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Dependent on the related statement above, we are to be concerned with the solutions of the Dirichlet problem for the stationary Schrödinger operator L a on C n and with their growth properties.
Our next aim is concerned with the solutions of the Dirichlet problem for the Schrödinger operator (operatorname{Sch}_{a}) on (C_{n}(Omega)) and the growth property of them.
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Chalmers was more concerned with the solution of human problems than with theological doctrines, and he sought to apply Christian ethics to economic issues.
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The first one is concerned with the solution of algebraic systems which can have more or less unknown than equations and which can be compatible or not.
In the completely perturbed scenario (24) where z≠0 and Z≠0, CS theory is concerned with the solution of the BP problem mathbf{h}^{star}=argmin_{{hat{mathbf{h}}}} |{hat{mathbf{h}}}|_{1} qquad text{subject to} quad |{tilde{mathbf{A}}}{hat{mathbf{h}}}-{tilde{mathbf{y}}}| le varepsilon^_{mathbf{A},K,mathbf{y}}.
This paper is concerned with the entire solutions of the spruce budworm model, i.e., solutions defined for all ((x,t in mathbb{R}^{2}).
In this paper, we are concerned with the weak solutions of the inequality SSE_{a}u(P leq0, (1.1) where (P= r,Theta)in C_{n}(Omega)).
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Since we are concerned with the positive solutions of (2.2), from now on, we assume that (f(s)=0) for all (sle0).
In [4 12], the authors studied the existence of antiperiodic solutions for first-order, second-order, or high-order differential equations without impulses, and in [3, 13 16] the authors were concerned with the antiperiodic solutions of first-order impulsive differential equations.
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