Γ(p)-Level Structure on p-Divisible Groups
<p>The main result of the thesis is the introduction of a notion of Γ(<i>p</i>)-level structure for <i>p</i>-divisible groups. This generalizes the Drinfeld-Katz-Mazur notion of full level structure for 1-dimensional <i>p</i>-divisible groups. The associated...
| Summary: | <p>The main result of the thesis is the introduction of a notion of Γ(<i>p</i>)-level structure for <i>p</i>-divisible groups. This generalizes the Drinfeld-Katz-Mazur notion of full level structure for 1-dimensional <i>p</i>-divisible groups. The associated moduli problem has a natural forgetful map to the Γ<sub>0</sub>(<i>p</i>)-level moduli problem. Exploiting this map and known results about Γ<sub>0</sub>(<i>p</i>)-level, we show that our notion yields a flat moduli problem. We show that in the case of 1-dimensional <i>p</i>-divisible groups, it coincides with the existing Drinfeld-Katz-Mazur notion.</p>
<p>In the second half of the thesis, we introduce a notion of epipelagic level structure. As part of the task of writing down a local model for the associated moduli problem, one needs to understand commutative finite flat group schemes <i>G</i> of order <i>p</i><sup>2</sup> killed by <i>p</i>, equipped with an extension structures 0→ H<sub>1</sub>→ G→ H<sub>2</sub>→ 0, where H<sub>1</sub>,H<sub>2</sub> are finite flat of order <i>p</i>. We investigate a particular class of extensions, namely extensions of <i>Z/pZ</i> by μ<sub>p</sub> over Z<sub>p</sub>-algebras. These can be classified using Kummer theory. We present a different approach, which leads to a more explicit classification.</p> |
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