D-branes and matrix factorisations in supersymmetric coset models

Abstract: Matrix factorisations describe B-type boundary conditions in N=2 supersymmetric Landau-Ginzburg models. At the infrared fixed point, they correspond to superconformal boundary states. We investigate the relation between boundary states and matrix factorisations in the Grassmannian Kazama-Suzuki coset models. For the first non-minimal series, i.e. for the models of type SU(3)_k/U(2), we identify matrix factorisations for a subset of the maximally symmetric boundary states. This set provides a basis for the RR c… Show more

“…In the diagonal SU (3)/U (2) coset model, maximally symmetric B-type boundary states |L, S; are labelled by two integers L, with 0 ≤ L ≤ k 2 , 0 ≤ ≤ k + 1, and an so(4) 1 representation S (see e.g. [13], and also [30] for a general discussion of twisted boundary states in Kazam-Suzuki models). Here, x denotes the greatest integer smaller or equal x.…”

“…We first review the identification of some of the rational boundary conditions as polynomial factorisations (i.e. where the matrix factorisations Q are 2 × 2-matrices) [13], and how one can obtain some higher factorisations via the cone construction. Then we will discuss how one can employ defects for a systematic construction of all matrix factorisations corresponding to rational boundary conditions.…”

“…In these models the rational algebras are (products of) super-Virasoro algebras, so that the algebraic structures are rather simple. A non-minimal situation has been explored in [13], where we identified matrix factorisations for some rational boundary conditions in the SU (3)/U (2) Kazama-Suzuki model. The strategy there was to identify first some elementary factorisations, and then build others with the help of the cone construction as tachyon condensates of elementary ones.…”

“…This interface then allows us to identify a matrix factorisation for a particular rational topological defect in the Kazama-Suzuki model. Fusing this defect to the matrix factorisations identified in [13], we generate matrix factorisations for all rational boundary conditions. The plan of the paper is as follows.…”

“…After these preparations we discuss in section 4 the construction of matrix factorisations for rational boundary conditions. We show how the factorisations of [13] can be obtained from permutation factorisations in the product of two minimal models with the help of the variable transformation interface. We also discuss how the interface relates the computation of RR-charges in Kazama-Suzuki models to computations in minimal models.…”

Matrix factorisations for rational boundary conditions by defect fusion

“…In the diagonal SU (3)/U (2) coset model, maximally symmetric B-type boundary states |L, S; are labelled by two integers L, with 0 ≤ L ≤ k 2 , 0 ≤ ≤ k + 1, and an so(4) 1 representation S (see e.g. [13], and also [30] for a general discussion of twisted boundary states in Kazam-Suzuki models). Here, x denotes the greatest integer smaller or equal x.…”

“…We first review the identification of some of the rational boundary conditions as polynomial factorisations (i.e. where the matrix factorisations Q are 2 × 2-matrices) [13], and how one can obtain some higher factorisations via the cone construction. Then we will discuss how one can employ defects for a systematic construction of all matrix factorisations corresponding to rational boundary conditions.…”

“…In these models the rational algebras are (products of) super-Virasoro algebras, so that the algebraic structures are rather simple. A non-minimal situation has been explored in [13], where we identified matrix factorisations for some rational boundary conditions in the SU (3)/U (2) Kazama-Suzuki model. The strategy there was to identify first some elementary factorisations, and then build others with the help of the cone construction as tachyon condensates of elementary ones.…”

“…This interface then allows us to identify a matrix factorisation for a particular rational topological defect in the Kazama-Suzuki model. Fusing this defect to the matrix factorisations identified in [13], we generate matrix factorisations for all rational boundary conditions. The plan of the paper is as follows.…”

“…After these preparations we discuss in section 4 the construction of matrix factorisations for rational boundary conditions. We show how the factorisations of [13] can be obtained from permutation factorisations in the product of two minimal models with the help of the variable transformation interface. We also discuss how the interface relates the computation of RR-charges in Kazama-Suzuki models to computations in minimal models.…”

Matrix factorisations for rational boundary conditions by defect fusion

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