Limit Point and Limit Circle Criteria for a Class of Singular Symmetric Differential Operators
Canadian journal of mathematics, Tome 28 (1976) no. 5, pp. 905-914

Voir la notice de l'article provenant de la source Cambridge University Press

For certain classes of singular symmetric differential operators L of order 2n, this paper considers the problem of determining sufficient conditions for L to be of limit point type or of limit circle type. The operator discussed here is defined by
Anderson, Robert L. Limit Point and Limit Circle Criteria for a Class of Singular Symmetric Differential Operators. Canadian journal of mathematics, Tome 28 (1976) no. 5, pp. 905-914. doi: 10.4153/CJM-1976-088-1
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[1] 1. Anderson, R. L., Singular symmetric differential operators on a Hilbert Space of vector valued functions, Unpublished doctoral dissertation, The University of Tennessee, Knoxville, Tennessee, 1973. Google Scholar

[2] 2. Bellman, R., Stability theory of differential equations (Dover Publications, Inc., New York, 1969). Google Scholar

[3] 3. Coppel, W. A., Stability and asymptotic behavior of differential equations (D. C. Heath and Company, Boston, 1965). Google Scholar

[4] 4. Everitt, W. N., Some positive definite differential operators, J. London Math. Soc. 1-3 (1968), 465–473. Google Scholar

[5] 5. Everitt, W. N., On the limit-point classification of fourth-order differential equations, J. London Math. Soc. U (1969), 273–281. Google Scholar

[6] 6. Everitt, W. N. and Chandhuri, J., On the square of a formally self-adjoint expression, J. London Math. Soc. U (1969), 661–673. Google Scholar

[7] 7. Glazman, I. M., On the theory of singular differential operators, Uspekhi Mat. Nauk. 5, 0(40) (1950) 102–35,. (Russian). Google Scholar

[8] 8. Hinton, D., Limit point criteria for differential equations, Can. J. Math. 24 (1972), 293–305. Google Scholar

[9] 9. Hinton, D., Limit point criteria for positive definite fourth-order differential operators, to appear. Google Scholar

[10] 10. Lidskii, V. B., On the number of solutions with integrable square of the system y” + Py= \y, Doklady Akad. Nauk. SSSR (N.S.) 95 (1954), 217–220. (Russian). Google Scholar

[11] 11. Naimark, M. A., Linear differential operators, Part I (Ungar, New York, 1967). Google Scholar

[12] 12. Walker, P., Asymptotica of the solutions to [﹛ry“)’ —py'Y + qy = ay, J. Differential Equations 9 (1971), 108–132. Google Scholar

[13] 13. Walker, P., Deficiency indices of fourth-order singular differential operators, J. Differential Equations 9 (1971), 133–140. Google Scholar

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