A Note on the Dirichlet Condition for Second-Order Differential Expressions

W. N. Everitt

doi:10.4153/CJM-1976-033-3

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Let M denote the formally symmetric, second-order differential expression given by, for suitably differentiable complex-valued functions ƒ,

The coefficients p and q are real-valued, Lebesgue measurable on the halfclosed, half-open interval [a, b) of the real line, with - ∞ < a < b ≦ ∞, and satisfy the basic conditions:

References

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Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Bradley, J. S. and Everitt, W. N. 1976. A singular integral inequality on a bounded interval. Proceedings of the American Mathematical Society, Vol. 61, Issue. 1, p. 29.

Atkinson, F. V. 1976. ASYMPTOTIC INTEGRATION AND THE L2-CLASSIFICATION OF SQUARES OF SECOND-ORDER DIFFERENTIAL OPERATORS. Quaestiones Mathematicae, Vol. 1, Issue. 2, p. 155.

Evans, W. D. 1976. Ordinary and Partial Differential Equations. Vol. 564, Issue. , p. 78.

Hinton, Don 1977. Strong limit-point and Dirichlet criteria for ordinary differential expressions of order 2n. Proceedings of the Royal Society of Edinburgh: Section A Mathematics, Vol. 76, Issue. 4, p. 301.

Amos, R. J. and Everitt, W. N. 1978. On a quadratic integral inequality. Proceedings of the Royal Society of Edinburgh: Section A Mathematics, Vol. 78, Issue. 3-4, p. 241.

Neuman, F. 1978. Limit circle classification and boundedness of solutions. Proceedings of the Royal Society of Edinburgh: Section A Mathematics, Vol. 81, Issue. 1-2, p. 31.

Hinton, Don B. 1978. Eigenfunction expansions and spectral matrices of singular differential operators. Proceedings of the Royal Society of Edinburgh: Section A Mathematics, Vol. 80, Issue. 3-4, p. 289.

Amos, R. J. and Everitt, W. N. 1979. On integral inequalities and compact embeddings associated with ordinary differential expressions. Archive for Rational Mechanics and Analysis, Vol. 71, Issue. 1, p. 15.

Neuman, F. 1982. Ordinary and Partial Differential Equations. Vol. 964, Issue. , p. 548.

Everitt, W. N. and Wray, S. D. 1983. Ordinary Differential Equations and Operators. Vol. 1032, Issue. , p. 170.

Everitt, W. N. Gilbert, R. P. and Evans, W. D. 1983. On a Result of Brinck in the Limit-Point Theory of Second- Order Differential Expressions. Applicable Analysis, Vol. 15, Issue. 1-4, p. 71.

Race, D. 1985. On the strong limit-point and Dirichlet properties of second order differential expressions. Proceedings of the Royal Society of Edinburgh: Section A Mathematics, Vol. 101, Issue. 3-4, p. 283.

Evans, W.Desmond and Knowles, Ian 1986. On the extension problem for singular accretive differential operators. Journal of Differential Equations, Vol. 63, Issue. 2, p. 264.

Brown, Richard C. and Hinton, Don B. 2004. Relative form boundedness and compactness for a second-order differential operator. Journal of Computational and Applied Mathematics, Vol. 171, Issue. 1-2, p. 123.

Brown, R. 2004. A limit-point criterion for a class of Sturm-Liouville operators defined in 𝐿^{𝑝} spaces. Proceedings of the American Mathematical Society, Vol. 132, Issue. 8, p. 2273.

Qi, Jiangang and Wu, Hongyou 2011. Limit point, strong limit point and Dirichlet conditions for Hamiltonian differential systems. Mathematische Nachrichten, Vol. 284, Issue. 5-6, p. 764.

Kostenko, Aleksey 2013. The similarity problem for indefinite Sturm–Liouville operators and the HELP inequality. Advances in Mathematics, Vol. 246, Issue. , p. 368.

Behrndt, Jussi Schmitz, Philipp and Trunk, Carsten 2019. Spectral bounds for indefinite singular Sturm–Liouville operators with uniformly locally integrable potentials. Journal of Differential Equations, Vol. 267, Issue. 1, p. 468.

Derkach, Volodymyr Strelnikov, Dmytro and Winkler, Henrik 2021. On a Class of Integral Systems. Complex Analysis and Operator Theory, Vol. 15, Issue. 6,

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A Note on the Dirichlet Condition for Second-Order Differential Expressions

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