Your search keyword '"Stoyanova, Tsvetana"' showing total 7 results

1. Nonintegrability of the Painlevé IV equation in the Liouville–Arnold sense and Stokes phenomena.

Author

Stoyanova, Tsvetana

Subjects

*PAINLEVE equations, *HAMILTONIAN systems, *STOKES equations, *GALOIS theory, *SENSES

Abstract

In this paper we study the integrability of the Hamiltonian system associated with the fourth Painlevé equation. We prove that one two‐parametric family of this Hamiltonian system is not integrable in the sense of the Liouville–Arnold theorem. Computing explicitly the Stokes matrices and the formal invariants of the second variational equations, we deduce that the connected component of the unit element of the corresponding differential Galois group is not Abelian. Thus the Morales–Ramis–Simó theory leads to a nonintegrable result. Moreover, combining the new result with our previous one we establish that for all values of the parameters for which the PIV$P_{IV}$ equation has a particular rational solution the corresponding Hamiltonian system is not integrable by meromorphic first integrals which are rational in t. [ABSTRACT FROM AUTHOR]

Published

2023

2. Stokes Matrices of a Reducible Double Confluent Heun Equation via Monodromy Matrices of a Reducible General Huen Equation with Symmetric Finite Singularities.

Author

Stoyanova, Tsvetana

Subjects

*EQUATIONS, *MATRICES (Mathematics), *FINITE, The, *STOKES equations

Abstract

We study the effect of the unfolding of a reducible double confluent Heun equation from the point of view of the Stokes phenomenon. We introduce a small complex parameter ε that splits together the non-resonant singular points x = 0 and x = ∞ into four different Fuchsian singularities x L = − ε , x R = ε , and x L L = − 1 / ε , x R R = 1 / ε , respectively. The perturbed equation is a symmetric general Heun equation and its general solution depends analytically on ε . Then we prove that when the perturbed equation has exactly two resonant singularities of different type, all the Stokes matrices of the initial double confluent Heun equation are realized as a limit of the upper-triangular parts of the monodromy matrices of the perturbed equation when ε → 0 . To establish this result we combine a direct computation with a theoretical approach. [ABSTRACT FROM AUTHOR]

Published

2022

3. KNOWLEDGE MANAGEMENT FOR THE INNOVATIVE UNCONVENTIONAL MONETARY POLICY.

Author

Trifonova, Silvia and Stoyanova, Tsvetana

Subjects

*KNOWLEDGE management, *MONETARY policy, *CENTRAL banking industry, *INTEREST rate policy

Abstract

The main objectives of the paper are to enhance the knowledge for the innovative unconventional monetary policy of the world's leading central banks, to raise the awareness for this new monetary policy course and to outline the importance of the knowledge management for this important issue. The topic about the innovative unconventional monetary policy is relatively new to the financial theory and practice. The innovation and the originality of this paper are evidenced by the fact that the current study is the first of its kind which is focused on the need of a proper knowledge management for the unconventional monetary policy, implemented by the Federal Reserve (Fed) of the United States, the European Central Bank (ECB) and the Bank of Japan (BoJ). Since the monetary policy of central banks is a major factor for the interest rate changes and in particular, for the government bond yields' changes, an econometric study regarding the impact of the central banks' base interest rates on the central government 10-year bond yields is undertaken. This is done for a large set of countries, such as the Euro area member states (excluding Estonia), the United States, Japan, China, Russian Federation, Brazil and Turkey. The empirical research covers totally 24 countries during the period 2010-2016 by using monthly data (with totally 84 observations made). The paper can help for creating new scientific knowledge, as the topic of the unconventional monetary policy is up-to-date, innovative, significant and relevant to the international and European research priorities. [ABSTRACT FROM AUTHOR]

Published

2019

4. Zero Level Perturbation of a Certain Third-Order Linear Solvable ODE with an Irregular Singularity at the Origin of Poincaré Rank 1.

Author

Stoyanova, Tsvetana

Subjects

*PERTURBATION theory, *ORDINARY differential equations, *FUCHSIAN groups, *LINEAR solvation energy relationships, *MONODROMY groups

Abstract

We study an irregular singularity of Poincaré rank 1 at the origin of a certain third-order linear solvable homogeneous ODE. We perturb the equation by introducing a small parameter ε∈(ℝ+,0) (ε < 1), which causes the splitting of the irregular singularity into two finite Fuchsian singularities. We show that when the solutions of the perturbed equation contain logarithmic terms, the Stokes matrices of the initial equation are limits of the part of the monodromy matrices around the finite resonant Fuchsian singularities of the perturbed equation. [ABSTRACT FROM AUTHOR]

Published

2018

5. Correction to : Stokes Matrices of a Reducible Double Confluent Heun Equation via Monodromy Matrices of a Reducible General Huen Equation with Symmetric Finite Singularities.

Author

Stoyanova, Tsvetana

Subjects

*MATRICES (Mathematics), *EQUATIONS, *FINITE, The, *HYPERGEOMETRIC functions

Abstract

A Correction to this paper has been published: https://doi.org/10.1007/s10883-021-09575-w [ABSTRACT FROM AUTHOR]

Published

2022

6. On Stability Criteria Induced by the Resolvent Kernel for a Fractional Neutral Linear System with Distributed Delays.

Author

Madamlieva, Ekaterina, Milev, Marian, and Stoyanova, Tsvetana

Subjects

*STABILITY criterion, *FUNCTIONS of bounded variation, *DELAY differential equations, *LINEAR systems

Abstract

We consider an initial problem (IP) for a linear neutral system with distributed delays and derivatives in Caputo's sense of incommensurate order, with different kinds of initial functions. In the case when the initial functions are with bounded variation, it is proven that this IP has a unique solution. The Krasnoselskii's fixed point theorem, a very appropriate tool, is used to prove the existence of solutions in the case of the neutral systems. As a corollary of this result, we obtain the existence and uniqueness of a fundamental matrix for the homogeneous system. In the general case, without additional assumptions of boundedness type, it is established that the existence and uniqueness of a fundamental matrix lead existence and uniqueness of a resolvent kernel and vice versa. Furthermore, an explicit formula describing the relationship between the fundamental matrix and the resolvent kernel is proven in the general case too. On the base of the existence and uniqueness of a resolvent kernel, necessary and sufficient conditions for the stability of the zero solution of the homogeneous system are established. Finally, it is considered a well-known economics model to describe the dynamics of the wealth of nations and comment on the possibilities of application of the obtained results for the considered systems, which include as partial case the considered model. [ABSTRACT FROM AUTHOR]

Published

2023

7. Non-integrability of the fourth Painlev� equation in the Liouville–Arnold sense.

Author

Stoyanova, Tsvetana

Subjects

*HAMILTONIAN systems, *GALOIS theory, *MEROMORPHIC functions, *PAINLEVE equations, *LIOUVILLE'S theorem, *INTEGRALS

Abstract

In this paper we are concerned with the integrability of the fourth Painlev� equation (PIV) from the point of view of the Hamiltonian dynamics. We prove that the fourth Painlev� equation with parameters a�=�m,�b�=�−2(1�+�2n�+�m) where , is not integrable in the Liouville–Arnold sense by means of meromorphic first integrals. We explicitly compute formal and analytic invariants of the second variational equations which generate topologically the differential Galois group. In this way our calculations and the Ziglin–Ramis–Morales-Ruiz–Sim� method yield the non-integrability results. [ABSTRACT FROM AUTHOR]

Published

2014