Asymptotic behavior of solutions to the Burgers' equation with a nonlocal term

In this paper, we discuss the long-time behavior of positive solutions of Burgers' equation \(u\_{t}=u\_{x x}+\varepsilon u u\_{x}, 00, t>0\) with the nonlocal boundary condition: \(u(0, t)=0, \quad u\_{x}(1, t)+\frac{1}{2} \varepsilon u^{2}(1, t)=a u^{p}(1, t)\left(\int\_{0}^{1} u(x, t) d x\right)^

This paper deals with the equation Here, u is a complex-valued function of (t, x) # R\_R n , n 2, and \* is a real number. If u 0 is small in L 2, s with s>(nÂ2)+2, then the solution u(t) behaves asymptotically as uniformly in R n as t Ä . Here , is a suitable function called the modified scatteri

In this paper, we investigate the asymptotic behavior of solutions to a differential equation with state-dependent delay. It is shown that every bounded solution of such an equation tends to a constant as t → ∞. Our results improve and extend some corresponding ones already known.