Constructs silting t-structures in the Q-shaped derived category from admissible partitions of Q, with explicit cotorsion pairs, homological descriptions, and examples of when none exist.
The homotopy category is a homotopy category
2 Pith papers cite this work. Polarity classification is still indexing.
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The tame realization turns precubical sets into multipointed d-spaces whose execution paths match nonconstant tame d-paths, inducing a Moore flow functor naturally weakly equivalent to a colimit-preserving one in the h-model structure.
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Silting t-structures in $Q$-shaped derived categories
Constructs silting t-structures in the Q-shaped derived category from admissible partitions of Q, with explicit cotorsion pairs, homological descriptions, and examples of when none exist.
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Directed path and Moore flow
The tame realization turns precubical sets into multipointed d-spaces whose execution paths match nonconstant tame d-paths, inducing a Moore flow functor naturally weakly equivalent to a colimit-preserving one in the h-model structure.