Well-Posedness and Monotone Analysis for a Coupled Sublinear Lane--Emden--Fowler System on Bounded Domains
Abstract
We investigate a coupled system of elliptic equations of Lane--Emden--Fowler type on a bounded domain ⊂ Rn (n ≥ 1) with homogeneous Dirichlet boundary conditions. The system is characterized by sublinear power-law reaction terms 0 < α, β < 1 and includes a fidelity regularization component. Due to the non-gradient structure of the coupling, we employ the method of sub- and supersolutions and a monotone iteration scheme to establish the existence of positive solutions. We prove that the system admits a unique positive solution (u,v) ∈ C1,γ(% ) × C1,γ() for some γ ∈ (0,1), and we demonstrate the continuous dependence of the solution on the data. For the discrete case, we establish the monotone convergence of a fixed-point algorithm by verifying the conditions of Krasnosel'ski's theorem for monotone sub-homogeneous operators. This work provides a rigorous mathematical foundation for coupled reaction-diffusion models where traditional variational minimization is not directly applicable.
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