Abstract
An analogical proportion is a quaternary relation that is to be read “a is to b as c is to d”, verifying some symmetry and permutation properties. As can be seen, it involves a pair of pairs. Such a relation is at the basis of an approach to case-based reasoning called analogical extrapolation, which consists in retrieving three cases forming an analogical proportion with the target problem in the problem space and then in finding a solution to this problem by solving an analogical equation in the solution space. This paper studies how the notion of competence of pairs of source cases can be estimated and used in order to improve extrapolation. A preprocessing of the case base associates to each case pair a competence given by two scores: the support and the confidence of the case pair, computed on the basis of other case pairs forming an analogical proportion with it. An evaluation in a Boolean setting shows that using case pair competences improves significantly the result of the analogical extrapolation process.
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Notes
- 1.
D(0/1) indicates the disagreement between \({\mathtt{a}}\) and \({\mathtt{b}}\) (respectively between \({\mathtt{c}}\) and \({\mathtt{d}}\) and between \({\mathtt{a}}'\) and \({\mathtt{b}}'\)) when the former is equal to 0 and the latter is equal to 1. D(1/0) is the reverse disagreement.
- 2.
In Table 1, A(u, v, w) means that \({\mathtt{a}}={\mathtt{b}}=u\), \({\mathtt{c}}={\mathtt{d}}=v\) and \({\mathtt{a}}'={\mathtt{b}}'=w\).
- 3.
A generator \({\mathtt{CNF}}\), generating formulas in CNF (conjunctive normal form: conjunction of disjunctions of literals) could also have been considered. However, this does not add anything new since it is dual with the \({\mathtt{DNF}}\) generator for two reasons. First, the drawn inferences are code-independent, meaning that replacing the attributes by their negations does not change the result of the inference, in particular, for \({\mathtt{a}}, {\mathtt{b}}, {\mathtt{c}}, {\mathtt{d}}\in \mathbb {B}\), \({\mathtt{a}}{\mathtt{:}}\,{{\mathtt{b}}}{\mathtt{:\,\!:}}\,{{\mathtt{c}}{\mathtt{:}}\,{{\mathtt{d}}}}\) iff \(\lnot {\mathtt{a}}{\mathtt{:}}\,{\lnot {\mathtt{b}}}{\mathtt{:\,\!:}}\,{\lnot {\mathtt{c}}{\mathtt{:}}\,{\lnot {\mathtt{d}}}}\). Second, if \({\mathtt{f}}\) is obtained from the \({\mathtt{DNF}}\) generator then \(\lnot {\mathtt{f}}\) can be put easily in a function g written in CNF using De Morgan laws, and the distribution of g obtained this way would be the same as the distribution from a \({\mathtt{CNF}}\) generator with the same parameters.
- 4.
Reflexivity and symmetry are direct consequences of the postulates with the same names. By contrast, there exist analogical proportions for which transitivity does not hold [15].
References
Aamodt, A., Plaza, E.: Case-based reasoning: foundational issues, methodological variations, and system approaches. AI Commun. 7(1), 39–59 (1994)
Billingsley, R., Prade, H., Richard, G., Williams, M.-A.: Towards analogy-based decision - a proposal. In: Christiansen, H., Jaudoin, H., Chountas, P., Andreasen, T., Legind Larsen, H. (eds.) FQAS 2017. LNCS (LNAI), vol. 10333, pp. 28–35. Springer, Cham (2017). https://doi.org/10.1007/978-3-319-59692-1_3
Bounhas, M., Prade, H., Richard, G.: Analogical classification: a rule-based view. In: Laurent, A., Strauss, O., Bouchon-Meunier, B., Yager, R.R. (eds.) IPMU 2014. CCIS, vol. 443, pp. 485–495. Springer, Cham (2014). https://doi.org/10.1007/978-3-319-08855-6_49
Bounhas, M., Prade, H., Richard, G.: Analogy-based classifiers for nominal or numerical data. Int. J. Approx. Reason. 91, 36–55 (2017)
Correa, W.F., Prade, H., Richard, G.: Trying to understand how analogical classifiers work. In: Hüllermeier, E., Link, S., Fober, T., Seeger, B. (eds.) SUM 2012. LNCS (LNAI), vol. 7520, pp. 582–589. Springer, Heidelberg (2012). https://doi.org/10.1007/978-3-642-33362-0_46
Couceiro, M., Hug, N., Prade, H., Richard, G.: Analogy-preserving functions: a way to extend Boolean samples. In: Proceedings of the 26th International Joint Conference on Artificial Intelligence (IJCAI 2017), pp. 1575–1581. Morgan Kaufmann, Inc. (2017)
Craw, S., Wiratunga, N., Rowe, R.C.: Learning adaptation knowledge to improve case-based reasoning. Artif. Intell. 170(16–17), 1175–1192 (2006)
d’Aquin, M., Badra, F., Lafrogne, S., Lieber, J., Napoli, A., Szathmary, L.: Case base mining for adaptation knowledge acquisition. In Veloso, M.M. (ed.) Proceedings of the 20th International Joint Conference on Artificial Intelligence (IJCAI 2007), pp. 750–755. Morgan Kaufmann, Inc. (2007)
Dubois, D., Prade, H., Richard, G.: Multiple-valued extensions of analogical proportions. Fuzzy Sets Syst. 292, 193–202 (2016)
Gillard, T., Lieber, J., Nauer, E.: Improving adaptation knowledge discovery by exploiting negative cases: first experiment in a Boolean setting. In: Proceedings of ICCBR 2018–26th International Conference on Case-Based Reasoning, Stockholm, Sweden, July 2018
Hanney, K., Keane, M.T.: Learning adaptation rules from a case-base. In: Smith, I., Faltings, B. (eds.) EWCBR 1996. LNCS, vol. 1168, pp. 179–192. Springer, Heidelberg (1996). https://doi.org/10.1007/BFb0020610
Jalali, V., Leake, D., Forouzandehmehr, N.: Learning and applying adaptation rules for categorical features: an ensemble approach. AI Commun. 30(3–4), 193–205 (2017)
Jarmulak, J., Craw, S., Rowe, R.: Using case-base data to learn adaptation knowledge for design. In: Proceedings of the 17th International Joint Conference on Artificial Intelligence (IJCAI 2001), pp. 1011–1016. Morgan Kaufmann, Inc. (2001)
Kolodner, J.: Case-Based Reasoning. Morgan Kaufmann Inc., Burlington (1993)
Lepage, Y.: Proportional analogy in written language data. In: Gala, N., Rapp, R., Bel-Enguix, G. (eds.) Language Production, Cognition, and the Lexicon. TSLT, vol. 48, pp. 151–173. Springer, Cham (2015). https://doi.org/10.1007/978-3-319-08043-7_10
Lieber, J., Nauer, E., Prade, H., Richard, G.: Making the best of cases by approximation, interpolation and extrapolation. In: Cox, M.T., Funk, P., Begum, S. (eds.) ICCBR 2018. LNCS (LNAI), vol. 11156, pp. 580–596. Springer, Cham (2018). https://doi.org/10.1007/978-3-030-01081-2_38
Miclet, L., Prade, H.: Handling analogical proportions in classical logic and fuzzy logics settings. In: Sossai, C., Chemello, G. (eds.) ECSQARU 2009. LNCS (LNAI), vol. 5590, pp. 638–650. Springer, Heidelberg (2009). https://doi.org/10.1007/978-3-642-02906-6_55
Prade, H., Richard, G.: A discussion of analogical-proportion based inference. In Sánchez-Ruiz, A.A., Kofod-Petersen, A. (eds.) Proceedings of ICCBR 2017 Workshops (CAW, CBRDL, PO-CBR), Doctoral Consortium, and Competitions Co-located with the 25th International Conference on Case-Based Reasoning (ICCBR 2017), Trondheim, 26–28 June, vol. 2028 of CEUR Workshop Proceedings, pp. 73–82 (2017)
Prade, H., Richard, G.: Analogical proportions: from equality to inequality. Int. J. Approx. Reason. 101, 234–254 (2018)
Richter, M.M., Weber, R.O.: Case-Based Reasoning, A Textbook. Springer, Heidelberg (2013). https://doi.org/10.1007/978-3-642-40167-1
Riesbeck, C.K., Schank, R.C.: Inside Case-Based Reasoning. Lawrence Erlbaum Associates Inc., Hillsdale (1989). Available on line
Smyth, B., Keane, M.T.: Remembering to forget. In: Proceedings of the 14th International Joint Conference on Artificial Intelligence (IJCAI 1995), Montréal (1995)
Stroppa, N., Yvon, F.: Analogical learning and formal proportions: definitions and methodological issues. Technical Report D004, ENST-Paris (2005)
Zhu, J., Yang, Q.: Remembering to add: competence-preserving case-addition policies for case base maintenance. In: Proceedings of the 16th International Joint Conference on Artificial Intelligence (IJCAI 1999), pp. 234–241 (1999)
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Lieber, J., Nauer, E., Prade, H. (2019). Improving Analogical Extrapolation Using Case Pair Competence. In: Bach, K., Marling, C. (eds) Case-Based Reasoning Research and Development. ICCBR 2019. Lecture Notes in Computer Science(), vol 11680. Springer, Cham. https://doi.org/10.1007/978-3-030-29249-2_17
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