Abstract EN:

This thesis largely considers two different themes. Ln the first part, we study the power series of the type Sum-Product (SP), that are called thus as their Taylor series coefficients have the syntax of sum of products. Our work comprised of analysis of their singularites. It invoves bath theoretical and numerical aspects. For certain types of driving functions, for example polynomials or monomials, the interior generators (associated to singularities) satisfy linear homogeneous ordinary differential equations. One of the important results of the present work is the non-existence of differential equations in certain cases, for example for rational inputs. Apart from the differential aspects of these series, we have also been interested in the resurgence algebra formed from the various generators associated to the singularities, for a better comprehension of the algebrico-analytic aspects of the problem. Ln the second part of my thesis, we considered the questions related ta non commutative geometry and the use of this vast and mathematically rich theory in the comprehension of the important physical phenomenon of fractional quantum Hall effect. Ln this pursuite, we have looked into diverse approaches helpful in the treatment of this problem such as the algebras over the non commutative torus, the almost finite dimensional (AF) algebras and others.