References
Apostol, T.: Generalized Dedekind sums and transformation formulae of certain Lambert series. Duke Math. J.17, 147–157 (1950)
Ash, A.: Parabolic cohomology of arithmetic subgroups ofSL(2, ℤ) with coefficients in the field of rational functions on the Riemann sphere. Am. J. Math.111, 35–51 (1989)
Choie, Y.: Rational period functions for the modular group and real quadratic fields. Ill. J. Math. to appear
Eichler, M.: Eine Verallgemeinerung der Abelschen Integrable. Math. Z.67, 267–298 (1957)
Hawkins, J.: On rational period functions for the modular group, handwritten manuscript
Knopp, M.I.: Some new results on the Eichler cohomology of automorphic forms. Bull. Am. Math. Soc.80, 607–632 (1974)
Knopp, M.I.: Rational period functions of the modular group. Duke Math. J.45, 47–62 (1978)
Knopp, M.I.: Rational period functions of the modular group. II. Glasgow Math. J.22, 185–197 (1981)
Kohnen, W., Zagier, D.: Modular forms with rational periods. In: Modular forms, Rankin, R.A. (ed.) 197–249. New York: Ellis Horwood 1984
Kramer, D.: On the values at integers of the Dedekind Zeta function of a real quadratic field. Trans. Am. Math. Soc.299, 59–79 (1987)
Parson, L.A., Rosen, K.: Automorphic integrals and rational period functions for the Hecke groups. Ill J. Math.28, 383–396 (1984)
Shimura, S.: Sur les intégrales attachées aux formes automorphes. J. Math. Soc. Japan11, 291–311 (1959)
Shintani, T.: On evaluation of zeta functions of totally real algebraic number fields on non-positive integers. J. Fac. Sci. Univ. Tokyo23, 393–417 (1976)
Zagier, D.: Zetafunktionen und Quadratische Körper. Berlin Heidelberg New York: Springer 1981
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Choie, Y., Parson, L.A. Rational period functions and indefinite binary quadratic forms. I. Math. Ann. 286, 697–707 (1990). https://doi.org/10.1007/BF01453597
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DOI: https://doi.org/10.1007/BF01453597