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Let m be a positive integer. A group G is said to be an m-DCI-group or an m-CI-group if G has the k-DCI property or k-CI property for all positive integers k at most m, respectively. Let G be a dihedral group of order 2n with n 3. Qu and Yu proved that G is an m-DCI-group or m-CI-group, for every m \1, 2, 3\, if and only if n is odd. In this paper, it is shown that G is a 4-DCI-group if and only if n is odd and not divisible by 9, and G is a 4-CI-group if and only if n is odd.
Xie et al. (Wed,) studied this question.
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