In the present thesis, we take the opportunity to discuss several basic and important results in representation theory. More precisely we mainly investigate the criterion of finite groups G that are of finite representation type for both kG-modules or for ZG-lattices, as well as separable splitting fields of algebraic tori. In Chapter 2, we consider the theory of representations of finite groups over a field k. We focus mainly on the case where the characteristic of k divides the order of the group G. This chapter include Green’s correspondence and its the connection to the criterion of kG that is of finite representation. We also discuss the structure and relation of Grothendieck groups RkG and RKG in a modular system setting, namely the cde triangle. In Chapter 3, we give an overview of integral representations based on classical results of Heller and Reiner, which would be useful for further studies. In Chapter 4, we give a description of classification of indecomposable integral representations of cyclic groups of prime order p and dihedral groups of order 2p, based on works of Reiner and of Lee. In the last chapter, we give a connection between algebraic tori and integral representations of finite groups. We give several different proofs of the theorem that any algebraic tori over a field splits over a finite field extension. Besides, we also generalize Chow’s theorem to semi-abelian varieties, and give a sharp bound for the splitting fields of algebraic tori.