This paper addresses the robust state estimation problem for a class of jump Markov linear systems(JMLSs)with ...
LI Wenling1,JIA Yingmin1,2,MENG Deyuan11.The Seventh Research Division and the Department of Systems and Control,Beihang University(BUAA),Beijing 100191,P.R.China2.Key Laboratory of Mathematics,Informatics and Behavioral Semantics(LMIB),Ministry of Education,SMSS,Beihang University(BUAA),Beijing 100191,P.R.China
This article investigates the convergence and growth of multiple Dirichlet series. The Valiron formula of Dirichlet series is extended to n-tuple Dirichlet series and an equivalence relation between the order of n-tuple Dirichlet series and its coefficients and exponents is obtained.
Laplacian support vector machine(LapSVM) is an attracting tool for semi-supervised classification with manifol...
Li Juntao1,Jia Yingmin1,Du Junping2,Li Wenlin3 1.The Seventh Research Division,Beihang University(BUAA) ,Beijing 100083,P.R.China 2.Beijing Key Laboratory of Intelligent Telecommunications Software and Multimedia,School of Computer Science and Technology,Beijing University of Posts and Telecommunications,Beijing 100876,P.R.China 3.College of Mathematics and Information Science,Henan Normal University,Xingxiang 453007,P.R.China
This paper addresses the problem of tracking multiple targets using multi-sensor bearings-only measurements in...
WANG Yazhao1,JIA Yingmin1,2,DU Junping3,YU Fashan4 1.The Seventh Research Division and the Department of Systems and Control,Beihang University(BUAA),Beijing 100191,P.R.China2.Key Laboratory of Mathematics,Informatics and Behavioral Semantics(LMIB),Ministry of Education,SMSS,Beihang University(BUAA),Beijing 100191,P.R.China3.Beijing Key Laboratory of Intelligent Telecommunications Software and Multimedia,School of Computer Science and Technology,Beijing University of Posts and Telecommunications,Beijing 100876,P.R.China4.School of Electrical Engineering and Automation,Henan Polytechnic University,Jiaozuo 454000,Henan,P.R.China
The well-known Generalized Champagne Problem on simultaneous stabilization of linear systems is solved by using complex analysis and Blonders technique. We give a complete answer to the open problem proposed by Patel et al., which automatically includes the solution to the original Champagne Problem. Based on the recent development in automated inequality-type theorem proving, a new stabilizing controller design method is established. Our numerical examples significantly improve the relevant results in the literature.
