The goal of this thesis is to study non-commutative deformation rings of representations of algebras. The main motivation is to provide a generalization of the deformation theory over commutative local rings studied by B. Mazur, M. Schlessinger and others. The latter deformation theory has played an important role in number theory, and in particular in the proof of Fermat's Last Theorem.;The thesis is divided into two parts.;In the first part, A is an arbitrary lambda-algebra for a complete local commutative Noetherian ring lambda with residue field k. A category C is defined whose objects are complete local lambda -algebras R with residue field k such that R is a quotient ring of a power series algebra over lambda in finitely many non-commuting variables. If V is a finite dimensional k-vector space that is also a left A-module and that satisfies a natural finiteness condition, it is proved that V has a so-called versal deformation ring R(A,V) . More precisely, R (A,V) is an object in C such that the isomorphism class of every lift of V over an object R in arises from a morphism alpha : R( A,V) → R in C and alpha is unique if R is the ring of dual numbers k[epsilon].;In the second part, two particular examples of lambda , A and V are studied and the versal deformation ring R(A,V) is determined in each of these cases. In the first example, lambda = k , A is a series of non-commutative k-algebras depending on a parameter r ≥ 2, and V is a particular quotient module of A; it is shown that R(A,V)) is isomorphic to A . The second example builds on the first example when r = 2 and uses that, if additionally the characteristic of k is 2, then A is isomorphic to the group ring k[ D8] of a dihedral group D8 of order 8. It is shown that if k is perfect and W is the ring of infinite Witt vectors over k, then R(W[D8],V) is isomorphic to W[D8].
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