New Insights on Keller–Osserman Conditions for Semilinear Systems

In this article, we consider a semilinear elliptic system involving gradient terms of the form Δ y x + λ 1 ∇ y x = p x f y x , z x i f x ∈ Ω , Δ z x + λ 2 ∇ z x = q x g y x i f x ∈ Ω , where λ 1 , λ 2 ∈ 0 , ∞ , Ω is either a ball of radius R > 0 or the entire space R N . Based on certain standard assumptions regarding the potential functions p and q , we introduce new conditions on the nonlinearities f and g to investigate the existence of entire large solutions for the given system. The method employed is successive approximation. Additionally, for specific cases of p , q , f and g , we employ Python code to plot the graph of both the numerical solution and the exact solution.