Another approach to higher Riemann-Hilbert
Added publication details to
Adding Bhatt-Lurie’s construction following lecture 6 of Lurie’s lecture series in the references. Will fill in more details later.
]]>Added the statement of Mann’s version of p-adic Riemann-Hilbert. This probably needs a preliminary discussion of phi modules and overconvergent etale sheaves, which might be pretty involved.
]]>Added statement of the Riemann-Hilbert correspondence, following Lurie’s Felix Klein lectures.
]]>Added relation to geometric Langlands (with Frenkel reference).
]]>Added a mention of Mann’s version of the p-torsion Riemann-Hilbert correspondence for small v-stacks.
]]>Added Bhatt-Lurie’s p-adic Riemann-Hilbert correspondence with p-adic cooefficients,
]]>Added Bhatt-Lurie’s p-adic Riemann-Hilbert correspondence.
]]>Added reference
I entered the new arXiv reference by D’Agnolo and Kashiwara which extended the RH correspondence beyond the regular holonomic to holonomic case.
]]>When I was about to create it for flat connection I notice that we already did have Riemann-Hilbert correspondence. So now I have cross-linked it with flat connection, flat infinity-connection, local system, Riemann-Hilbert problem and the latter with Hilbert’s problems
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