Dirac operations with strongly singular potentials

1. Evans, W.D.: On the unique self-adjoint extension of the Dirac operator and the existence of the Green matrix. Proc. London math. Soc. III. Ser.20 537–557 (1970)

   Google Scholar 

2. Glimm, J., Jaffe, A.: Singular perturbations of self-adjoint operators. Commun. pure appl. Math.22, 401–415 (1969)

   Google Scholar 

3. Kalf, H.: On the characterization of the Friedrichs extension of ordinary or elliptic differential operators with a strongly singular potential. J. functional Analysis10, 230–250 (1972)

   Google Scholar 

4. Kalf, H., Walter, J.: Strongly singular potentials and essential self-adjointness of singular elliptic operators inC ^∞₀ (ℝⁿ∖{0}). J. functional Analysis10, 114–130 (1972)

   Google Scholar 

5. Kalf, H., Schmincke, U.-W., Walter, J., Wüst, R.: On the spectral theory of Schrödinger and Dirac operators with strongly singular potentials. In: Proceedings of the symposion on spectral theory and differential equations, University of Dundee, July 1974. Lecture Notes in Mathematics448, pp. 182–226. Berlin-Heidelberg-New York: Springer 1975

   Google Scholar 

6. Kato, T.: Perturbation theory for linear operators. Berlin-Heidelberg-New York: Springer 1966

   Google Scholar 

7. Landau, L. D., Lifschitz, E. M.: Quantenmechanik, and: Relavistische Quantentheorie Berlin: Akademie-Verlag 1965 and 1970

   Google Scholar 

8. Reed, M., Simon, B.: Methods of modern mathematical physics, Vol. I and II New York: Academic Press 1972, and 1975

   Google Scholar 

9. Rellich, F.: Die zulässigen Randbedingungen bei den singulären Eigenwertproblemen der mathematischen Physik. Math. Z.49, 702–723 (1943/44)

   Google Scholar 

10. Rellich, F.: Halbbeschränkte gewöhnliche Differentialoperatoren zweiter Ordnung. Math. Ann.122, 343–368 (1951)

    Google Scholar 

11. Rellich, F.: Eigenwerttheorie partieller Differentialgleichungen II. Vorlesungsmanuskript; Göttingen 1953

12. Schmincke, U.-W.: Essential selfadjointness of Dirac operators with a strongly singular potential. Math. Z.126, 71–81 (1972)

    Google Scholar 

13. Schmincke U.-W.: Distinguished selfadjoint extensions of Dirac operators. Math. Z.129, 335–349 (1972)

    Google Scholar 

14. Schmincke, U.-W.: A spectral gap theorem for Dirac operators with central field. Math. Z.131, 351–356 (1973)

    Google Scholar 

15. Weidmann, J.: Oszillationsmethoden für Systeme gewöhnlicher Differentialgleichungen. Math. Z.119, 349–373 (1971)

    Google Scholar 

16. Wüst, R.: A convergence theorem for selfadjoint operators applicable to Dirac operators with cut-off potentials. Math. Z.131, 339–349 (1973)

    Google Scholar 

17. Wüst, R.: Distinguished sel-adjoint extensions of Dirac operators constructed by means of cut-off potentials. Math. Z.141, 93–98 (1975)

    Google Scholar 

18. Wüst, R.: Ausgezeichnete selbstadjungierte Fortsetzungen von Dirac-Operatoren mit stark singulärem Potential, konstruiert mit cut-off-Methoden und einem Spektrallückensatz. Habilitationsschrift. Technische Hochschule Aachen 1975

Download references