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References
K. B. ATHREYA, D. McDONALD & P. E. NEY (1978): Coupling and the renewal theorem. Amer. Math. Monthly 85, 809–814.
V. E. BENEŠ(1961): Extensions of Wiener's Tauberian theorem for positive measures. J. Math. Anal. Appl. 2, 1–20.
H. C. P. BERBEE (1979): Random walks with stationary increments and renewal theory. Math. Centrum, Amsterdam.
_____ (1987): Convergence rates in the strong law for bounded mixing sequences. Prob. Th. Rel. Fields 74, 255–270.
N. H. BINGHAM (1972a): Tauberian theorems for integral transforms of Hankel type. J. London Math. Soc. (2) 5, 493–503.
_____ (1972b): Random walk on spheres. Z. Wahrschein. 22, 169–192.
_____ (1981): Tauberian theorems and the central limit theorem. Ann. Probab. 9, 221–231.
_____ (1984a): On Euler and Borel summability. J. London Math. Soc. (2) 29, 141–146.
_____ (1984b): On Valiron and circle convergence. Math. Z. 186, 273–286.
_____ (1984c): Tauberian theorems for summability methods of random-walk type. J. London Math. Soc. (2) 30, 281–287.
_____ (1984d): On a theorem of Kłosowska about generalised convolutions. Colloq. Math. 48, 117–125.
_____ (1985): On Tauberian theorems in probability theory. Nieuw Arch. Wiskunde (4) 3, 157–166.
_____ (1988): On the limit of a supercritical branching process. J. Appl. Probab. 25A.
_____ & C. M. GOLDIE (1982): Probabilistic and deterministic averaging. Trans. Amer. Math. Soc. 269, 453–480.
_____ (1983): On one-sided Tauberian conditions. Analysis 3, 159–188.
_____ (1988): Riesz means and self-neglecting functions. Math. Z.
_____ & J. L. TEUGELS (1987): Regular variation. Cambridge Univ. Press.
_____ & J. HAWKES (1983): Some limit theorems for occupation times. London Math. Soc. Lecture Notes 79, 46–62.
_____ & G. TENENBAUM (1986): Riesz and Valiron means and fractional moments. Math. Proc. Cambridge Phil. Soc. 99, 143–149.
_____ & J. L. TEUGELS (1975): Duality for regularly varying functions. Quart. J. Math. (3) 26, 333–353.
D. BLACKWELL (1953): Extension of a renewal theorem. Pacific J. Math. 3, 315–320.
S. BOCHNER (1954): Positive zonal functions on spheres. Proc. Nat. Acad. Sci. 40, 1141–1147.
_____ (1955): Sturm-Liouville and heat equations whose eigenvalues are ultraspherical polynomials and associated Bessel functions. Proc. Conf. Differential Equations 23–48, Univ. Maryland Press.
_____ & K. CHANDRASEKHARAN (1949): Fourier transforms. Princeton Univ. Press.
N. G. de BRUIJN (1959): Pairs of slowly oscillating functions occurring in asymptotic problems concerning the Laplace transform. Nieuw Arch. Wiskunde (3) 7, 20–26.
A. BRUNEL & D. REVUZ (1975): Sur la théorie de renouvellement pour les groupes non abéliens. Israel J. Math. 20, 46–56.
Y.-S. CHOW (1973): Delayed sums and Borel summability of independent identically distributed random variables. Bull. Inst. Math. Acad. Sinica 1, 207–220.
K. L. CHUNG (1952): On the renewal theorem in higher dimensions. Skand. Akt. 35, 188–194.
P. CREPEL & J. LACROIX (1976): Théorème de renouvellement pour les marches aléatoires sur les groupes localement compacts. Lecture Notes in Math. 563, 27–42, Springer.
D. A. DARLING & M. KAC (1957): On occupation times of Markov processes. Trans. Amer. Math. Soc. 84, 444–458.
Yu. A. DAVYDOV (1973): Limit theorems for functionals of processes with independent increments. Th. Probab. Appl. 18, 431–441.
_____ (1974): Sur une classe des fonctionelles des processus stables et des marches aléatoires. Ann. Inst. H. Poincaré (B) 10, 1–29.
_____ & I. A. IBRAGIMOV (1971): On asymptotic behaviour of some functionals of processes with independent increments. Th. Probab. Appl. 16, 162–167.
Y. DÉNIEL & Y. DERRIENNIC (1988+): Sur la convergence presque sure, au sens de Cesà ro d'ordre α, 0 < α <1, des variables indépendantes et identiquement distribueées. Ann. Probab.
Y. DERRIENNIC & Y. GUIVARC'H (1973): Théorème de renouvellement pour les groupes non moyennables. Comptes Rendus 277A, 613–615.
P. DIACONIS & C. STEIN (1978): Some Tauberian theorems related to coin tossing. Ann. Probab. 6, 483–490.
R. A. DONEY (1966): An analogue of the renewal theorem in higher dimensions. Proc. London Math. Soc. (3) 16, 669–684.
R. E. EDWARDS (1958): Comments on Wiener's Tauberian theorems. J. London Math. Soc. 33, 462–468.
L. ELIE (1982): Comportement asymptotique du noyau potentiel sur les groupes de Lie. Ann. Sci. École Norm. Sup. (4) 15, 257–364.
H. G. FEICHTINGER (1981): On a new Segal algebra. Monatsh. Math. 92, 269–289.
_____ & H. J. SCHMEISSER (1986): Weighted versions of Beurling's Tauberian theorem. Math. Ann. 275, 353–363.
W. FELLER (1957): An introduction to probability theory and its applications. Vol. 1, 2nd ed., Wiley.
_____ (1971): An introduction to probability theory and its applications. Vol. 2, 2nd ed., Wiley.
J. J. F. FOURNIER & J. STEWART (1985): Amalgams of LP and ℓq. Bull. Amer. Math. Soc. 13, 1–21.
R. R. GOLDBERG (1967): On a space of functions of Wiener. Duke Math. J. 34, 683–691.
Y. GUIVARC'H, M. KEANE & B. ROYNETTE (1977): Marches aléatoires sur les groupes de Lie. Lecture Notes in Math. 624, Springer.
G. H. HARDY (1949): Divergent series. Oxford Univ. Press.
T. E. HARRIS (1948): Branching processes. Ann. Math. Statist. 41, 474–494.
S. HELGASON (1962): Differential geometry and symmetric spaces. Academic Press.
H. HEYER (1984): Probability theory on hypergroups: a survey. Lecture Notes in Math. 1064, 481–550, Springer (Prob. Groups VII).
G. HÖGNÄS & A. MUKHERJEA (1984): On the limit of the average of values of a function at random points. Lecture Notes in Math. 1064, 204–218, Springer (Prob. Groups VII).
J. KARAMATA (1937): Sur les théorèmes inverses des procedes de sommabilité. Act. Sci. Indust. 450, Hermann, Paris.
_____ (1938): Allgemeine Umkehrsatz der Limitierungsverfahren. Abh. Math. Sem. Hansischen Univ. 12, 48–63.
S. KARLIN (1955): On the renewal equation. Pacific J. Math. 5, 229–257.
Y. KASAHARA (1978): Tauberian theorems of exponential type. J. Math. Kyoto Univ. 18, 209–219.
H. KESTEN (1968): A Tauberian theorem for random walk. Israel J. Math. 6, 278–294.
_____ (1973): Random difference equations and renewal theory for products of random matrices. Acta Math. 131, 207–248.
_____ (1974): Renewal theory for functionals of a Markov chain with general state space. Ann. Probab. 2, 355–386.
J. F. C. KINGMAN (1963): Random walks with spherical symmetry. Acta Math. 109, 11–53.
J. KNOPFMACHER & W. SCHWARZ (1981a,b): Binomial expected values of arithmetic functions. I: J. reine ang. Math. 328, 84–98. II: Coll. Math. Soc. J. Bolyai 34, 863–905 (Topics in classical number theory).
H. LEPTIN (1984): The structure of L1(G) for locally compact groups. Monogr. Stud. Math. 18, 48–61, Pitman.
_____ & D. POGUNTKE (1979): Symmetry and non-symmetry for locally compact groups. J. Functional Analysis 33, 119–134.
T. LINDVALL (1977): A probabilistic proof of Blackwell's renewal theorem. Ann. Probab. 5, 482–485.
_____ (1986): On coupling of renewal processes with use of failure rates. Stoch. Proc. Appl. 22, 1–15.
T. S. LIU, A. van ROOIJ & J.-K. WANG (1974): On some group algebra modules related to Wiener's algebra M1. Pacific J. Math. 55, 507–520.
I. MEILIJSON (1973): The average of the values of a function at random points. Israel J. Math. 15, 193–203.
W. MEYER-KÖNIG (1949): Untersuchungen über einige verwandte Limitierungsverfahren. Math. Z. 52, 257–304.
T. T. MOH (1972): On a general Tauberian theorem. Proc. Amer. Math. Soc. 36, 167–172.
A. V. NAGAEV (1979): Renewal theorems in ℙd. Th. Probab. Appl. 24, 572–581.
G. E. PETERSON (1972): Tauberian theorems for integrals II. J. London Math. Soc. (2) 5, 182–190.
S. C. PORT & C. J. STONE (1969): Potential theory of random walks on abelian groups. Acta Math. 122, 19–114.
H. REITER (1968): Classical harmonic analysis and locally compact groups. Oxford Univ. Press.
_____ (1971): L1-algebras and Segal algebras. Lecture Notes in Math. 231, Springer.
_____ (1974): Über den Satz von Wiener auf lokalkompakte Gruppen. Comm. Math. Helvet. 49, 333–364.
D. REVUZ (1975): Markov chains. North Holland (2nd ed. 1984).
W. RUDIN (1963): Fourier analysis on groups. Wiley.
W. L. SMITH (1954): Asymptotic renewal theorems. Proc. Roy. Soc. Edinburgh A 64, 9–48.
_____ (1955): Renewal theory and its ramifications. J. Roy. Statist. Soc. B 20, 243–302.
F. SPITZER (1956): A combinatorial lemma and its application to probability theory. Trans. Amer. Math. Soc. 82, 323–339.
A. J. STAM (1968): Laws of large numbers for functions of random walks with positive drift. Comp. Math. 19, 299–333.
_____ (1969): Renewal theory in r dimensions, I. Comp. Math. 21, 383–399.
_____ (1971): Renewal theory in r dimensions, II. Comp. Math. 23, 1–13.
J. M. STEELE (1988+): Probabilistic and worst-case analysis of classical problems of combinatorial optimisation in Euclidean space. Math. Oper. Res.
_____, L. A. SHEPP & W. F. EDDY (1987): On the number of leaves of a Euclidean minimal spanning tree. J. Appl. Probab. 24, 809–826.
C. SUNYACH (1981): Capacité et théorie du renouvellement. Bull. Soc. Math. France 109, 283–296.
G. TENENBAUM (1980): Sur le procédé de sommation de Borelet la répartition du nombre des facteurs premiers des entiers. Enseign, Math. 26, 225–245.
K. URBANIK (1964): Generalised convolution algebras. Studia Math. 23, 217–245.
_____ (1986). Generalised convolution algebras IV. Studia Math. 83, 57–95.
D. V. WIDDER (1941): The Laplace transform. Princeton Univ. Press.
N. WIENER (1932): Tauberian theorems. Ann. Math. 33, 1–100.
_____ (1933): The Fourier integral and certain of its applications. Cambridge Univ. Press.
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Bingham, N.H. (1989). Tauberian theorems in probability theory. In: Heyer, H. (eds) Probability Measures on Groups IX. Lecture Notes in Mathematics, vol 1379. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0087841
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