Stability and the nonexistence of blowing-up solutions of nonlinear delay systems with linear parts

Abstract Sufficient conditions for the exponential stability of the trivial solution of nonlinear differential equations with delay and with linear parts of the form A x ( t ) + B x ( t − τ ) , τ > 0 , where A B = B A , are proved. A result on the nonexistence of blowing-up solutions is also proved.

[1]  I. Bihari A generalization of a lemma of bellman and its application to uniqueness problems of differential equations , 1956 .

[2]  Vladimir Igorevich Arnold,et al.  Geometrical Methods in the Theory of Ordinary Differential Equations , 1983 .

[3]  M. Sen Necessary and Sufficient Condition for a Set of Matrices to Commute , 2009, 0902.2983.

[4]  J. Diblík,et al.  Control of Oscillating Systems with a Single Delay , 2010 .

[5]  Sung Kyu Choi,et al.  NONLINEAR INTEGRAL INEQUALITIES OF BIHARI-TYPE WITHOUT CLASS H , 2005 .

[6]  M. Jazar,et al.  Blow-up Results for Some Nonlinear Delay Differential Equations , 2006 .

[7]  D. Khusainov,et al.  Boundary Value Problems for Delay Differential Systems , 2010 .

[8]  Josef Diblík,et al.  Fredholm’s boundary-value problems for differential systems with a single delay , 2010 .

[9]  Ravi P. Agarwal,et al.  Generalization of a retarded Gronwall-like inequality and its applications , 2005, Appl. Math. Comput..

[10]  S. Chow,et al.  Normal Forms and Bifurcation of Planar Vector Fields , 1994 .

[11]  M. Medved' ON THE GLOBAL EXISTENCE OF MILD SOLUTIONS OF NONLINEAR DELAY SYSTEMS ASSOCIATED WITH CONTINUOUS AND ANALYTIC SEMIGROUPS , 2007 .

[12]  Josef Diblík,et al.  Controllability of Linear Discrete Systems with Constant Coefficients and Pure Delay , 2008, SIAM J. Control. Optim..

[13]  J. Diblík,et al.  Representation of a solution of the Cauchy problem for an oscillating system with pure delay , 2008 .

[14]  H. Broer,et al.  Normal forms and bifurcations of planar vector fields , 1995 .