Add to ORKGWe present a class of nonlinear differential equations of second Painlevé type. These equations, with a single exception, admit the quasi-Painlevé property along a rectifiable curve, that is, for general solutions, every movable singularity defined by a rectifiable curve is at most an algebraic branch point. Moreover we discuss the global many-valuedness of their solutions. For the exceptional equation, by the method of successive approximation, we construct a general solution having a movable logarithmic branch point
International audienceThe Painleve equations were derived by Painleve and Gambier in 1895-1910. Give...
Abstract. We present a brief overview of integrability of nonlinear ordinary and partial differentia...
Painleve ́ equations are second-order algebraic differential equations satisfying the Painleve ́ Pro...
The Painleve analysis plays an important role in investigating local structure of the solutions of d...
AbstractWe define a class of systems of nonlinear ordinary differential equations, resolvable with r...
AbstractWe define a class of systems of nonlinear ordinary differential equations, resolvable with r...
A rigorous methodology for studying the initial value problems associated with certain integrable no...
AbstractDifferential equations with the Painleve property have been studied extensively due to their...
By employing a variety of techniques, we investigate several classes of solutions of a family of non...
In this paper, a class of nonlinear algebraic differential equations (NADEs) is studied. The Painlev...
The NATO Advanced Research Workshop "Painleve Transcendents, their Asymp totics and Physical Applic...
ABSTRACT. In this note, we will give a brief summary of geometric approach to understanding equation...
We study the Painleve analysis for a class of nonlinear diffusion equations. We find that in some ca...
The first-order second-degree equations satisfying the Fuchs theorem concerning the absence of movab...
Consider the sixth Painleve equation (VI) $y^{¥prime¥prime}=¥frac{1}{2}(¥frac{1}{y}+¥frac{1}{y-1}+¥f...
International audienceThe Painleve equations were derived by Painleve and Gambier in 1895-1910. Give...
Abstract. We present a brief overview of integrability of nonlinear ordinary and partial differentia...
Painleve ́ equations are second-order algebraic differential equations satisfying the Painleve ́ Pro...
The Painleve analysis plays an important role in investigating local structure of the solutions of d...
AbstractWe define a class of systems of nonlinear ordinary differential equations, resolvable with r...
AbstractWe define a class of systems of nonlinear ordinary differential equations, resolvable with r...
A rigorous methodology for studying the initial value problems associated with certain integrable no...
AbstractDifferential equations with the Painleve property have been studied extensively due to their...
By employing a variety of techniques, we investigate several classes of solutions of a family of non...
In this paper, a class of nonlinear algebraic differential equations (NADEs) is studied. The Painlev...
The NATO Advanced Research Workshop "Painleve Transcendents, their Asymp totics and Physical Applic...
ABSTRACT. In this note, we will give a brief summary of geometric approach to understanding equation...
We study the Painleve analysis for a class of nonlinear diffusion equations. We find that in some ca...
The first-order second-degree equations satisfying the Fuchs theorem concerning the absence of movab...
Consider the sixth Painleve equation (VI) $y^{¥prime¥prime}=¥frac{1}{2}(¥frac{1}{y}+¥frac{1}{y-1}+¥f...
International audienceThe Painleve equations were derived by Painleve and Gambier in 1895-1910. Give...
Abstract. We present a brief overview of integrability of nonlinear ordinary and partial differentia...
Painleve ́ equations are second-order algebraic differential equations satisfying the Painleve ́ Pro...