Andrey Minchenko, Alexey Ovchinnikov
Published 2011-03-10, updated 2011-12-18Version 3
Linear differential algebraic groups (LDAGs) measure differential algebraic dependencies among solutions of linear differential and difference equations with parameters, for which LDAGs are Galois groups. The differential representation theory is a key to developing algorithms computing these groups. In the rational representation theory of algebraic groups, one starts with SL(2) and tori to develop the rest of the theory. In this paper, we give an explicit description of differential representations of tori and differential extensions of irreducible representation of SL(2). In these extensions, the two irreducible representations can be non-isomorphic. This is in contrast to differential representations of tori, which turn out to be direct sums of isotypic representations.
Comments: 21 pages; few misprints corrected; Lemma 4.6 added
Journal: Journal of the Institute of Mathematics of Jussieu, Volume 12, Issue 1, 2013, pp 199-224
Tannakian approach to linear differential algebraic groups
Spectra of non-regular elements in irreducible representations of simple algebraic groups
On classical tensor categories attached to the irreducible representations of the General Linear Supergroups $GL(n\vert n)$
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