Differential equations for intertwining operators among untwisted and twisted modules
Abstract
Given any vertex operator algebra V with an automorphism g , we derive a Jacobi identity for an intertwining operator Y of type ( smallmatrix W3\\ W1 \, W2 smallmatrix) when W1 is an untwisted V -module, and W2 and W3 are g -twisted V -modules. We say such an intertwining operator is of (\!smallmatrix g\\ 1 \ g smallmatrix\!)-type. Using the Jacobi identity, we obtain homogeneous linear differential equations satisfied by the multi-series w0, Y1(w1,z1) ·s YN(wN,zN) wN+1 when Yj are of (\!smallmatrix g\\ 1 \ g smallmatrix\!)-type and the modules are C1 -cofinite and discretely graded. In the special case that V is an affine vertex operator algebra, we derive the ``twisted KZ equations" and show that its solutions have regular singularities at certain prescribed points when g has finite order. When V is general and g has finite order, we use the theory of regular singular points to prove that the multi-series w0, Y1(w1,z1) ·s YN(wN,zN) wN+1 converges absolutely to a multivalued analytic function when |z1| > ·s > |zN| > 0 and analytically extends to the region zi, zi - zj ≠ 0 . Furthermore, when N = 2 , we show that these multivalued functions have regular singularities at certain prescribed points.
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