Abstract
Let f and g be a self – maps of a rational exterior space . A natural number m is called a minimal coincidence period of maps f and g if f^m and g^m have a coincidence point which is not coincidence by any earlier iterates. This paper presents a complete description of the set of algebraic coincidence periods for self - maps of a rational exterior space which has rank 2 .
Article Type
Article
How to Cite this Article
AL-Ta'iy, Ban Jaffar
(2010)
"Algebraic Coincidence Periods Of Self – Maps Of A Rational Exterior Space Of Rank 2,"
Baghdad Science Journal: Vol. 7:
Iss.
2, Article 21.
DOI: https://doi.org/10.21123/bsj.2010.7.2.1034-1041
COinS
