论文信息 - On strong stability for linear integral equations

On strong stability for linear integral equations

SummaryThe notion of strong or adjoint stability for linear ordinary differential equations is generalized to the theory of Volterra integral equations. It is found that this generalization is not unique in that equivalent definitions for differential equations lead to different stabilities for integral equations in general. Three types of stabilities arising naturally are introduced: strong stability, adjoint stability, and uniform adjoint stability. Necessary and sufficient conditions relative to the fundamental matrix for these stabilities are proved. Some lemmas dealing with non-oscillation of solutions and a semi-group property of the fundamental matrix are also given.

J. M. Cushing | John M. Bownds

[1] J. Nohel,et al. Perturbations of Volterra integral equations , 1969 .

[2] C. Corduneanu. Problèmes globaux dans le théorie des équations intégrales de Volterra , 1965 .

[3] Lamberto Cesari,et al. Asymptotic Behavior and Stability Problems in Ordinary Differential Equations , 1963 .

[4] F. V. Vleck,et al. Stability and Asymptotic Behavior of Differential Equations , 1965 .

[5] Admissibility and nonlinear Volterra integral equations , 1970 .

[6] G. G. Stokes. "J." , 1890, The New Yale Book of Quotations.

[7] R. K. Miller. On the linearization of Volterra integral equations. , 1968 .

[8] J. Cushing,et al. Some stability theorems for systems of volterra integral equations , 1975 .

[9] C. Corduneanu,et al. Some perturbation problems in the theory of integral equations , 1967, Mathematical systems theory.

[10] J. Cushing,et al. Some stability criteria for linear systems of Volterra integral equations , 1972 .

[11] J. Cushing,et al. A representation formula for linear Volterra integral equations , 1973 .