Global Journal of Mathematical Sciences(GJMS)

In this paper we study the stability results for impulsive set differential equations involving causal operators with memory by considering initial functions as a Hukuhara difference of two functions. This will enable to obtain results parallel to ordinary differential equations with delay

Gnana Bhaskar, T., Vasundhara Devi, J., Stability Criteria for Set Differential Equations, Mathematical and Computer Modeling 41 (2005) 1371-1378.

Lakshmikantham, V., and Leela, S., Differential and Integral Inequalities, Vol.I and II , Academic press, Newyork, 1969.

Lakshmikantham,V., Leela,S., Drici, Z. and McRae, F.A., Theory of Causal Differential Equations, Atlanties and World Scientific Press (2009).

Lakshmikantham, V., GnanaBhaskar, T. and Vasundhara Devi,J., Theory of Set Differential Equations in Metric Spaces, Cambridge Scientific Publishers, 2006.

Vasundhara Devi,J., Appala Naidu, Ch., Stability Results for set differential equations involving causal operators with memory,European Journal of Pure and Applied Mathematics, Vol. 5, No. 2, 2012, 187-196.

Xinyu Song, An Li, Stability and Boundedness Criteria of Nonlinear Impulsive Systems employing Perturbing Lyapunov functions, Applied Mathematics and Computation 217(2011)10166-10174.