The BBG correspondence

Script error: No such module "AfC submission catcheck". Bernstein-Gelfand-Gelfand correspondence (BGG correspondence for short), established by Joseph Bernstein, Israel Gelfand, and Sergei Gelfand,^[1] is an explicit triangulated equivalence that relates the bounded derived category of coherent sheaves on the projective space $\mathbb {P} ^{n}$ and the stable category of graded modules ${\underline {gr\wedge V}}$ over the Exterior algebra $\wedge V$ . In the noncommutative setting, Martinez-Villa and Saorin R ^[2] generalized the BGG correspondence to finite-dimensional self-injective Koszul algebras $A$ with coherent Koszul duals $A^{!}$ . Roughly speaking, they proved that the stable category of finite-dimentional graded modules over a finite-dimensional self-injective Koszul algebra $A$ is triangulated equivalent to the bounded derived category of the category of coherent modules over its Koszul dual $A^{!}$ (when $A^{!}$ is coherent).

References[edit]

↑ Joseph Bernstein, Israel Gelfand, and Sergei Gelfand. Algebraic bundles over $P^{n}$ and problems of linear algebra. Funkts. Anal. Prilozh. 12 (1978); English translation in Functional Analysis and its Applications 12 (1978), 212-214
↑ "Martínez-Villa, M. Saorín, Koszul equivalence and dualities", Pacific J. Math. 214 (2004) 359–378

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[1] Joseph Bernstein, Israel Gelfand, and Sergei Gelfand. Algebraic bundles over $P^{n}$ and problems of linear algebra. Funkts. Anal. Prilozh. 12 (1978); English translation in Functional Analysis and its Applications 12 (1978), 212-214

[2] "Martínez-Villa, M. Saorín, Koszul equivalence and dualities", Pacific J. Math. 214 (2004) 359–378

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