(1) Qin and Noor in Remark 3.2 [47] claimed that Theorem 7.9 is obtained under the mild condition relaxed cocoercivity of the operators g and A. But, in view of the above facts, their results are obtained under the condition strongly monotonicity of the operators g and A not under the mild condition relaxed cocoercivity.
The remaining gene is FOXG1B (forkhead box G1B; also called BF1 (brain factor 1), forkhead homolog-like 1 (FKHL1), QIN (QIN oncogene)).
The largest genomic islands comprise the cryptic prophages CP4-6, DLP12, e14, Rac, Qin, CP4-44, CPS-53, Eut, CP4-57, and the phage-like element KpLE2 (reviewed in [ 30]).
Hu Jia (China) 2007 Luo Yutong (China) Qin Kai (China) G. Galperin (Russia) 2009 Qin Kai (China) He Chong (China) T. Daley (U.K).
(40) where (lambda=lambda eta,t)) is a function defined and measurable in (mathbb{R}^{2N+1}timesmathbb{R}^) and α, (beta>1), (qin(1,2)), are real parameters.
A triplet ((p,q,s)_{w}) is called admissible, if (pin 0,1]), (qin(q(w),infty ]), and (sinmathbb{N}) with (sgeqlfloor(q(w)/p-1 ln b/p-1 lnamb/ln_rfloor).
Stimulated by the works of Chen and Teng [1], Qin, Liu, and Chen [2], and Chen [3], in this paper, we focus our attention on the dynamic behavior of system (1.1); more precisely, we investigate the local and global stability properties of the system.
In this manuscript, we investigate some appropriate conditions which ensure the existence of at least one solution to a class of fractional order differential equations (FDEs) provided by textstylebegin{cases} -^{C}mathbf{D}^{q} z(t)=theta (t,z(t)); quad tin mathfrak{J}=[0,1], qin (1, 2], z(t)vert _{t=0}=phi (z),qquad z(1)=delta^{C}mathbf{D}^{p} z eta ),quad p, eta in (0,1).
By Theorem 3, (qin operatorname{CAP}(S,T)).
Remark 2.2 Theorem 2.1 mainly improves the corresponding results in Kim [20], Yang et al. [21], Hao [23], Qin et al. [31], Qin et al. [35].
Throughout the paper assume that (n,kinmathbb{Z}) and (0neq qin mathbb{R}).
