Uniqueness of Branching through regular unipotent elements
Abstract
Let \( G\) be a complex simple algebraic group and let \( G0⊂ G\) be a closed connected subgroup containing a regular unipotent element of \( G\), with semisimple rank at least \(2\). Using Dynkin's classification, we prove that the restriction of an irreducible finite-dimensional representation of \( G\) to \( G0\) determines the representation up to an outer automorphism of \( G\) preserving \( G0\). We extend this method to the diagonal embedding G0 G× G for the specific pairs (SO2k( C) ×SO2k( C),\,SO2k-1( C)), (E6× E6,\,F4) and (Spin8( C) × Spin8( C), G2) and show that uniqueness continues to hold. Finally, we give examples showing that, in the diagonal setting, restriction to the principal \(SL2( C)\) alone is not sufficient to establish uniqueness.
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