Logarithmic Cobordism and Donaldson-Thomas Invariants
Abstract
We introduce a logarithmic cobordism ωLog ring of pairs (X,D) of varieties equipped with a simple normal crossings divisor D⊂ X, analogous to the algebraic cobordism ring ωLP of Levine-Pandharipande, and we provide an application to logarithmic DT invariants. We also prove prove that if we impose the relation (X',D') = (X,D) for (X',D')→ (X,D) a logarithmic modification, then the new "logarithmic+modification" cobordism ring ωLog+Mod collapses to the algebraic cobordism ring of Levine-Pandharipande: ωLP ωLog+Mod
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