An alternative approach to the calculation of fundamental groups based on labeled natural deduction

In this work, we use a labelled deduction system based on the concept of computational paths (sequence of rewrites) as equalities between two terms of the same type. We also define a term rewriting system that is used to make computations between these computational paths, establishing equalities between equalities. We use a labelled deduction system based on the concept of computational paths (sequence of rewrites) to obtain some results of algebraic topology and with support of the Seifet-Van Kampen Theorem we will calculate, in a way less complex than the one made in mathematics \cite{Munkres} and the technique of homotopy type theory \cite{hott}, the fundamental group of Klein Blottle $\mathbb{K}^2$, of the Torus $\mathbb{T}^2$ and Two holed Torus $\mathbb{M}_2=\mathbb{T}^2\# \mathbb{T}^2$ (the connected sum two torus).