We investigate maximal exceptional sequences of line bundles on (P1)r, i.e., those consisting of 2r elements. For r=3 we show that they are always full, meaning that they generate the derived category. Everything is done in the discrete setup: Exceptional sequences of line bundles appear as special finite subsets s of the Picard group Zr of (P1)r, and the question of generation is understood like a process of contamination of the whole Zr out of an infectious seed s
Exceptional sequences of line bundles on a smooth projective toric surface are automatically full wh...
Exceptional sequences of line bundles on a smooth projective toric surface are automatically full wh...
Exceptional sequences of line bundles on a smooth projective toric surface are automatically full wh...
A fullness conjecture of Kuznetsov says that if a smooth projective variety $X$ admits a full except...
We study strong exceptional collections of line bundles on Fano toric Deligne-Mumford stacks $mathbb...
We construct a full, strongly exceptional collection of line bundles on the variety X that is the bl...
We construct a full, strongly exceptional collection of line bundles on the variety X that is the bl...
We construct a full, strongly exceptional collection of line bundles on the variety X that is the bl...
© 2019 Korean Mathematical Society. A fullness conjecture of Kuznetsov says that if a smooth project...
We investigate combinatorial aspects of exceptional sequences in the derived category of coherent sh...
In [8, Conjecture 3.6], Costa and Miró-Roig state the following conjecture:Every smooth complete tor...
In [8, Conjecture 3.6], Costa and Miró-Roig state the following conjecture:Every smooth complete tor...
In [8, Conjecture 3.6], Costa and Miró-Roig state the following conjecture:Every smooth complete tor...
In this paper, we study the derived category of certain toric va- rieties with Picaed number three w...
Exceptional sequences of line bundles on a smooth projective toric surface are automatically full wh...
Exceptional sequences of line bundles on a smooth projective toric surface are automatically full wh...
Exceptional sequences of line bundles on a smooth projective toric surface are automatically full wh...
Exceptional sequences of line bundles on a smooth projective toric surface are automatically full wh...
A fullness conjecture of Kuznetsov says that if a smooth projective variety $X$ admits a full except...
We study strong exceptional collections of line bundles on Fano toric Deligne-Mumford stacks $mathbb...
We construct a full, strongly exceptional collection of line bundles on the variety X that is the bl...
We construct a full, strongly exceptional collection of line bundles on the variety X that is the bl...
We construct a full, strongly exceptional collection of line bundles on the variety X that is the bl...
© 2019 Korean Mathematical Society. A fullness conjecture of Kuznetsov says that if a smooth project...
We investigate combinatorial aspects of exceptional sequences in the derived category of coherent sh...
In [8, Conjecture 3.6], Costa and Miró-Roig state the following conjecture:Every smooth complete tor...
In [8, Conjecture 3.6], Costa and Miró-Roig state the following conjecture:Every smooth complete tor...
In [8, Conjecture 3.6], Costa and Miró-Roig state the following conjecture:Every smooth complete tor...
In this paper, we study the derived category of certain toric va- rieties with Picaed number three w...
Exceptional sequences of line bundles on a smooth projective toric surface are automatically full wh...
Exceptional sequences of line bundles on a smooth projective toric surface are automatically full wh...
Exceptional sequences of line bundles on a smooth projective toric surface are automatically full wh...
Exceptional sequences of line bundles on a smooth projective toric surface are automatically full wh...
DOI
Add to ORKG