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Professor KA Brown University of Glasgow. Professor EB Davies, FRS Kings College London.

Professor J Brindley University of Leeds. Professor KA Brown University of GlasgowProfessor EB Davies FRS Kings College London.

J Brindley University of LeedsProfessor KA Brown University of GlasgowProfessor EB Davies FRS Kings College LondonProfessor PJ Diggle University of LancasterProfessor CM Elliott University of SussexProfessor EG Rees University of EdinburghDr

http://www.newton.cam.ac.uk/correspondents.html. National Advisory Board and UK Mathematics. Professor Sir Michael Berry FRS University of BristolProfessor J Brindley University of LeedsProfessor KA Brown FRSE University

National Advisory Board and UK Mathematics. Professor Sir Michael Berry FRS University of BristolProfessor J Brindley University of LeedsProfessor KA Brown FRSE University of GlasgowProfessor P Grindrod Lawson Software, OxfordProfessor J

FHTWHT. EBD. KA. H. GRA. P R O G R A M M E H I G H L I G H T S | J U LY # A U G U

JAN. 2019. GCS. CAT M. DL. KA. H. CAR. ASC. FHTWHT.

Our proof of the irredu ibility riterion for prin ipal series modules is a graded He ke algebra analogue of the proof given byKato [Ka for aÆne He ke algebras. ... The following proposition provides a graded He ke analogue of the results in

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