... Necessity to Formulate BusinessStrategiesforPeriod 2013~ 2018 57 CHAPTER FORMULATINGBUSINESSSTRATEGIESANDPLANNINGIMPLEMENTATIONSOLUTIONSFORAGRIBANKNINHBINHPERIODFROM2013TO2018 ... of AgribankNinhBinh Chapter 3: FormulatingBusiness Strategy andPlanningImplementationSolutionsforAgribankNinhBinhforperiodfrom2013to2018 14 CHAPTER THEORETICAL BACKGROUND ON FORMULATING ... Capstone Project is to research and formulate businessstrategiesfor the periodfrom2013to2018and propose solutionsto implement these strategies in order to demonstrate AgribankNinhBinh s...
... framework forbusiness strategy formulation Chapter 2: Analysis of the foundation forformulatingbusinessstrategiesfor retail activities of Joint Stock Commercial Bank for Investment and Development ... effective strategiesfor retail operations From this necessity, our team has selected the theme: Formulatingstrategiesfor retail banking business of Joint Stock Commercial Bank for Investment and ... environment is to identify opportunities and challenges for enterprises, to find ways to deploy and capture opportunities from the environment, andto avoid the necessary challenges for the enterprises...
... different departments to spend more time analyzing data andformulatingbusiness strategy They can adjust plans, budgets and forecasts to respond quickly and effectively to changing business conditions ... applications/ tools to organize information, enable access to it and analyze it to improve decisions and manage performance replaced the terms applications, best practices, tools and infrastructure ... closely with business users to understand and model business decisions And a new crop of tools and capabilities will be required For example, one capability likely to increase in popularity as...
... (Ω) and q(x) < p∗ (x) for any x ∈ Ω, then the imbedding from W 1,p(x) (Ω) to Lq(x) (Ω) is compact and continuous; 3) if q ∈ C+ (Ω) and q(x) < p∗ (x) for any x ∈ Ω, then the trace imbedding from ... ), (H2 ) and the following conditions hold true: (b+ ) b(t) ≥ for t ≥ (f+ ) f (x, t) ≥ for x ∈ Ω and t ≥ (g+ ) g(x, t) ≥ for x ∈ ∂Ω and t ≥ (f2 )+ There exist an open subset Ω0 of Ω and r1 > ... (x) for x ∈ Ω and lim inf t→0 |F (x,t)| |t|r1 (x) < +∞ uniformly for x ∈ Ω ¯ (g5 ) There exists r2 ∈ C (Ω) such that < r2 (x) < p∗ (x) for x ∈ ∂Ω and lim inf t→0 |G(x,t)| |t|r2 (x) < +∞ uniformly...
... R and a.e x in Ω, where a(x) ∈ Lq (Ω), b ∈ R and < p < N +4 N −4 if N > and < p < ∞ if N ≤ and q + p = 1; (H4) f (x, t) = o(|t|) as t → uniformly for x ∈ Ω ; (H5) There exists a constant Θ > and ... satisfies I(un ) → C, and I (un ), un → as n → ∞ (6) Since f (x, t) is sub-critical by (H3), from the compactness of Sobolev embedding and, following the standard processes we know that to show that I ... u)dx Ω + C4 using (4) and (H5) Hence, I(tϕ1 ) ≤ l2 t2 ϕ1 2 − tΘ ϕ1 Θ Θ + C4 → −∞ as t → +∞ and part is proved Proof of Theorem 2.1 From Lemmas 2.2 and 2.3, it is clear to see that I(u) satisfies...
... many authors For example, fixed point theory 1, 3, 5–7 , the method of upper and lower solutions , and critical point theory 9, 10 are widely used to deal with the existence of solutionsfor the boundary ... nontrivial solutionsto BVP 1.5 Theorem 3.1 Suppose that matrix M is negative semidefinite andfor n zf n, z > 0, 1, 2, , k, for z / 3.1 Then BVP 1.5 has no nontrivial solutions Proof Assume, for ... of M Proof From the proof of Theorem 4.2, it is easy to know that J is bounded from above and satisfies the P-S condition It is clear that J is even and J 0, and we should find a set K and an odd...
... −t, β t t and γ t t It is easy to check that α t −t, and β t t are lower and upper solutions of BVP 3.66 , 3.67 respectively, and all the assumptions in Theorem 3.2 are satisfied Therefore by Theorem ... solution for BVP 1.1 , 1.2 satisfying 3.3 follows from Theorem 3.1 Now, we prove the uniqueness of solution for BVP 1.1 , 1.2 To this, we let x1 t x2 t − x1 t It and x2 t are any two solutions ... functions, and μi ∈ R, i 0, 1, , n − are arbitrary given constants The tools we mainly used are the method of upper and lower solutionsand Leray-Schauder degree theory Note that for the cases...
... 0, ∞ is continuous and nondecreasing; h : 0, ∞ → 0, ∞ is continuous and nonincreasing, and h may be singular at y Next, we consider the existence and uniqueness of solutionsfor the following ... of 1.1 Let x t from y i y C n 0, , by n−2 n−2 y t, 3.3 0, ≤ i ≤ n−2, and Taylor Formula, we define operator T : C 0, → t y t Tx t y t t − s n−3 x s ds, n−3 ! Tx t x t, for n for ≤ n, 3.4 Then ... Qe , from 3.14 , 3.15 , and 3.20 , we have for t ∈ 0, , ≤ g M ≤ Mα g , g Tx t 3.22 andfrom 3.13 , we have h Ty t ≤h tn−1 n − 2t M n! n−1 t ≤ Mα n − 2t n! ≤ tn−1 n − 2t n! −α h M 3.23 −α for t...
... 0, ∞ is continuous and nondecreasing; h : 0, ∞ → 0, ∞ is continuous and nonincreasing, and h may be singular at y Next, we consider the existence and uniqueness of solutionsfor the following ... of 1.1 Let x t from y i y C n 0, , by n−2 n−2 y t, 3.3 0, ≤ i ≤ n−2, and Taylor Formula, we define operator T : C 0, → t y t Tx t y t t − s n−3 x s ds, n−3 ! Tx t x t, for n for ≤ n, 3.4 Then ... Qe , from 3.14 , 3.15 , and 3.20 , we have for t ∈ 0, , ≤ g M ≤ Mα g , g Tx t 3.22 andfrom 3.13 , we have h Ty t ≤h tn−1 n − 2t M n! n−1 t ≤ Mα n − 2t n! ≤ tn−1 n − 2t n! −α h M 3.23 −α for t...
... ∈ [0,1]} and Qτ = {x ∈ P |x(t) ≥ θτ x t for t ∈ [0,1]} It is easy to see that P and Qτ are cones in C[0,1] For τ ≥ and each n ∈ N, define operators Lτ and Fn : C[0,1] → C[0,1] by ⎧ p0,τ (1) ⎪ ... Then w(t) ≥ for t ∈ [α,1] Lemma 2.10 Assume that (H1 ) holds and τ ≥ Then Lτ : P → Qτ is a completely continuous and increasing operator Proof From Lemma 2.6, we have for any x ∈ P and t ∈ [0,1], ... follows from Lemma 2.7 that to show that (1.1λ ) has at least two positive solutions, we only need to show that the operator Tλ has at least two fixed points Let z0 (t) = for t ∈ [0,1] and Ωλ =...
... μ(t) = σ(t) − t 18 Forced delay dynamic equation Throughout this work, the assumption is made that T is unbounded above and has the topology that it inherits from the standard topology on the real ... 80850, 11 pages [2] D R Anderson and J Hoffacker, Positive periodic time-scale solutionsfor functional dynamic equations, The Australian Journal of Mathematical Analysis and Applications (2006), ... p(s)Δs τ(t) r(s) Δs, where we used (2.4) and Theorem 5.4(4) to arrive at the last line Continuing in this manner, from (H1) and the fact that f † (x) < x for positive x, we see that xΔ (t) ≤ p(t)...
... nonlinearity: f (u) = if u ≤ σ, f (u) = −1 if u > σ, for some constant σ ∈ R The aim of this paper is to investigate the convergence and periodicity of solutionsfor system (1.1) as f is of the digital nature ... phase-locked periodic orbit in a delayed neural network, Physica D 134 (1999), no 2, 185–199 [3] Y Chen, J Wu, and T Krisztin, Connecting orbits from synchronous periodic solutions in phaselocked periodic ... (2003), no 1, 158–175 [10] Z Yuan, L Huang, and Y Chen, Convergence and periodicity of solutionsfor a discrete-time network model of two neurons, Mathematical and Computer Modelling 35 (2002), no 9-10,...