Article
Licensed
Unlicensed
Requires Authentication
Kneser-Type Oscillation Criteria for Self-Adjoint Two-Term Differential Equations
-
Ondřej Došlý
Published/Copyright:
February 23, 2010
Abstract
It is proved that the even-order equation y(2n)+p(t)y = 0 is (n, n) oscillatory at ∞ if
where 
.
Received: 1994-02-10
Published Online: 2010-02-23
Published in Print: 1995-June
© 1995 Plenum Publishing Corporation
You are currently not able to access this content.
You are currently not able to access this content.
Articles in the same Issue
- On Structure of Solutions of a System of Four Differential Inequalities
- On the Darboux Transformation. I
- Kneser-Type Oscillation Criteria for Self-Adjoint Two-Term Differential Equations
- Basic Boundary Value Problems of Thermoelasticity for Anisotropic Bodies with Cuts. II
- Weighted Reverse Weak Type Inequality for General Maximal Functions
- On a Generalization of the Keldysh Theorem
- On a Spatial Problem of Darboux Type for a Second-Order Hyperbolic Equation
- Some Negative Results Concerning the Process of Fejér Type Trigonometric Convolution
- Applications of the Method of Barriers II. Some Singularly Perturbed Problems
Articles in the same Issue
- On Structure of Solutions of a System of Four Differential Inequalities
- On the Darboux Transformation. I
- Kneser-Type Oscillation Criteria for Self-Adjoint Two-Term Differential Equations
- Basic Boundary Value Problems of Thermoelasticity for Anisotropic Bodies with Cuts. II
- Weighted Reverse Weak Type Inequality for General Maximal Functions
- On a Generalization of the Keldysh Theorem
- On a Spatial Problem of Darboux Type for a Second-Order Hyperbolic Equation
- Some Negative Results Concerning the Process of Fejér Type Trigonometric Convolution
- Applications of the Method of Barriers II. Some Singularly Perturbed Problems
