- Ionescu D., Soós E.,
Electrogravitational Field Produced by a Charged Mass Point in RTG,. Rev. Roum. Math. P. Appl.,45(2), pp 251-260, 2000.- Ionescu D., Soós E.,
Consequences of the Causality Principle in the Relativistic Theory of Gravitation. Proceedings of the XXIII International Workshop on High Energy Physics and Field Theory, Protvino (Russia), pp 180-190, June 21-23, 2000.- Ionescu D., Soós E.,
Simultaneity and non-holonomy. Analele Universitatii din Timisoara, Fascicula speciala-Matematica,39, pp. 277-282, 2001.- Ionescu D.,
The motion in the electrogravitational field in RTG, Proceedings of the Communications Session of the Department of Mathematics, Technical University of Civil Engineering Bucharest, pp 113-117, 2001 (in romanian).- Ionescu D.,
Can Be Conserved the Concept of Homogeneous Gravitational Field from Classical Mechanics in the Relativistic Theory of Gravitation?, Theoretical and Mathematical Physics,130(2), pp 287-297, 2002.- Ionescu D.,
Comparative Analysis of the Electrogravitational Kepler Problem in GRT and RTG, International Journal of Non-Linear Mechanics,38, pp. 1251-1268, 2003.- Ionescu D.,
The Gravitational Field of an Electrically Charged Mass Point and the Causality Principle in RTG,Theoretical and Mathematical Physics,136(2), pp. 1177-1187, 2003.- Ionescu D., Scheurle J.,
Birkhoffian formulation of the dynamics of LC circuits, pp. 1-31, Z. Angew. Math. Phys., submitted for publication.- Ionescu D.,
On the Birkhoffian formulation of the dynamics of linear networks, Proceedings of the Communications Session of the Department of Mathematics, Technical University of Civil Engineering Bucharest, pp 1-4, 2005, (in romanian), (in press).- Ionescu D.
Geometric modelling of the dynamics of electrical circuits, Proceedings of the VII International Workshop on Differential Geometry and its Applications, Deva, Romania, pp 1-10, Sept 5-12, 2005, (in press).- Ionescu D.,
A geometric Birkhoffian formalism for nonlinear RLC networks, pp 1-38, J. Geom. Phys., accepted for publication.

- Ionescu D.,
The elements of curves theory in space. Linear algebra, analytical and differential geometry - problems collection, Chap.10, UTCB lithography, 1997 (in romanian).- Ionescu D.,
Applications of the geometry in Logunov's relativistic theory. PhD Thesis, pp 1-117, 2002, (in romanian).- Ionescu D.,
Gravitational Fields in the Relativistic Theory of Gravitation. Current Topics in Continuum Mechanics III, Chap.4, (Lazar Dragos, Editor) Editura Academiei, Bucharest, 2005 (in press).

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