The Subalgebras of the Real Forms of \(sl3(C)\)

Abstract

We classify the subalgebras of the real forms the complex linear algebra sl3(C), namely the real special linear algebra sl3(R), the special unitary algebra su(3), and the generalized special unitary algebra su(2,1). Our approach applies Galois cohomology to the known classification of complex subalgebras of sl3(C). The subalgebras of sl3(R) were previously classified by Winternitz using different techniques. We recover this classification using our cohomological approach and amend minor inaccuracies. Our work, however, constitutes the first complete classifications of the subalgebras of su(3) and su(2,1). In addition to illuminating the internal structure of the real forms of sl3(C), our methodology provides a pathway for future investigations into the subalgebra structure of higher-dimensional cases. In addition, the present work and its extensions offer potential applications in representation theory, applied mathematics, and physics.

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