Creator |
|
Language |
|
Publisher |
|
|
Date |
|
Source Title |
|
Vol |
|
Issue |
|
First Page |
|
Last Page |
|
Publication Type |
|
Access Rights |
|
Crossref DOI |
|
Related DOI |
|
|
|
Related URI |
|
|
|
Relation |
|
|
|
Abstract |
We introduce a certain cell space $ phi^2 Omega_{m,n}(C(X) ; a, b, c, d ; 1, 0) $, with the invariant boundary vectors $ a $, $ b $, $ c $, $ d $ and the invariant corners $ alpha $, $ gamma $ with tw...o inhibition $ phi $ states in the opposite corners. Starting in Section 2 with the particular case in which $ a = (1, 1, cdots , 1) $, ($ m $-dimension) $ b= (1, 1, cdots , 1) $ ($ n $-dimensional), $ c = \bar{a} $, $ d = \bar{b} $, $ alpha = 1 $, $ gammma = 0 $, in Section 3 we proceed to the so-called conjugate boundary configurations in which $ c = \bar{a} $, $ d = \bar{b} $, and finally in Section 4 we reach to the most general boundary configurations. What we establish in all of these Sections is to show that transitory aspects and final state aspects are common to those given in Section 2, where the notions of LLI sets and RUI sets play an important role.show more
|