báo cáo hóa học:" Assessment of the primary rotational stability of uncemented hip stems using an analytical model: Comparison with finite element analyses" potx
... vitro
measurements of the primary stability of implanted
stems.
Indeed, the stability order of the stems might be different
when more realistic models of the bone-implant complex
or truly implanted stems ... be
addressed in the continuation of the research.
Nevertheless, the analytical model seems to be useful as a
comparative tool for the primary st...
... genes in plants infected with TEV
compared to uninfected plants, data were analyzed with
the SAM package [14], using a 5% FDR with no fold-
change cut-off. Gene lists were further analyzed with
FatiGO ... considered for
further analysis (13,722 spots). Median, mean and SEM
values were calculated from each treatment (control and
TEV-infected plants), and all data were normalized to...
... varied stepwise within the band-
width of the system under test. The step width was cho-
sen between 40 and 250Hz, depending on the
bandwidth of the noise reduc tion subbands in the given
frequency ... eliminate
theinfluencesfromothersubbandsbyusingaband-
stop filter whose band limits are outside of subband
number b (here, we chose each of them in the middle of
one sub...
... contradiction. Therefore, the conclusion of Theorem 3.2 holds. This completes the
proof of Theorem 3.2.
In order to obtain the permanence of the component yn of system 1.3, we next
consider the following ... the question of whether an ecosystem can withstand
those unpredictable forces which persist for a finite period of time or not. In the language of
control...
... theorem can be set, and the boundary value condition 2.13 is naturally satisfied.
On the other hand, if the weak solution u of 2.10–2.13 belongs to X
1
∩ W
m,p
Ω for some
p>1, then by the ... Furthermore, if, we can derive that u
Y
<C, C is a constant, then the
solution u
0
of Gu 0 belongs to Y .
In the following, we give some existence theorems of W
m,p
-so...
... R
n
n ≥ 3, and
{A
1
,A
2
, ,A
n1
} be the set of vertices. Let P be an arbitrary point in the interior of A. If B
i
is the
intersection point of the extension line of A
i
P and the n − 1-dimensional ... applications,” Bulletin of the Australian Mathematical Society, vol. 56, no. 3, pp. 409–420, 1997.
5 P. S. Bullen, Handbook of Means and Their Inequalities, vo...
... Journal of Mathematical Analysis and Applications, vol. 184, no. 3, pp. 431–436, 1994.
6 C G. Park, “On the stability of the linear mapping in Banach modules,” Journal of Mathematical
Analysis and ... stability of t he linear transformation in Banach spaces,” Journal of the Mathematical
Society of Japan, vol. 2, pp. 64–66, 1950.
4 Th. M. Rassias, “On the s tability...
... holds.
The rest of the proof is similar to the proof of Theorem 3.1.
Corollary 3.6. Let θ ≥ 0,andletp be a real number with p>1.LetX be a normed vector space with
norm ·,andletX, μ, T
∧
be an ... the stability of the linear functional equation,” Proceedings of the National Academy of
Sciences of the United States of America, vol. 27, pp. 222–224, 19...
... homogeneous in a
i
and a
k
,andalsoinQ
i
and R
k
, without loss of
generality, assume that a
i
1andQ
i
1. Using the notations a
k
x
2
and R
k
p, where
x ≥ 1andp>0, the inequality is ... 4R
k
a
i
.
5.7
Journal of Inequalities and Applications 11
Since this inequality is homogeneous in a
i
and a
k
,andalsoinQ
i
and R
k
, we may set a
i
1
and Q
i
1. Using the not...