The articles that I published so far in peer-reviewed journals follow the introduction and development of properties of Koszul (co)rings, by means of homological properties. Along with the dualization of some definitions and well known properties, I studied examples and applications, in the category of path (co)algebras for partially ordered sets that are finite and graded.
On Koszulity of Finite Graded Posets, with Dragoș ȘTEFAN, J. Algebra Appl. 16, 1750139 (2017), 20pp, [link];
Further Properties and Applications of Koszul Pairs, with Dragoș ȘTEFAN, SIGMA (Symmetry, Integrability and Geometry: Methods and Applications), 12 (2016), 092, 24pp, [link];
The Ext Ring of a Koszul Ring, Bull. Math. Soc. Sci. Math. Roumanie, Tome 59 (107), No. 1, 2016, pp. 51-63, [link];
The Technically Manifolded (Classical and Quantum) Space Ontology, Society and Politics, vol. 11, No 1, 2017, pp. 91-93, [link].
The article is a review for the book The Deep Metaphysics of Space, by Ed SLOWIK, which discusses the evolution of the concept of space, both in physical and geometrical terms, from Leibniz and Newton, to Poincaré and Einstein.
Linked, Noua știință a rețelelor, Albert László BARABÁSI, Romanian translation by Marius Cosmeanu, Brumar, Timișoara 2017, pp. 316 [link].
I was the scientific referee for the Romanian translation of this book, which covers subjects such as combinatorial topology, solid state physics, statistical mechanics and graph theory. The original book can be found here.
Homological methods in the study of algebras and coalgebras, PhD. Thesis ;
Homological methods in the study of noncommutative algebras, MSc. Thesis (in Romanian) ;
Geometric Algebra and the Dirac Equation, BSc. Thesis ;