# An integral second fundamental theorem of invariant theory for partition algebras

@inproceedings{Bowman2018AnIS, title={An integral second fundamental theorem of invariant theory for partition algebras}, author={Chris Bowman and Stephen R. Doty and Stuart Martin}, year={2018} }

We prove that the kernel of the action the group algebra of the Weyl group acting on tensor space (via restriction of the action from the general linear group) is a cell ideal with respect to the alternating Murphy basis. This provides an analogue of the second fundamental theory of invariant theory for the partition algebra over an arbitrary integral domain and proves that the centraliser algebras of the partition algebra are cellular. We also prove similar results for the half partition… CONTINUE READING

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## The Representation Theory of the Symmetric Groups

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