Let šÆ = (Tt
)
t
ā„0 be a C
0-semigroup on a separable infinite dimensional Banach space X, with generator A. In this paper, we study the relationship between the single valued extension property of generator A, and the M-hypercyclicity of the C
0-semigroup. Specifically, we prove that if A does not have the single valued extension property at Ī» ā iā, then there exists a closed subspace M of X, such that the C
0-semigroup šÆ is M-hypercyclic. As a corollary, we get certain conditions of the generator A, for the C
0-semigroup to be M-hypercyclic.