A converse to Mazur's inequality for split classical groups

Details A converse to Mazur's inequality for split classical groups A converse to Mazur's inequality for split classical groups

2002-11-20

arxiv.org/abs/math/0211327v1

Mathematics

Number Theory

16 pages

Scientific paper

Given a lattice in an isocrystal, Mazur's inequality states that the Newton point of the isocrystal is less than or equal to the invariant measuring the relative position of the lattice and its transform under Frobenius. Conversely, it is known that any potential invariant allowed by Mazur's inequality actually arises from some lattice. These can be regarded as statements about the group $GL_n$. This paper proves an analogous converse theorem for all split classical groups.

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