Add to ORKGWe categorify one half of the small quantum sl(2) at a prime root of unity. An extension of this construction to an arbitrary simply-laced case is proposed
For any natural number n≥2, we construct a triangulated monoidal category whose Grothendieck ring is...
For any natural number n≥2, we construct a triangulated monoidal category whose Grothendieck ring is...
For any natural number n≥2, we construct a triangulated monoidal category whose Grothendieck ring is...
We categorify one half of the small quantum sl(2) at a prime root of unity. An extension of this con...
We categorify an idempotented form of quantum sl_2 and some of its simple representations at a prime...
We categorify an idempotented form of quantum sl_2 and some of its simple representations at a prime...
We categorify the Beilinson–Lusztig–MacPherson integral form of quantum sl_2 specialized at a prime ...
A quantum Frobenius map a la Lusztig for sl_2 is categorified at a prime root of unity
We categorify the Beilinson–Lusztig–MacPherson integral form of quantum sl_2 specialized at a prime ...
We categorify the Beilinson–Lusztig–MacPherson integral form of quantum sl_2 specialized at a prime ...
We categorify an idempotented form of quantum sl_2 and some of its simple representations at a prime...
Categorified quantum groups play an increasing role in many areas of mathematics. The Steenrod algeb...
Motivated by recent advances in the categorification of quantum groups at prime roots of unity, we d...
Motivated by recent advances in the categorification of quantum groups at prime roots of unity, we d...
For any natural number n≥2, we construct a triangulated monoidal category whose Grothendieck ring is...
For any natural number n≥2, we construct a triangulated monoidal category whose Grothendieck ring is...
For any natural number n≥2, we construct a triangulated monoidal category whose Grothendieck ring is...
For any natural number n≥2, we construct a triangulated monoidal category whose Grothendieck ring is...
We categorify one half of the small quantum sl(2) at a prime root of unity. An extension of this con...
We categorify an idempotented form of quantum sl_2 and some of its simple representations at a prime...
We categorify an idempotented form of quantum sl_2 and some of its simple representations at a prime...
We categorify the Beilinson–Lusztig–MacPherson integral form of quantum sl_2 specialized at a prime ...
A quantum Frobenius map a la Lusztig for sl_2 is categorified at a prime root of unity
We categorify the Beilinson–Lusztig–MacPherson integral form of quantum sl_2 specialized at a prime ...
We categorify the Beilinson–Lusztig–MacPherson integral form of quantum sl_2 specialized at a prime ...
We categorify an idempotented form of quantum sl_2 and some of its simple representations at a prime...
Categorified quantum groups play an increasing role in many areas of mathematics. The Steenrod algeb...
Motivated by recent advances in the categorification of quantum groups at prime roots of unity, we d...
Motivated by recent advances in the categorification of quantum groups at prime roots of unity, we d...
For any natural number n≥2, we construct a triangulated monoidal category whose Grothendieck ring is...
For any natural number n≥2, we construct a triangulated monoidal category whose Grothendieck ring is...
For any natural number n≥2, we construct a triangulated monoidal category whose Grothendieck ring is...
For any natural number n≥2, we construct a triangulated monoidal category whose Grothendieck ring is...