It is a question to me that why we evaluate Kostant or q-analogue Kostant partition function for the highest root of a Lie algebra and if we have these calculations, can we derive these partition functions for an arbitrary weight and root from those?
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$\begingroup$ It's very hard (apart from English grammar) to understand what the question is about, not just "drive" for "derive". Also, there is a need for more tags such as 'lie-algebras' and maybe 'rt.representation-theory'. $\endgroup$– Jim HumphreysCommented Jan 8, 2019 at 23:18
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$\begingroup$ Dear Jim, I mean that is it possible to compute the q-analog of Kostants's weight multiplicity with respect to an arbitrary root and weight from the highest root? $\endgroup$– AhmadiCommented Jan 9, 2019 at 12:48
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