Journal of Formalized Mathematics
Volume 8, 1996
University of Bialystok
Copyright (c) 1996
Association of Mizar Users
Reconstructions of Special Sequences
-
Yatsuka Nakamura
-
Shinshu University, Nagano
-
Roman Matuszewski
-
Warsaw University, Bialystok
Summary.
-
We discuss here some methods for reconstructing special sequences
which generate special polygonal arcs in ${\cal E}^{2}_{\rm T}$.
For such reconstructions
we introduce a ``mid" function which cuts out the middle part of
a sequence; the ``$\downharpoonleft$" function, which cuts down the left part
of a sequence at some point; the ``$\downharpoonright$" function for
cutting down the
right part at some point; and the ``$\downharpoonleft \downharpoonright$"
function for cutting down both
sides at two given points.\par
We also introduce some methods glueing two special sequences.
By such cutting and glueing methods, the speciality of sequences
(generatability of special polygonal arcs) is shown to be preserved.
The work has been done while the second author was visiting
Nagano in autumn 1996.
MML Identifier:
JORDAN3
The terminology and notation used in this paper have been
introduced in the following articles
[14]
[17]
[2]
[3]
[15]
[10]
[1]
[11]
[12]
[18]
[5]
[4]
[16]
[6]
[9]
[8]
[13]
[7]
-
Preliminaries
-
Middle Function for Finite Sequences
-
A Concept of Index for Finite Sequences in ${\cal E}^{2}_{\rm T}$
-
Left and Right Cutting Functions for Finite Sequences in ${\cal E}^{2}_{\rm T}$
-
Cutting Both Sides of a Finite Sequence and a Discussion of
Speciality of Sequences in ${\cal E}^{2}_{\rm T}$
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Received December 10, 1996
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