TY - GEN
T1 - A new interestingness measure for associative rules based on the geometric context
AU - Jalalvand, Azarakhsh
AU - Minaei, Behrouz
AU - Atabaki, Golnaz
AU - Jalalvand, Shahab
PY - 2008
Y1 - 2008
N2 - Associative classification has arrested attention in recent years and made significant improvement in related applications. This paper introduces the concept of a new interestingness measure and examines its utility in some application domains. Many interestingness measures have been presented before with different qualities, which make them useful for some applications. Some of these measures, such as support and Interest, do not concentrate on all properties of an association rule. Besides, some of them, such as J-Measure and Mutual Information, have complex computes. We present a new geometric measure which uses all basic terms of a contingency table values P(A,B), p(Ā,b), p(a,b̄), p(ā,B̄) to estimate the association of itemsets A and B. The fundamentals of this measure are based on a simple fact: Since sum of these terms is constant, increasing each term causes the decrement of the other terms. Then, for better understanding, we describe our new measure in semi Cartesian coordinates. Finally, we demonstrate the benefits of using the new measure for association rule mining based on results obtained from a random generated dataset.
AB - Associative classification has arrested attention in recent years and made significant improvement in related applications. This paper introduces the concept of a new interestingness measure and examines its utility in some application domains. Many interestingness measures have been presented before with different qualities, which make them useful for some applications. Some of these measures, such as support and Interest, do not concentrate on all properties of an association rule. Besides, some of them, such as J-Measure and Mutual Information, have complex computes. We present a new geometric measure which uses all basic terms of a contingency table values P(A,B), p(Ā,b), p(a,b̄), p(ā,B̄) to estimate the association of itemsets A and B. The fundamentals of this measure are based on a simple fact: Since sum of these terms is constant, increasing each term causes the decrement of the other terms. Then, for better understanding, we describe our new measure in semi Cartesian coordinates. Finally, we demonstrate the benefits of using the new measure for association rule mining based on results obtained from a random generated dataset.
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U2 - 10.1109/ICCIT.2008.299
DO - 10.1109/ICCIT.2008.299
M3 - Conference contribution
AN - SCOPUS:57849165004
SN - 9780769534077
T3 - Proceedings - 3rd International Conference on Convergence and Hybrid Information Technology, ICCIT 2008
SP - 199
EP - 203
BT - Proceedings - 3rd International Conference on Convergence and Hybrid Information Technology, ICCIT 2008
T2 - 3rd International Conference on Convergence and Hybrid Information Technology, ICCIT 2008
Y2 - 11 November 2008 through 13 November 2008
ER -