| Operations on the de Rham cohomology of Poisson and Jacobi manifolds |
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| Derived homotopy algebras |
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| Massey products for algebras over operads |
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| DERIVED UNIVERSAL MASSEY PRODUCTS |
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| ENHANCED FINITE TRIANGULATED CATEGORIES |
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| Enhanced A∞-obstruction theory |
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| The first obstructions to enhancing a triangulated category |
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| Homotopy theory of bicomplexes |
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| Torsion homology and cellular approximation |
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| Homotopy theory of nonsymmetric operads, I-II (vol 11, pg 1541, 2011) |
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| <i>K</i>-theory of derivators revisited |
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| Cylinders for non-symmetric DG-operads via homological perturbation theory |
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| Transfinite Adams representability |
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| HOMOTOPY UNITS IN <i>A</i>-INFINITY ALGEBRAS |
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| On the unit of a monoidal model category |
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| Dwyer Kan homotopy theory of enriched categories |
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| ON DETERMINANT FUNCTORS AND <i>K</i>-THEORY |
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| Unital associahedra |
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| Homotopy theory of non-symmetric operads, II: Change of base category and left properness |
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| Moduli spaces of algebras over nonsymmetric operads |
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| A note on <i>K</i>-theory and triangulated derivators |
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| The algebra of secondary homotopy operations in ring spectra |
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| Homotopy theory of nonsymmetric operads |
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| Toda Brackets and Cup-One Squares for Ring Spectra |
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| Secondary homotopy groups |
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| Maltsiniotis's First Conjecture for <i>K</i><sub>1</sub> |
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| The symmetric action on secondary homotopy groups |
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| Smash products for secondary homotopy groups |
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| Cohomologically triangulated categories I |
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| The homotopy category of pseudofunctors and translation cohomology |
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| The 1-type of a waldhausen K-theory spectrum |
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| Triangulated categories without models |
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| On the functoriality of cohomology of categories |
|
| Suspensions of crossed and quadratic complexes, co-H-structures and applications |
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| Proper L-S category, fundamental pro-groups and 2-dimensional proper co-H-spaces |
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| The proper L-S category of Whitehead manifolds |
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| Representation theory of some infinite-dimensional algebras arising in continuously controlled algebra and topology |
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| An elementary approach to the projective dimension in proper homotopy theory |
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