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Your search keyword '"Pripoae, Cristina-Liliana"' showing total 15 results
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15 results on '"Pripoae, Cristina-Liliana"'

1. Holonomic and non-holonomic geometric models associated to the Gibbs-Helmholtz equation

Author

Pripoae, Cristina-Liliana, Hirica, Iulia-Elena, Pripoae, Gabriel-Teodor, and Preda, Vasile

Subjects
Mathematical Physics, Mathematics - Differential Geometry, 58A17, 53A07, 53B50, 82-10, 89-10, 80A10
Abstract

By replacing the internal energy with the free energy, as coordinates in a "space of observables", we slightly modify (the known three) non-holonomic geometrizations and show that the coefficients of the curvature tensor field, of the Ricci tensor field and the scalar curvature function still remain rational functions. In addition, we define and study a new holonomic Riemannian geometric model associated, in a canonical way, to the Gibbs-Helmholtz equation from Classical Thermodynamics. The main geometric invariants are determined and some of their properties are derived. Using this geometrization, we characterize the equivalence between the Gibbs-Helmholtz entropy and the Boltzmann-Gibbs-Shannon, Tsallis and Kaniadakis entropies, respectively, by means of three stochastic integral equations. We prove that some specific (infinite) families of normal probability distributions are solutions for these equations.

Published
2023

2. Entropy- A Tale of Ice and Fire

Author

Hirica Iulia-Elena, Pripoae Cristina-Liliana, Pripoae Gabriel-Teodor, and Preda Vasile

Subjects
tsallis entropy, fokker-plank equations, special values of tsallis parameters, 35q84, 22e70, 35q82, 70g65, 82c31, 94a17, Mathematics, QA1-939
Abstract

In this review paper, we recall, in a unifying manner, our recent results concerning the Lie symmetries of nonlinear Fokker-Plank equations, associated to the (weighted) Tsallis and Kaniadakis entropies. The special values of the Tsallis parameters, highlighted by the classification of these symmetries, clearly indicate algebraic and geometric invariants which differentiate the Lie algebras involved. We compare these values with the ones previously obtained by several authors, and we try to establish connections between our theoretical families of entropies and specific entropies arising in several applications found in the literature.

Published
2023
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12. On the geometrization of vector fields (I).

Author

Pripoae, Gabriel-Teodor and Pripoae, Cristina-Liliana

Subjects
*VECTOR fields, *DIFFERENTIABLE manifolds, *DIFFERENTIAL invariants
Abstract

We look for new geometric invariants associated, in canonical ways, to vector fields on differentiable manifolds, as special sets of affine connections and (semi)-Riemannian metrics. This approach is motivated by the need of geometrization of autonomous ODEs systems (and, to some extent, of the non-autonomous ones). [ABSTRACT FROM AUTHOR]

Published
2021

13. On the vertices of the elliptic curves.

Author

Pripoae, Cristina-Liliana and Pripoae, Gabriel-Teodor

Subjects
*GEOMETRIC vertices, *ELLIPTIC curves, *WEIERSTRASS points, *DIFFERENTIAL geometry, *MATHEMATICAL bounds
Abstract

We investigate the elliptic curves, expressed in the Weierstrass form, from a differential geometric viewpoint. The curvature function is carefully studied and bounds for the number of vertices of the elliptic curves are given. As a generalization, a program for the classification of algebraic curves is sketched, using geometric invariants. [ABSTRACT FROM AUTHOR]

Published
2016

14. MULTI-CRITERIA OPTIMIZATION ON MANIFOLDS.

Author

Pripoae, Cristina Liliana

Subjects
*MANIFOLDS (Mathematics), *DIFFERENTIAL geometry, *GEOMETRIC topology, *TOPOLOGY, *PARETO analysis
Abstract

In [1] we denned the notion of Pareto manifolds, as a tool for generalizing classical methods of multi-criteria optimization to the framework of modern Differential geometry. The present paper contains more details and examples of Pareto manifolds, and of Pareto maxima on manifolds. [ABSTRACT FROM AUTHOR]

Published
2015

15. Free fall motion in an invariant field of forces: the 2D-case.

Author

Pripoae, Cristina-Liliana and Pripoae, Gabriel-Teodor

Subjects
*LIE groups, *LIE algebras, *VECTOR fields, *GEODESICS, *DIFFERENTIAL geometry, *MATHEMATICAL analysis
Abstract

Following [12] and [14], the Lie groups may be classified into four families, with respect to the property of the invariant vector fields to be geodesic. A detailed study in dimensions 2 and 3 ([13]) led to many examples of particular invariant vector fields ξ geometrized, in this manner, by means of some properly chosen invariant Riemannian metrics g. In this paper we extend the previous investigation, and analyse the behavior of all the invariant vector fields ξ and of all their associated invariant Riemannian metrics g. The 2-dimensional case is completely solved: given a left invariant field of forces ξ on a 2-dimensional Lie group G, we determine all the metrics g 2 Riem(G; ξ) such that ξ becomes geodesic in (G; g) and all the possible trajectories of free fall particles moving in the "Universe" (G; g). [ABSTRACT FROM AUTHOR]

Published
2009

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