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Abstract

This paper is the second in a series devoted to Deligne's conjectural program on refined versions of the Grothendieck-Riemann-Roch theorem via the determinant of the cohomology. We prove a general form of the Deligne-Riemann-Roch isomorphism, lifting the degree-one part of the Grothendieck-Riemann-Roch formula to a canonical isomorphism of line bundles. This extends previous constructions and is formulated and proven in a flexible reinterpretation of Elkik's theory of intersection bundles introduced in the first paper of the series. This resolves the geometric aspect of Deligne's program. Among the applications, we derive a natural isomorphism relating the BCOV bundle and the Hodge bundle of a family of Calabi-Yau varieties, which is part of the mathematical formulation of the genus one mirror symmetry conjecture proposed in a previous work with Mourougane.