Existence of solutions to a class of damped random impulsive differential equations under Dirichlet boundary value conditions

In this paper, we study sufficient conditions for the existence of solutions to a class of damped random impulsive differential equations under Dirichlet boundary value conditions.By Evening Primrose Oil/GLA using variational method we first obtain the corresponding energy functional.Then the existence of critical points are obtained by using Mountain pass lemma and Minimax principle.Finally we assert the critical point of enery functional is the mild Makeup Finishing Sprays solution of damped random impulsive differential equations.