This paper is devoted to the study of a Kirchhoff wave equation with a viscoelastic
term in an annular associated with homogeneous Dirichlet conditions. At first, by
applying the Faedo-Galerkin, we prove existence and uniqueness of the solution of the
problem considered. Next, by constructing Lyapunov functional, we establish a sufficient
condition such that any global weak solution is general decay as t → +∞.
Publication Information
Publisher
Thu Dau Mot University, Viet Nam
Honorary Editor-in-Chief and Chairman of the Editorial Board
Assoc. Prof. Nguyen Van Hiep
Deputy Editor-in-Chief
PhD. Trần Hạnh Minh Phương Thu Dau Mot University
Editorial Board
Prof. Tran Van Doan Fujen University, Taiwan
Prof. Zafar Uddin Ahmed Vietnam National University Ho Chi Minh City
Prof.Dr. Phillip G.Cerny The University of Manchester, United Kingdom
Prof. Ngo Van Le University of Social Sciences and Humanities (VNU-HCM)
Prof. Bui The Cuong Southern Institute of Social Sciences
Prof. Le Quang Tri Can Tho University
Assoc. Prof. Nguyen Van Duc Animal Husbandry Association of Vietnam
Assoc. Prof. Ted Yuchung Liu National Pingtung University, Taiwan
PhD. Anita Doraisami Economics Monash University, Australia
Prof. Dr. Andrew Seddon Asia Pacific University of Technology & innovation (APU)
Assoc. Prof. Le Tuan Anh Thu Dau Mot University
Prof. Abtar Darshan Singh Asia Pacific University, Malaysia
Prof.Dr. Ron W.Edwards The University of Melbourne, Australia
Assoc. Prof. Hoang Xuan Nien Thu Dau Mot University
PhD. Nguyen Duc Nghia Vietnam National University Ho Chi Minh City
PhD. Bao Dat Monash University (Australia)
PhD. Raqib Chowdhury Monash University (Australia)
PhD. Nguyen Hoang Tuan Thu Dau Mot University
PhD. Nguyen Thi Lien Thuong Thu Dau Mot University