Logarithmic Hochschild homology is functorial for strong log Fourier-Mukai transforms on smooth proper log pairs, yielding a dg bicategory of logarithmic correspondences with compatible Chern characters and Euler pairings.
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Introduces filtered formal groups and Cartier duality, proves a G_m-equivariant degeneration via normal cone construction, establishes unicity of complete filtrations, recovers the MRT19 filtration, and studies lifts of G-hat-Hochschild homology to spectral algebraic geometry.
Lecture notes covering the theory of algebraic stacks for an 11-lecture graduate course.
citing papers explorer
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Functoriality of logarithmic Hochschild homology of log smooth pairs
Logarithmic Hochschild homology is functorial for strong log Fourier-Mukai transforms on smooth proper log pairs, yielding a dg bicategory of logarithmic correspondences with compatible Chern characters and Euler pairings.
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Filtered formal groups, Cartier duality, and derived algebraic geometry
Introduces filtered formal groups and Cartier duality, proves a G_m-equivariant degeneration via normal cone construction, establishes unicity of complete filtrations, recovers the MRT19 filtration, and studies lifts of G-hat-Hochschild homology to spectral algebraic geometry.
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Lectures on algebraic stacks
Lecture notes covering the theory of algebraic stacks for an 11-lecture graduate course.