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(詳細はgroup theory, a branch of abstract algebra, a character table is a two-dimensional table whose rows correspond to irreducible group representations, and whose columns correspond to conjugacy classes of group elements. The entries consist of characters, the trace of the matrices representing group elements of the column's class in the given row's group representation. In chemistry, crystallography, and spectroscopy, character tables of point groups are used to classify ''e.g.'' molecular vibrations according to their symmetry, and to predict whether a transition between two states is forbidden for symmetry reasons. ==Definition and example== The irreducible complex characters of a finite group form a character table which encodes much useful information about the group ''G'' in a compact form. Each row is labelled by an irreducible character and the entries in the row are the values of that character on the representatives of the respective conjugacy class of ''G'' (because characters are class functions). The columns are labelled by (representatives of) the conjugacy classes of ''G''. It is customary to label the first row by the trivial character, and the first column by (the conjugacy class of) the identity. The entries of the first column are the values of the irreducible characters at the identity, the degrees of the irreducible characters. Characters of degree ''1'' are known as linear characters. Here is the character table of ''C''3 = '' where ω is a primitive third root of unity. The character table for general cyclic groups is the DFT matrix. The first row of the character table always consists of 1s, and corresponds to the trivial representation (the 1-dimensional representation consisting of 1×1 matrices containing the entry 1). Further, the character table is always square because (1) irreducible characters are pairwise orthogonal, and (2) no other non-trivial class function is orthogonal to every character. This is tied to the important fact that the irreducible representations of a finite group ''G'' are in bijection with its conjugacy classes. This bijection also follows by showing that the class sums form a basis for the center of the group algebra of ''G'', which has dimension equal to the number of irreducible representations of ''G''. 抄文引用元・出典: フリー百科事典『 ウィキペディア(Wikipedia)』 ■ウィキペディアで「Character table」の詳細全文を読む スポンサード リンク
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