Add to ORKGIn this paper we study the shape of least-energy solutions to a singularly perturbed quasilinear problem with homogeneous Neumann boundary condition. We use an intrinsic variation method to show that at limit, the global maximum point of least-energy solutions goes to a point on the boundary faster than the linear rate and this point on the boundary approaches to a point where the mean curvature of the boundary achieves its maximum. We also give a complete proof of exponential decay of least-energy solutions
(Communicated by Changfeng Gui) Abstract. In this paper we want to characterize and visualize the sh...
AbstractWe establish an existence result for strongly indefinite semilinear elliptic systems with Ne...
In this paper we carry on the study of asymptotic behavior of some solutions to a singularly pertur...
In this paper we study the shape of least-energy solutions to a singularly perturbed quasilinear pro...
In this paper we study the shape of least-energy solutions to a singularly perturbed quasilinear pro...
In this paper we study the shape of least-energy solutions to the quasilinear problem εmΔmu−um−1+f(u...
In this paper we study the shape of least-energy solutions to the quasilinear problem εmΔmu−um−1+f(u...
In this paper we study the shape of least-energy solutions to the quasilinear problem εmΔmu−um−1+f(u...
We continue our work (Y. Li, C. Zhao, Locating the peaks of least-energy solutions to a quasilinear ...
Abstract: We study the shape of least-energy solutions to the quasilinear elliptic equation ∊mΔmu − ...
Abstract: We study the shape of least-energy solutions to the quasilinear elliptic equation ∊mΔmu − ...
AbstractWe establish an existence result for strongly indefinite semilinear elliptic systems with Ne...
AbstractWe consider a system of the form −ε2Δu+u=g(v),−ε2Δv+v=f(u) in Ω with Neumann boundary condit...
In this paper we prove the existence of a least energy nodal (i.e. sign-changing) solution for a lar...
AbstractLet Ω be a smooth bounded domain in RN, with N⩾5, a>0, α⩾0 and 2∗=2NN−2. We show that the ex...
(Communicated by Changfeng Gui) Abstract. In this paper we want to characterize and visualize the sh...
AbstractWe establish an existence result for strongly indefinite semilinear elliptic systems with Ne...
In this paper we carry on the study of asymptotic behavior of some solutions to a singularly pertur...
In this paper we study the shape of least-energy solutions to a singularly perturbed quasilinear pro...
In this paper we study the shape of least-energy solutions to a singularly perturbed quasilinear pro...
In this paper we study the shape of least-energy solutions to the quasilinear problem εmΔmu−um−1+f(u...
In this paper we study the shape of least-energy solutions to the quasilinear problem εmΔmu−um−1+f(u...
In this paper we study the shape of least-energy solutions to the quasilinear problem εmΔmu−um−1+f(u...
We continue our work (Y. Li, C. Zhao, Locating the peaks of least-energy solutions to a quasilinear ...
Abstract: We study the shape of least-energy solutions to the quasilinear elliptic equation ∊mΔmu − ...
Abstract: We study the shape of least-energy solutions to the quasilinear elliptic equation ∊mΔmu − ...
AbstractWe establish an existence result for strongly indefinite semilinear elliptic systems with Ne...
AbstractWe consider a system of the form −ε2Δu+u=g(v),−ε2Δv+v=f(u) in Ω with Neumann boundary condit...
In this paper we prove the existence of a least energy nodal (i.e. sign-changing) solution for a lar...
AbstractLet Ω be a smooth bounded domain in RN, with N⩾5, a>0, α⩾0 and 2∗=2NN−2. We show that the ex...
(Communicated by Changfeng Gui) Abstract. In this paper we want to characterize and visualize the sh...
AbstractWe establish an existence result for strongly indefinite semilinear elliptic systems with Ne...
In this paper we carry on the study of asymptotic behavior of some solutions to a singularly pertur...