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Conjugacy criteria and principal solutions of self-adjoint differential equations

Ondřej Došlý, Jan Komenda (1995)

Archivum Mathematicum

Oscillation properties of the self-adjoint, two term, differential equation ( - 1 ) n ( p ( x ) y ( n ) ) ( n ) + q ( x ) y = 0 ( * ) are investigated. Using the variational method and the concept of the principal system of solutions it is proved that (*) is conjugate on R = ( - , ) if there exist an integer m { 0 , 1 , , n - 1 } and c 0 , , c m R such that 0 x 2 ( n - m - 1 ) p - 1 ( x ) d x = = 0 x 2 ( n - m - 1 ) p - 1 ( x ) d x and lim sup x 1 - , x 2 x 1 x 2 q ( x ) ( c 0 + c 1 x + + c m x m ) 2 d x 0 , q ( x ) ¬ 0 . Some extensions of this criterion are suggested.

Conjugacy criteria for half-linear differential equations

Simón Peňa (1999)

Archivum Mathematicum

Sufficient conditions on the function c ( t ) ensuring that the half-linear second order differential equation ( | u ' | p - 2 u ' ) ' + c ( t ) | u ( t ) | p - 2 u ( t ) = 0 , p > 1 possesses a nontrivial solution having at least two zeros in a given interval are obtained. These conditions extend some recently proved conjugacy criteria for linear equations which correspond to the case p = 2 .

De la Vallée Poussin type inequality and eigenvalue problem for generalized half-linear differential equation

Libor Báňa, Ondřej Došlý (2014)

Archivum Mathematicum

We study the generalized half-linear second order differential equation via the associated Riccati type differential equation and Prüfer transformation. We establish a de la Vallée Poussin type inequality for the distance of consecutive zeros of a nontrivial solution and this result we apply to the “classical” half-linear differential equation regarded as a perturbation of the half-linear Euler differential equation with the so-called critical oscillation constant. In the second part of the paper...

Decaying positive solutions of some quasilinear differential equations

Tadie (1998)

Commentationes Mathematicae Universitatis Carolinae

The existence of decaying positive solutions in + of the equations ( E λ ) and ( E λ 1 ) displayed below is considered. From the existence of such solutions for the subhomogeneous cases (i.e. t 1 - p F ( r , t U , t | U ' | ) 0 as t ), a super-sub-solutions method (see § 2.2) enables us to obtain existence theorems for more general cases.

Disconjugacy and disfocality criteria for second order singular half-linear differential equations

Ondřej Došlý, Alexander Lomtatidze (1999)

Annales Polonici Mathematici

We establish Vallée Poussin type disconjugacy and disfocality criteria for the half-linear second order differential equation u ' ' = p ( t ) | u | α | u ' | 1 - α s g n u + g ( t ) u ' , where α ∈ (0,1] and the functions p , g L l o c ( a , b ) are allowed to have singularities at the end points t = a, t = b of the interval under consideration.

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