带阻尼项的二阶奇异耦合系统的正周期解

We establish the existence of positive periodic solutions of the second-order singular coupled systems{x′′+ p_1(t)x′+ q_1(t)x = f_1(t, y(t)) + c_1(t),y′′+ p_2(t)y′+ q_2(t)y = f_2(t, x(t)) + c_2(t),where pi, qi, ci ∈ C(R/T Z; R), i = 1, 2; f_1, f_2 ∈ C(R/T Z ×(0, ∞), R) and may be singular near the zero. The proof relies on Schauder's fixed point theorem and anti-maximum principle.Our main results generalize and improve those available in the literature.

Positive Periodic Solutions of Second-Order Singular Coupled Systems with Damping Terms

We establish the existence of positive periodic solutions of the second-order singular coupled systems $$\left\{ \aligned x''+p_1(t)x''+q_1(t)x=f_1(t,y(t))+c_1(t),\\ y''+p_2(t)y''+q_2(t)y=f_2(t,x(t))+c_2(t),\\ \endaligned\right.$$ where $p_i,\ q_i,\ c_i\in C(\mathbb{R}/T\mathbb{Z};\mathbb{R}),\ i=1,2$;\ \ $f_1,\ f_2\in C(\mathbb{R}/T\mathbb{Z}\times(0,\infty),\mathbb{R})$ and may be singular near the zero. The proof relies on Schauder''s fixed point theorem and anti-maximum principle. Our main results generalize and improve those available in the literature.