Some practical stability criteria for semistate equations (Q1108447)

The author considers the semistate vector equation (1) \(Ax'+B(x,t)=0\), \(x'=dx/dt\), where \(A\) is a constant singular matrix, \(B\) is a nonlinear vector function, and \(x\in R^n\). He establishes conditions under which the trivial solution \(x=0\) of (1) is completely uniformly asymptotically \(A\)-stable (the concept of \(A\)-stability is invariant with respect to a constant nonsingular transformation). The autonomous equation (1) in a particular case is also discussed.