«EQUATIONALLY» İLE İLİŞKİLİ İNGILIZCE KİTAPLAR
equationally sözcüğünün kullanımını aşağıdaki kaynakça seçkisinde keşfedin.
equationally ile ilişkili kitaplar ve İngilizce edebiyattaki kullanımı ile ilgili bağlam sağlaması için küçük metinler.
1
Decision Procedures for
Equationally Based Reasoning
Each of these theoretical topics have lead to the development of new libraries and tools.
2
Algorithmic Problems in Groups and Semigroups
Then a G-group H is called G-equationally Noetherian if for every n > 0 and every
subset SofG[x\,...,xn] there exists a finite subset SQ of S such that VH(S) = VH(S0).
In the event that G = H we simply say that G is equationally Noetherian, ...
Jean-Camille Birget, 2000
2 is called equationally complete if whenever SsS', where 2' is strictly consistent,
thenTi=H'. Let us note that an equationally complete set of identities be always
closed. Definition 3. An equational class K of algebras is equationally complete ...
4
Summer School in Group Theory in Banff, 1996
I have chosen to single out only a special case of one concept here, that of an
equationally Noetherian group, introduced in [9] (see also [10]), where details of
this and other notions are defined in complete detail and generality. To this end,
let ...
5
Lattice Functions and Equations
In view of Remark 3.2.5, a bounded lattice L is {2-}equationally {mono}compact in
the class of lattices if and only if it has this property in the class of bounded
lattices. □ Theorem 2.2. The following properties are equivalent for a lattice L: (i)
L is ...
6
Group Theory, Statistics, and Cryptography
V(G, S) = {g e Gn : s(g) = 1 for all s(x) € 5} is the solution set in G to the system 5=
1. (B) The group G is equationally Noetherian provided for every integer n > 0
and every system S = 1 of equations in n variables Xn = {xi, ...,£n} there is a finite
...
7
Geometric Group Theory: Geneva and Barcelona Conferences
Then a group G is equationally noetherian if and only if for each n ≥ 1 the Zariski
topology on Gn is noetherian [2, Theorem D1]. Guba has shown that free groups
are equationally noetherian using the fact that a free group is linear [8].
Goulnara N. Arzhantseva, Laurent Bartholdi, Jose Burillo, 2007
8
Canadian Mathematical Bulletin
PROPOSITION 1. A G-set A is equationally compact iffZA = QA, i.e. any subgroup
HofGfor which every finitely generated subgroup is contained in some stability
group of A is itself contained in a stability group of A. Proof. If A is equationally ...
9
Groups St Andrews 2001 in Oxford:
Then H is G-equationally noetherian if for every integer n > 0 and every subset
S C G[xi, ...,x„] there is a finite subset SO C S such that Vn(S) = VH(SQ). G itself is
equationally noetherian provided it is G-equationally noetherian. It was shown in
...
C. M. Campbell, E. F. Robertson, G. C. Smith, 2003
10
FGCS '92: Fifth Generation Computer Systems 1992
Note that for every flat gual clause :- C. REDU( -~C) is equationally equivalent to '
--C. Theorem 3.2 [Cox et al. 1991] Lei :- C be a goal clause and A a set of Horn
clause* which includes the function substitutivity axioms. Then A equationally ...
«EQUATIONALLY» TERİMİNİ İÇEREN HABERLER
Ulusal ve uluslararası basında konuşulanları ve
equationally teriminin aşağıdaki haberlerde hangi bağlamda kullanıldığını keşfedin.
Master Regulator Of Chromosomal Segregation Identified
In mitosis, the replicated chromosomes (sister chromatids) are segregated equationally, with one sister chromatid moving to each spindle pole. «Asian Scientist Magazine, Mar 15»