]
Leszek Borys.
Paracompact and metrizable spaces.
Journal of Formalized Mathematics,
3, 1991.
- [3]
Czeslaw Bylinski.
Binary operations.
Journal of Formalized Mathematics,
1, 1989.
- [4]
Czeslaw Bylinski.
Functions and their basic properties.
Journal of Formalized Mathematics,
1, 1989.
- [5]
Czeslaw Bylinski.
Functions from a set to a set.
Journal of Formalized Mathematics,
1, 1989.
- [6]
Czeslaw Bylinski and Piotr Rudnicki.
Bounding boxes for compact sets in $\calE^2$.
Journal of Formalized Mathematics,
9, 1997.
- [7]
Agata Darmochwal.
Compact spaces.
Journal of Formalized Mathematics,
1, 1989.
- [8]
Agata Darmochwal.
The Euclidean space.
Journal of Formalized Mathematics,
3, 1991.
- [9]
Agata Darmochwal and Yatsuka Nakamura.
Metric spaces as topological spaces --- fundamental concepts.
Journal of Formalized Mathematics,
3, 1991.
- [10]
Agata Darmochwal and Yatsuka Nakamura.
The topological space $\calE^2_\rmT$. Arcs, line segments and special polygonal arcs.
Journal of Formalized Mathematics,
3, 1991.
- [11]
Agata Darmochwal and Yatsuka Nakamura.
The topological space $\calE^2_\rmT$. Simple closed curves.
Journal of Formalized Mathematics,
3, 1991.
- [12]
Alicia de la Cruz.
Totally bounded metric spaces.
Journal of Formalized Mathematics,
3, 1991.
- [13]
Stanislawa Kanas, Adam Lecko, and Mariusz Startek.
Metric spaces.
Journal of Formalized Mathematics,
2, 1990.
- [14]
Jaroslaw Kotowicz.
Convergent real sequences. Upper and lower bound of sets of real numbers.
Journal of Formalized Mathematics,
1, 1989.
- [15]
Jaroslaw Kotowicz.
Convergent sequences and the limit of sequences.
Journal of Formalized Mathematics,
1, 1989.
- [16]
Jaroslaw Kotowicz.
Monotone real sequences. Subsequences.
Journal of Formalized Mathematics,
1, 1989.
- [17]
Jaroslaw Kotowicz.
Real sequences and basic operations on them.
Journal of Formalized Mathematics,
1, 1989.
- [18]
Yatsuka Nakamura and Andrzej Trybulec.
A decomposition of simple closed curves and the order of their points.
Journal of Formalized Mathematics,
9, 1997.
- [19]
Beata Padlewska and Agata Darmochwal.
Topological spaces and continuous functions.
Journal of Formalized Mathematics,
1, 1989.
- [20]
Jan Popiolek.
Real normed space.
Journal of Formalized Mathematics,
2, 1990.
- [21]
Konrad Raczkowski and Pawel Sadowski.
Topological properties of subsets in real numbers.
Journal of Formalized Mathematics,
2, 1990.
- [22]
Andrzej Trybulec.
Tarski Grothendieck set theory.
Journal of Formalized Mathematics,
Axiomatics, 1989.
- [23]
Andrzej Trybulec.
Subsets of real numbers.
Journal of Formalized Mathematics,
Addenda, 2003.
- [24]
Zinaida Trybulec.
Properties of subsets.
Journal of Formalized Mathematics,
1, 1989.
- [25]
Edmund Woronowicz.
Relations and their basic properties.
Journal of Formalized Mathematics,
1, 1989.
Received September 11, 2002
[
Download a postscript version,
MML identifier index,
Mizar home page]