Let G be a finite group, and fix p a prime divisor of |G|. Denote G_p' as the set of p-regular elements of G. A simple p-modular character φ of G is said to be almost liftable if there exists a simple complex character χ of G such that χ = Nφ on G_p' for some positive integer N. Moreover if N = 1, φ is said to be liftable. We say that G has the (L, p)-property if either there exists a simple p-modular character which is not almost liftable, or all the simple p-modular characters are liftable; and G is said to have the (L', p)-property if whenever χ is a simple complex character of G and χ = Nφ on G_p' for some simple p-modular character φ, then we have N = 1. In this thesis, we observe that the (L', p)-property of G implies the (L, p)-property of G, and show that when n = 2, 3, the general linear groups GL(n, q) and the special linear groups SL(n, q) have the (L', p)-property for any prime p and any prime power q.