Revision 0af60611-6b11-46ac-8b4c-9fd8d0434928

It might be a stupid question. 

How to glue perverse sheaves? I am considering the following example. Flag variety of $sl_2$, which is $P^1$. Consider category of perverse sheaves on $P^1$. Denoted by $Perv(P^1)$. The big cells of flag variety of $sl_2$ give the affine cover for it. In this case, they should be two $A^1$. We can also consider category of perverse sheaves on $A^1$. My question is:

1. How to glue two pieces of perverse sheaves on 1-dimensional affine spaces to that of projective spaces? More general, is there any gluing machinery which can globalize the perverse sheaves? It seems that Beilinson had a paper talking about this, but what I preferred is some expository notes explaining with some examples.

2. Maybe I need to ask this in another question. How can one define perverse sheaves on noncommutative space. I am aware that there is a paper by Amnon Yekutieli, James J. Zhang talking about [perverse sheaves on noncommutative space][1]. However, what they considered was not really a noncommutative space from my understanding. (If I made mistake or bullshit, point out please). They consider quasi coherent sheaves of (not necessarily) commutative algebra on commutative scheme. Which does not fit my need. I am considering the following example: Quantized flag variety of $sl_2$ i.e. $Proj(O_q(G/N))$ in the sense of [Lunts–Rosenberg][2] (see also [Erik Backelin and Kobi Kremnitzer][3] and [Tanisaki][4]). It is a noncommutative scheme. I wonder whether James Zhang has also defined dualizing complexes for this case. **How to define category of perverse sheaves on quantized flag variety**? 
The motivation for this question is I think there should be **quantum version of Riemann–Hilbert correspondence**. Which should describe the categorical equivalence:

$Perv(Proj(O_q(G/N))$ and category of quantum holonomic D-modules on quantized flag variety.

At present, I have more interest to know the answer of question 1. Thank you!


  [1]: https://arxiv.org/abs/math/0211309 "Amnon Yekutieli, James J. Zhang. Dualizing Complexes and Perverse Sheaves on Noncommutative Ringed Schemes. 2006. https://zbmath.org/?q=an:1137.14300"
  [2]: https://doi.org/10.1007/s000290050044 "Lunts, V., Rosenberg, A. Localization for quantum groups. Sel. math., New ser. 5, 123 (1999). https://zbmath.org/?q=an:0928.16020"
  [3]: https://arxiv.org/abs/math/0401108v2 "Erik Backelin, Kobi Kremnizer. Quantum flag varieties, equivariant quantum D-modules and localization of quantum groups. 2004. https://zbmath.org/?q=an:1165.17304"
  [4]: https://arxiv.org/abs/math/0309349 "Toshiyuki Tanisaki. The Beilinson-Bernstein correspondence for quantized enveloping algebras. 2003. https://zbmath.org/?q=an:1082.17010"