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A Theorem on Peratization of Singular Potentials and Other Miscellanea
1.G. Tiktopoulos and S. B. Treiman, Phys. Rev. 134, B844 (1964). Equation (4) of this paper is incorrect; however, the result, Eq. (5), does follow from the correct infinite series.
2.N. N. Khuri and A. Pais, Rev. Mod. Phys. 36, 590 (1964).
3.H. H. Aly, Riazuddin, and A. H. Zimerman, Phys. Rev. 136, B1174 (1964).
4.H. H. Aly, Riazuddin, and A. H. Zimerman, Nuovo Cimento 35, 324 (1964).
5.T. T. Wu, Phys. Rev. 136, B1176 (1964).
6.F. Calogero and M. Cassandro, Nuovo Cimento 37, 760 (1965).
7.F. Calogero, Phys. Rev. 139, B602 (1965). This paper gives further references to work dealing with singular potentials.
8.G. Feinberg and A. Pais, Phys. Rev. 131, 2724 (1963).
9.G. Feinberg and A. Pais, Phys. Rev. 133, B477 (1964).
10.It takes only a simple geometrical argument to prove that if G(x) is more singular at than H(x) then is more singular as than where there are no troubles at infinity.
11.G. N. Watson, Theory of Bessel Functions (Cambridge University Press, London, 1958), 2nd ed.
12.If in (a) then This case has been treated by H. Cornille, Nuovo Cimento 38, 1243 (1965);
12.H. Cornille, 39, 557 (1965); , Nuovo Cimento
12.H. Cornille, 43, 786 (1966). In these papers, Cornille investigates, in great depth, the validity of various limiting procedures., Nuovo Cimento
13.H. H. Aly, Riazuddin, and A. H. Zimerman, J. Math. Phys. 6, 1115 (1965).
14.The expression in Eq. (16) is lacking a term which is zero when and this gives the expression the wrong limit as According to a private communication from the authors of Ref. 6, this will be corrected in a future publication.
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