Strong limit-point and Dirichlet criteria for ordinary differential expressions of order 2n
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Publication:4118125
DOI10.1017/S030821050001965XzbMath0348.34014MaRDI QIDQ4118125
Publication date: 1977
Published in: Proceedings of the Royal Society of Edinburgh: Section A Mathematics (Search for Journal in Brave)
Weyl theory and its generalizations for ordinary differential equations (34B20) Linear ordinary differential equations and systems (34A30)
Related Items
On the extension problem for singular accretive differential operators, On the strong limit-point and Dirichlet properties of second order differential expressions, Some strong limit-2 and Dirichiet criteria for fourth order differential expressions, On the minimization of singular quadratic functional, On the essential spectra of linear 2nth order differential operators with complex coefficients
Cites Work
- Remarks on some Dirichlet type results for semibounded Sturm-Liouville operators
- Some remarks on a separation and limit-point criterion of second-order, ordinary differential expressions
- A Dirichlet type result for ordinary differential operators
- On the limit-point and strong limit-point classification of \(2n\)-th order differential expressions with wildly oscillating coefficients
- On the Strong and Weak Limit-Point Classification of Second-Order Differential Expressions†
- On the Strong Limit-n Classification of Linear Ordinary Differential Expressions of Order 2n
- On the Strong Limit-Point Classification of Fourth-Order Differential Expressions with Complex Coefficients
- A Note on the Dirichlet Condition for Second-Order Differential Expressions
- 11.—Limit-n Criteria of Integral Type
- Limit Point Criteria for Differential Equations
- Limit Point Criteria for Differential Equations, II
