1 2 O ct 2 00 6 Classification of modules of the intermediate series over
نویسندگان
چکیده
In this paper, we first discuss the structure of the Ramond N = 2 superconformal algebras. Then we classify the modules of the intermediate series over Ramond N = 2 superconformal algebra.
منابع مشابه
2 1 A ug 2 00 6 Classification of modules of the intermediate series over
In this paper, we discuss the structure of the Ramond N = 2 superconformal algebras. We classify the modules of the intermediate series over Ramond N = 2 superconformal algebra.
متن کاملar X iv : m at h / 06 08 50 8 v 3 [ m at h . Q A ] 1 5 D ec 2 00 6 Classification of modules of the intermediate series over
In this paper, we first discuss the structure of the Ramond N = 2 superconformal algebras. Then we classify the modules of the intermediate series over Ramond N = 2 superconformal algebra.
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In this paper, a classification of modules of the intermediate series over the twisted N = 2 superconformal algebra is obtained.
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Let L be the Lie algebra of Block type over a field F of characteristic zero, defined with basis {Li,j | i, j ∈ Z} and relations [Li,j, Lk,l] = ((j + 1)k − (l + 1)i)Li+k,j+l. Then L is Z -graded. In this paper, Z -graded L-modules of the intermediate series are classified.
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In this paper, we complete the classification of the Z-graded modules of the intermediate series over the q-analog Virasoro-like algebra L. We first construct four classes of irreducible Z-graded L-modules of the intermediate series. Then we prove that any Z-graded L-modules of the intermediate series must be the direct sum of some trivial L-modules or one of the modules constructed by us.
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