I added some examples to the slope section at Cartier module to give a clearer indication of what is going on. Now to add something to slope filtration …
]]>Great, all this information. Even if you know that something is related and you do not know how precisely, you can still mention this and somebody will go step further later,,,
]]>They seem to be related as the Newton polygon is listed as a related and this is the sense in which I’m referring in Cartier module. I only know the tiniest bit about the F-isocrystal case which is what I’m trying to build up to, since you can just read off the height of a variety using the slope filtration on the crystalline cohomology. I keep linking to Dieudonne module, so I’m aware there is nothing there and it is maybe the next thing I’ll remedy.
]]>There is related stub with zero content, Dieudonne module, which I had never time to really start, and also a stub slope filtration redirecting also slope. There are many notions of various slopes in the subject of algebraic geometry, so I am not sure if it is reasonable that I linked slope from your page (now I see you linked it as well at some point, maybe some words at slope fitration on the relation between the contexts touched upon so far could be useful).
]]>Thanks for all this!
I have added some hyperlinks. Also added the floating Algebra-toc and a redirect for the plural “Cartier modules”.
]]>I’ve started the page Cartier module.
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