[1] E.W., ADAMS, A primer of probability logic, CSLI Publications, Stanford, 1998.

[2] E.W., ADAMS and H., Levine, On the uncertainties transmitted from premisses to conclusions in deductive inferences, Synthese, vol. 30 (1975), no. 3, pp. 429–460.Google Scholar

[3] D. J., ALDOUS, Representations for partially exchangeable arrays of random variables, Journal of Multivariate Analysis, vol. 11 (1981), no. 4, pp. 581–598.Google Scholar

[4] R. B., ASH, Probability and measure theory, 2nd ed., Academic Press, 1999.

[5] F. C., BENENSON, Probability, objectivity and evidence, Routledge & Kegan Paul, London, 1984.

[6] J., BERNOULLI, Ars conjectandi, opus posthumum. accedit tractatus de seriebus infinitis, et epistola gallicé scripta de ludo pilae reticularis, Thurneysen Brothers, Basel, 1713.

[7] P. P., BILLINGSLEY, Probability and measure, JohnWiley & Sons, New York, 1995.

[8] P. P., BILLINGSLEY, Convergence of probability measures, second ed., John Wiley & Sons, New York, 1999.

[9] R., CARNAP, On inductive logic, Philosophy of Science, vol. 12 (1945), no. 2, pp. 72–97.Google Scholar

[10] R., CARNAP, On the application of inductive logic, Philosophy and Phenomenology Research, vol. 8 (1947), pp. 133–147.Google Scholar

[11] R., CARNAP, Reply to Nelson Goodman, Philosophy and Phenomenology Research, vol. 8 (1947), pp. 461–462.Google Scholar

[12] R., CARNAP, Logical foundations of probability, University of Chicago Press, Chicago, Routledge & Kegan Paul, London, 1950.

[13] R., CARNAP, The continuum of inductive methods, University of Chicago Press, 1952.

[14] R., CARNAP, The aim of inductive logic, Logic, methodology and philosophy of science (E., Nagel, P., Suppes, and A., Tarski, editors), Stanford University Press, Stanford, California, 1962, pp. 303–318.

[15] R., CARNAP, Inductive logic and rational decisions, Studies in inductive logic and probability (R., Carnap and R. C., Jeffrey, editors), vol. I, University of California Press, 1971, pp. 5–31.

[16] R., CARNAP, A basic system of inductive logic, Studies in inductive logic and probability (R., Carnap and R. C., Jeffrey, editors), vol. I, University of California Press, 1971, pp. 33–165.

[17] R., CARNAP, A basic system of inductive logic, Studies in inductive logic and probability (R. C., Jeffrey, editor), vol. II, University of California Press, 1980, pp. 7–155.

[18] R., CARNAP and W., STEGMÜLLER, Induktive Logik und Wahrscheinlichkeit, Springer Verlag, Wien, 1959.

[19] G. DE, COOMAN, E., MIRANDA, and E., QUAEGHEBEUR, Representation insensitivity in immmediate prediction under exchangeability, International Journal of Approximate Reasoning, vol. 50 (2009), pp. 204–216.Google Scholar

[20] N. J., CUTLAND, Loeb measure theory, Developments in nonstandard mathematics (N. J., CUTLAND, F., OLIVEIRA, V., NEVES, and J., SOUSA-PINTO, editors), Pitman Research Notes in Mathematics Series, vol. 336, Longman Press, 1995, pp. 51–177.

[21] C., DIMITRACOPOULOS, J. B., PARIS, A., VENCOVSKÁ, and G.M., WILMERS, A multivariate probability distribution based on the propositional calculus, preprint 1999/6, Manchester Centre for PureMathematics, 1999, Available at http://www.maths.manchester.ac.uk/~jeff/.

[22] J., EARMAN, Bayes or bust?, MIT Press, 1992.

[23] H. B., ENDERTON, A mathematical introduction to logic, second ed., Harcourt/Academic Press, Burlington, MA, 2001.

[24] R., FESTA, Analogy and exchangeability in predictive inferences, Erkenntnis, vol. 45 (1996), pp. 229–252.Google Scholar

[25] B. DE, FINETTI, Sul significato soggettivo della probabilità, Fundamenta Mathematicae, vol. 17 (1931), pp. 298–329.Google Scholar

[26] B. DE, FINETTI, Theory of probability, vol. 1, Wiley, New York, 1974.

[27] B., FITELSON, Inductive logic, The philosophy of science (S., Sarkar and J., Pfeifer, editors), vol. I, Routledge, New York and Abingdon, 2006, pp. 384–394. Available at http://fitelson.org/il.pdf.

[28] P., FORREST, The identity of indiscernibles, The Stanford Encyclopedia of Philosophy (E., Zalta, editor), fall 2008 ed., 2008, http://plato.stanford.edu/archives/fall2008/entries/identity-indiscernible/.

[29] D., GABBAY, S., HARTMANN, and A., WOODS (editors), Inductive logic, Handbook of the History of Logic, vol. 10, Elsevier, 2010.

[30] H., GAIFMAN, Concerning measures on first order calculi, Israel Journal of Mathematics, vol. 2 (1964), pp. 1–18.

[31] H., GAIFMAN, Applications of de Finetti's theorem to inductive logic, Studies in inductive logic and probability (R., Carnap and R. C., Jeffrey, editors), vol. I, University of California Press, 1971, pp. 235–251.

[32] H., GAIFMAN and M., SNIR, Probabilities over rich languages, The Journal of Symbolic Logic, vol. 47 (1982), pp. 495–548.Google Scholar

[33] D., GILLIES, Philosophical theories of probability, Routledge, London, 2000.

[34] I. J., GOOD, Explicativity, corroboration, and the relative odds of hypotheses, Synthese, vol. 30 (1975), pp. 39–73.Google Scholar

[35] N., GOODMAN, A query on confirmation, Journal of Philosophy, vol. 43 (1946), pp. 383–385.Google Scholar

[36] N., GOODMAN, On infirmities in confirmation-theory, Philosophy and Phenomenological Research, vol. 8 (1947), pp. 149–151.

[37] I., HACKING, An introduction to probability and inductive logic, Cambridge University Press, Cambridge, 2001.

[38] A., HAJEK and N., HALL, Induction and probability, The Blackwell guide to the philosophy of science (P., Machamer and R., Silberstein, editors), Blackwell, 2002, pp. 149–172.

[39] G. H., HARDY, J. E., LITTLEWOOD, and G., PÓLYA, Inequalities, Cambridge University Press, 1967.

[40] J., HAWTHORNE, Inductive logic, The Stanford Encyclopedia of Philosophy (E., Zalta, editor), spring 2014 ed., 2014, http://plato.stanford.edu/archives/spr2014/entries/logic-inductive/.

[41] M. B., HESSE, The structure of scientific inference, University of California Press, 1974.

[42] A., HILL and J. B., PARIS, An analogy principle in inductive logic, Annals of Pure and Applied Logic, vol. 164 (2013), pp. 1293–1321.Google Scholar

[43] A., HILL, The counterpart principle of analogical support by similarity, Erkenntnis, (2013), Online First Article.

[44] M. J., HILL, J. B., PARIS, and G. M., WILMERS, Some observations on induction in predicate probabilistic reasoning, Journal of Philosophical Logic, vol. 31 (2002), pp. 43–75.Google Scholar

[45] R., HILPINEN, On inductive generalization in monadic first order logic with identity, Studies in Logic and the Foundations of Mathematics, vol. 43 (1966), pp. 133–154.Google Scholar

[46] R., HILPINEN, Relational hypotheses and inductive inference, Synthese, vol. 23 (1971), pp. 266–286.Google Scholar

[47] J., HINTIKKA, On a combined system of inductive logic, Studia Logico-Mathematica et Philosophica in Honorem Rolf Nevalinna, Acta Philosophica Fennica, vol. 18 (1965), pp. 21–30.Google Scholar

[48] J., HINTIKKA, Towards a theory of inductive generalization, Logic, methodology and philosophy of science, proceedings of the 1964 international congress (Y., Bar-Hillel, editor), Studies in Logic and the Foundations of Mathematics, North-Holland, Amsterdam, 1965, pp. 274–288.

[49] J., HINTIKKA, Atwo dimensional continuum of inductive methods, Aspects of inductive logic (J., Hintikka and P., Suppes, editors), North Holland, Amsterdam, 1966, pp. 113–132.

[50] J., HINTIKKA and I., NIINILUOTO, An axiomatic foundation of the logic of inductive generalization, Formal methods in the methodology of the empirical sciences (M., Przelecki, K., Szaniawski, and R., Wójcicki, editors), Synthese Library, vol. 103, Kluwer, Dordrecht, 1976, pp. 57–81.

[51] J., HINTIKKA, An axiomatic foundation for the logic of inductive generalization, Studies in inductive logic and probability (R. C., Jeffrey, editor), vol. II, University of California Press, 1980, pp. 157–192.

[52] D. N., HOOVER, Relations on probability spaces and arrays of random variables, Preprint, Institute of Advanced Study, Princeton, 1979.

[53] E., HOWARTH and J. P., Paris, The theory of spectrum exchangeability, Review of Symbolic Logic, to appear.

[54] J., HUMBURG, The principle of instantial relevance, Studies in inductive logic and probability (R., Carnap and R. C., Jeffrey, editors), vol. I, University of California Press, Berkeley and Los Angeles, 1971, pp. 225–233.

[55] V. S., Huzurbazar, On the certainty of an inductive inference, Proceedings of the Cambridge Philosophical Society, vol. 51 (1955), pp. 761–762.Google Scholar

[56] E. T., JAYNES, The well-posed problem, Foundations of Physics, vol. 3 (1973), pp. 477–492.Google Scholar

[57] R. C., JEFFREY, Carnap's inductive logic, Synthese, vol. 25 (1973), no. 3–4, pp. 299–306.Google Scholar

[58] W. E., JOHNSON, Probability: The deductive and inductive problems, Mind, vol. 41 (1932), pp. 4099–423.Google Scholar

[59] J., JOYCE, Accuracy and coherence: Prospects for an alethic epistemology of partial belief, Degrees of belief (F., Huber and C., Schmidt-Petri, editors), Springer, 2009, pp. 263–300.Google Scholar

[60] O., KALLENBERG, Probabilistic symmetries and invariance principles, Springer, 2005.

[61] J. G., KEMENY, Extension of methods of inductive logic, Philosophical Studies, vol. 3 (1952), no. 3, pp. 38–42.Google Scholar

[62] J. G., KEMENY, A contribution to inductive logic, Philosophy and Phenomenological Research, vol. 13 (1953), no. 3, pp. 371–374.

[63] J. G., KEMENY, Fair bets and inductive probabilities, The Journal of Symbolic Logic, vol. 20 (1955), pp. 263–273.Google Scholar

[64] J. G., KEMENY, Carnap's theory of probability and induction, The philosophy of Rudolf Carnap (P. A., Schilpp, editor), La Salle, Illinois, Open Court, 1963, pp. 711–738.

[65] J. M., KEYNES, A treatise on probability, Macmillan & Co, 1921.

[66] J. F. C., KINGMAN, The representation of partition structures, Journal of the London Mathematical Society, vol. 18 (1978), pp. 374–380.Google Scholar

[67]J. F. C., KINGMAN, The mathematics of genetic diversity, SIAM, Philadelphia, 1980.

[68] M., KLIEß and J. B., Paris, Predicate exchangeability and language invariance in pure inductive logic, Logique et Analyse, Proceedings of the 1st Reasoning Club Meeting University Foundation, Brussels. (J. P. van, Bendegem and J., Murzi, editors), 2012, to appear.

[69] P. H., KRAUSS, Representation of symmetric probability models, The Journal of Symbolic Logic, vol. 34 (1969), no. 2, pp. 183–193.Google Scholar

[70] J. L., KRIVINE, Anneaux préordonnés, Journal d'Analyse Mathematique, vol. 12 (1964), pp. 307–326.Google Scholar

[71] T. A. F., KUIPERS, On the generalization of the continuum of inductive methods to universal hypotheses, Synthese, vol. 37 (1978), no. 3, pp. 255–284.Google Scholar

[72] T. A. F., KUIPERS, Studies in inductive probability and rational expectation, D. Reidel, Dordrecht, 1978.

[73] T. A. F., KUIPERS, A survey of inductive systems, Studies in inductive logic and probability (R. C., Jeffrey, editor), vol. II, University of California Press, 1980, pp. 183–192.

[74] J., LANDES, The principle of spectrum exchangeability within inductive logic, Ph. D.thesis, The University of Manchester, 2009, Available at http://www.maths.manchester.ac.uk/~jeff/.

[75] J., LANDES, J. B., PARIS, and A., VENCOVSKÁ, Some aspects of polyadic inductive logic, Studia Logica, vol. 90 (2008), pp. 3–16.

[76] J., LANDES, Instantial relevance in polyadic inductive logic, Proceedings of the 3rd India Logic Conference, ICLA 2009 (R., Ramanujam and Sundar, Sarukkai, editors), Lecture Notes in Artificial Intelligence, vol. 5378, Springer, 2009, pp. 162–169.

[77] J., LANDES, Representation theorems for probability functions satisfying spectrum exchangeability in inductive logic, International Journal of Approximate Reasoning, vol. 51 (2009), no. 1, pp. 35–55.Google Scholar

[78] J., LANDES, A characterization of the language invariant families satisfying spectrum exchangeability in polyadic inductive logic, Annals of Pure and Applied Logic, vol. 161 (2010), pp. 800–811.Google Scholar

[79] J., LANDES, Survey of some recent results on spectrum exchangeability in polyadic inductive logic, Synthese, vol. 181 (2011), no. 1, pp. 19–47.Google Scholar

[80] M., LANGE, Hume and the problem of induction, Inductive logic (D., Gabbay, S., Hartmann, and A., Woods, editors), Handbook of the History of Logic, vol. 10, Elsevier, 2011, pp. 43–91.

[81] R. S., LEHMAN, On confirmation and rational betting, The Journal of Symbolic Logic, vol. 20 (1955), pp. 251–262.Google Scholar

[82] H., LEITGEB and R., PETTIGREW, An objective justification of Bayesianism I: Measuring inaccuracy, Philosophy of Science, vol. 77 (2010), pp. 201–235.

[83] H., LEITGEB, An objective justification of Bayesianism II: The consequences of minimizing inaccuracy, Philosophy of Science, vol. 77 (2010), pp. 236–272.Google Scholar

[84] D., LEWIS, A subjectivist's guide to objective chance, Studies in inductive logic and probability (R. C., Jeffrey, editor), vol. II, University of California Press, 1980, pp. 263–293.

[85] P., LOEB, Conversion from nonstandard to standard measure spaces and applications to probability, Transactions of the American Mathematical Society, vol. 211 (1975), pp. 113–122.Google Scholar

[86] L. E., LOEMKER, G. W. Leibniz: Philosophical papers and letters, D. Reidel, Dordrecht, 1969.

[87] P., MAHER, Probabilities for multiple properties: The models of Hesse, Carnap and Kemeny, Erkenntnis, vol. 55 (2001), pp. 183–216.Google Scholar

[88] P., MAHER, A conception of inductive logic, Philosophy of Science, vol. 73 (2006), pp. 513–520.Google Scholar

[89] M. C., DI MAIO, Predictive probability and analogy by similarity, Erkenntnis, vol. 43 (1995), no. 3, pp. 369–394.Google Scholar

[90] M., MARSHALL, Positive polynomials and sums of squares, Mathematical Surveys and Monographs, vol. 146, American Mathematical Society, 2008.

[91] E., MENDELSON, Introduction to mathematical logic, 4th ed., Chapman & Hall, London–New York, 1997.

[92] I., NIINILUOTO, On a K-dimensional system of inductive logic, Proceedings of the biennial meeting of the philosophy of science association, vol. 1976, Volume Two: Symposia and invited papers, University of Chicago Press, 1976, pp. 425–447.

[93] I., NIINILUOTO, The development of the Hintikka program, Inductive logic (D., Gabbay, S., Hartmann, and A., Woods, editors), Handbook of the History of Logic, vol. 10, Elsevier, 2011, pp. 311–356.

[94] C. J., NIX, Probabilistic induction in the predicate calculus, Ph.D. thesis, University of Manchester, 2005, Available at http://www.maths.manchester.ac.uk/~jeff/.

[95] C. J., NIX and J. B., PARIS, A continuum of inductive methods arising from a generalized principle of instantial relevance, Journal of Philosophical Logic, vol. 35 (2006), no. 1, pp. 83–115.Google Scholar

[96] C. J., NIX, A note on binary inductive logic, Journal of Philosophical Logic, vol. 36 (2007), no. 6, pp. 735–771.Google Scholar

[97] J. B., PARIS, The uncertain reasoner's companion, Cambridge University Press, 1994.

[98] J. B., PARIS, Common sense and maximum entropy, Synthese, vol. 117 (1999), pp. 75–93.Google Scholar

[99] J. B., PARIS, On the distribution of probability functions in the natural world, Probability theory: Philosophy, recent history and relations to science (V. F., Hendricks, S. A., Pedersen, and K. F., Jogensen, editors), Synthese Library, vol. 297, Kluwer, Dordrecht, 2001, pp. 125–145.

[100] J. B., PARIS, Pure inductive logic, The continuum companion to philosophical logic (L., Horsten and R., Pettigrew, editors), Continuum International Publishing Group, London, 2011, pp. 428–449.

[101] J. B., PARIS, An observation on Carnap's continuum and stochastic independencies, Journal of Applied Logic, vol. 11 (2013), no. 4, pp. 421–429.Google Scholar

[102] J. B., PARIS, A note on *-conditioning, see http://www.maths.manchester.ac.uk/~jeff/.

[103] J. B., PARIS, A note on Gaifman's condition, see http://www.maths.manchester.ac.uk/~jeff/.

[104] J. B., PARIS and A., VENCOVSKÁ, On the applicability of maximum entropy to inexact reasoning, International Journal of Approximate Reasoning, vol. 3 (1989), no. 1, pp. 1–34.Google Scholar

[105] J. B., PARIS, A note on the inevitability of maximum entropy, International Journal of Approximate Reasoning, vol. 4 (1990), no. 3, pp. 183–224.Google Scholar

[106] J. B., PARIS, In defense of the maximum entropy inference process, International Journal of Approximate Reasoning, vol. 17 (1997), no. 1, pp. 77–103.Google Scholar

[107] J. B., PARIS, Common sense and stochastic independence, Foundations of Bayesianism (D., Corfield and J., Williamson, editors), Kluwer Academic Press, 2001, pp. 203–240.

[108] J. B., PARIS, A general representation theorem for probability functions satisfying spectrum exchangeability, Computability in Europe, CiE 2009 (K., Ambros-Spies, B., Löwe, and W., Merkle, editors), Lecture Notes in Computer Science, vol. 5635, Springer, 2009, pp. 379–388.

[109] J. B., PARIS, A generalization of Muirhead's inequality, Journal of Mathematical Inequalities, vol. 3 (2009), no. 2, pp. 181–187.Google Scholar

[110] J. B., PARIS, From unary to binary inductive logic, Games, norms and reasons – logic at the crossroads (J., van Bentham, A., Gupta, and E., Pacuit, editors), Synthese Library, vol. 353, Springer, 2011, pp. 199–212.

[111] J. B., PARIS, A note on irrelevance in inductive logic, Journal of Philosophical Logic, vol. 40 (2011), no. 3, pp. 357–370.Google Scholar

[112] J. B., PARIS, Symmetry's end?, Erkenntnis, vol. 74 (2011), no. 1, pp. 53–67.Google Scholar

[113] J. B., PARIS, Postscript to ‘Symmetry's end?’, available at http://www.maths.manchester.ac.uk/~jeff/papers/jp90605.pdf.

[114] J. B., PARIS, Symmetry principles in polyadic inductive logic, Journal of Logic, Language and Information, vol. 21 (2012), pp. 189–216.Google Scholar

[115] J. B., PARIS, The twin continua of inductive methods, Logic without borders (Å., Hirvonen, J., Kontinen, R., Kossak, and A., Villaveces, editors), Ontos Mathematical Logic, vol. 5, de Gruyter, 2014, to appear.

[116] J. B., PARIS, A., VENCOVSKÁ, and G. M., Wilmers, A natural prior probability distribution derived from the propositional calculus, Annals of Pure and Applied Logic, vol. 70 (1994), no. 3, pp. 243–285.Google Scholar

[117] J. B., PARIS and P., WATERHOUSE, Atom exchangeability and instantial relevance, Journal of Philosophical Logic, vol. 38 (2009), no. 3, pp. 313–332.Google Scholar

[118] J. B., PARIS, P. N., WATTON, and G. M., WILMERS, On the structure of probability functions in the natural world, International Journal of Uncertainty, Fuzziness and Knowledge-Based Systems, vol. 8 (2000), no. 3, pp. 311–329.Google Scholar

[119] R., PETTIGREW, Epistemic utility arguments for probabilism, The Stanford Encyclopedia of Philosophy (E., Zalta, editor), winter 2011 ed., 2011, http://plato.stanford.edu/archives/win2011/entries/epistemic-utility/.

[120] G., POLYA, Induction and analogy in mathematics, volume I of mathematics and plausible reasoning, Geoffrey Cumberlege, Oxford University Press, 1954.

[121] G., POLYA, Patterns of plausible inference, volume II of mathematics and plausible reasoning, Geoffrey Cumberlege, Oxford University Press, 1954.

[122] F. P., RAMSEY, The foundations of mathematics and other logical essays, Routledge & Kegan Paul, London, 1931.

[123] J. W., ROMEIJN, Analogical predictions for explicit simmilarity, Erkenntnis, vol. 64 (2006), no. 2, pp. 253–280.

[124] T., RONEL, Ph. D.thesis, The University of Manchester, to appear.

[125] T., RONEL and A., VENCOVSKÁ, Invariance principles in polyadic inductive logic, Logique et Analyse, Proceedings of the 1st Reasoning Club Meeting (J. P., van Bendegem and J., Murzi, editors), University Foundation, Brussels, 2012, to appear.

[126] H. L., ROYDEN, Real analysis, second ed., The Macmillan Company, 1963.

[127] W. C., SALMON, The foundations of scientific inference, University of Pittsburgh Press, 1967.

[128] L. J., SAVAGE, The foundations of statistics, Wiley, NewYork, 1954.

[129] M., SCHERVISH, Theory of statistics, Springer-Verlag, 1995.

[130] P. A., SCHILPP (editor), The philosophy of Rudolf Carnap, Open Court Publishing Company, La Salle, Illinois, 1963.

[131] R., SCHWARTZ, The demise of syntactic and semantic models, Inductive logic (D., Gabbay, S., Hartmann, and A., Woods, editors), Handbook of the History of Logic, vol. 10, Elsevier, 2011, pp. 391–414.

[132] D., SCOTT and P., KRAUSS, Assigning probabilities to logical formulas, Aspects of inductive logic (J., Hintikka and P., Suppes, editors), North Holland, Amsterdam, 1966, pp. 219–259.

[133] A., SHIMONY, Coherence and the axioms of confirmation, The Journal of Symbolic Logic, vol. 20 (1955), no. 1–28.Google Scholar

[134] J. E., SHORE and R. W., JOHNSON, Axiomatic derivation of the principle of maximum entropy and the principle of minimum cross-entropy, IEEE Transactions on Information Theory, vol. IT-26 (1980), pp. 26–37.Google Scholar

[135] B., SKYRMS, Choice and chance: An introduction to inductive logic, 3rd ed., Wadsworth, Belmont, CA, 1986.

[136] B., SKYRMS, Analogy by similarity in hyper-Carnapian inductive logic, Philosophical problems of the internal and external worlds (J., Earman, A.I., Janis, G., Massey, and N., Rescher, editors), University of Pittsburgh Press, 1993, pp. 273–282.

[137] D., STALKER (editor), Grue! The new riddle of induction, Open Court, 1994.

[138] P., SUPPES, Probabilistic inference and the concept of total evidence, Aspects of inductive logic (J., Hintikka and P., Suppes, editors), North-Holland, Amsterdam, 1966, pp. 49–65.

[139] P., TELLER, Conditionalization, observation and change of preference, Foundations of probability theory, statistical inference and statistical theories of science (W., Harpers and C. A., Hooker, editors), D. Reidel, Dordrecht, 1976, pp. 205–253.

[140] B. C., VAN FRAASSEN, Laws and symmetry, Oxford University Press, Oxford, 1989.

[141] A., VENCOVSKÁ, Binary induction and Carnap's continuum, Proceedings of the 7th workshop on uncertainty processing (WUPES), Mikulov, Czech Republic, 2006, Available at http://www.utia.cas.cz/files/mtr/articles/data/vencovska.pdf.

[142] J., VICKERS, The problem of induction, The Stanford Encyclopedia of Philosophy (E., Zalta, editor), fall 2011 ed., 2011, http://plato.stanford.edu/archives/fall2011/entries/induction-problem/.

[143] G. H., VON Wright, The logical problem of induction, 2nd ed., Blackwell, Oxford, 1957.

[144] P. J., WATERHOUSE, Probabilistic relationships, relevance and irrelevance within the field of uncertain reasoning, Ph. D. thesis, The University of Manchester, 2007, Available at http://www.maths.manchester.ac.uk/~jeff/theses/pwthesis.pdf.

[145] J., WILLIAMSON, In defence of objective Bayesianism, Oxford University Press, 2010.

[146] S. L., ZABELL, W. E. Johnson's “sufficientness” postulate, Annals of Statistics, vol. 10 (1982), pp. 1091–1099.

[147] S. L., ZABELL, Predicting the unpredictable, vol. 90 (1992), pp. 205–232.

[148] S. L., ZABELL, Symmetry and its discontents, Cambridge University Press, New York, 2005.

[149] S. L., ZABELL, Carnap and the logic of induction, Inductive logic (D., Gabbay, S., Hartmann, and A., Woods, editors), Handbook of the History of Logic, vol. 10, Elsevier, 2010, pp. 265–310.