Invariant theory of special orthogonal groups.
Helmer Aslaksen, Eng-Chye Tan, and Chen-bo Zhu
Source: Pacific J. Math. Volume 168, Number 2 (1995), 207-215.
Primary Subjects: 13A50
Secondary Subjects: 15A15, 15A72, 16R30, 20G05
Full-text: Open access
Links and Identifiers
Permanent link to this document: http://projecteuclid.org/euclid.pjm/1102620558
Zentralblatt MATH identifier:
0830.15027
Mathematical Reviews number (MathSciNet):
MR1339950
References
[1] H. Aslaksen, S O ( 2 ) invariantsof a set o f 2 x 2 matrices,M a t h .S c a n d . , 6 5 (1989), 59-66.
Mathematical Reviews (MathSciNet):
MR91d:15010
Zentralblatt MATH:
0679.15029
[2] S. Helgason, Differential Geometry, Lie Groups, andSymmetric Spaces, Academic Press, New York (1978).
Mathematical Reviews (MathSciNet):
MR80k:53081
Zentralblatt MATH:
0451.53038
[3] C. Procesi, Theinvariant theory of n x n matrices, Adv. in Math., 19 (1976), 306-381.
Mathematical Reviews (MathSciNet):
MR54:7512
Zentralblatt MATH:
0331.15021
[4] K.S. Sibirskii, Algebraic invariants for a set of matrices, Siberian Math. J., 9 (1968), 115-124. H. Aslaksen, E.C.Tan and C. Zhu, Generators and relations of invariants of 2 x 2matrices, Comm. Algebra, 22 (1994),1821-1832. , Quivers and the invariant theory of Levi subgroups, J. Funct. Anal., 120 (1994),163-187.
Mathematical Reviews (MathSciNet):
MR82k:10045
Pacific Journal of Mathematics
