Deligne Categories and the Limit of Categories Rep(GL(m|n))
I Entova-Aizenbud, V Hinich… - International …, 2020 - academic.oup.com
For each integer a tensor category is constructed, such that exact tensor functors classify
dualizable-dimensional objects in not annihilated by any Schur functor. This means that is …
dualizable-dimensional objects in not annihilated by any Schur functor. This means that is …
[PDF][PDF] Deligne Categories and the Limit of Categories Rep(GL(m|n))
I Entova-Aizenbud, V Hinich… - International …, 2020 - academic.oup.com
For each integer a tensor category is constructed, such that exact tensor functors classify
dualizable-dimensional objects in not annihilated by any Schur functor. This means that is …
dualizable-dimensional objects in not annihilated by any Schur functor. This means that is …
Deligne categories and the limit of categories rep (gl (m| n))
I Entova-Aizenbud, V Hinich… - International Mathematics …, 2021 - cris.bgu.ac.il
For each integer ta tensor category V t is constructed, such that exact tensor functors V tC
classify dualizable t-dimensional objects in C not annihilated by any Schur functor. This …
classify dualizable t-dimensional objects in C not annihilated by any Schur functor. This …
Deligne Categories and the Limit of Categories Rep (GL (m| n)).
I Entova-Aizenbud, V Hinich… - IMRN: International …, 2020 - search.ebscohost.com
Abstract For each integer| $ t $| a tensor category| $\mathcal {V} _t $| is constructed, such
that exact tensor functors| $\mathcal {V} _t\rightarrow\mathcal {C} $| classify dualizable| $ t …
that exact tensor functors| $\mathcal {V} _t\rightarrow\mathcal {C} $| classify dualizable| $ t …
Deligne categories and the limit of categories
I Entova-Aizenbud, V Hinich, V Serganova - arXiv preprint arXiv …, 2015 - arxiv.org
For each integer $ t $ a tensor category $ V_t $ is constructed, such that exact tensor
functors $ V_t\longrightarrow C $ classify dualizable $ t $-dimensional objects in $ C $ not …
functors $ V_t\longrightarrow C $ classify dualizable $ t $-dimensional objects in $ C $ not …
Deligne Categories and the Limit of Categories Rep (GL (m| n))
I Entova-Aizenbud, V Hinich, V Serganova - International Mathematics …, 2018 - par.nsf.gov
For each integer $ t $ a tensor category $\mathcal {V} _t $ is constructed, such that exact
tensor functors $\mathcal {V} _t\rightarrow\mathcal {C} $ classify dualizable $ t …
tensor functors $\mathcal {V} _t\rightarrow\mathcal {C} $ classify dualizable $ t …
Deligne categories and the limit of categories
I Entova-Aizenbud, V Hinich, V Serganova - arXiv e-prints, 2015 - ui.adsabs.harvard.edu
For each integer $ t $ a tensor category $ V_t $ is constructed, such that exact tensor
functors $ V_t\longrightarrow C $ classify dualizable $ t $-dimensional objects in $ C $ not …
functors $ V_t\longrightarrow C $ classify dualizable $ t $-dimensional objects in $ C $ not …