Add to ORKGarXiv:1610.06746We introduce tropical spectrahedra, defined as the images by the nonarchimedean valuation of spectrahedra over the field of real Puiseux series. We provide an explicit characterization of generic tropical spectrahedra, involving principal tropical minors of size at most 2. To do so, we show that the nonarchimedean valuation maps semialgebraic sets to semilinear sets that are closed. We also prove that, under a regularity assumption, the image by the valuation of a basic semialgebraic set is obtained by tropicalizing the inequalities which define it
Tropical geometry is a relatively new field of mathematics that studies the tropicalization map: a m...
An abridged version of this article appeared in the proceedings of ISSAC 2016International audienceA...
arXiv:1606.00238International audienceWe investigate the tropical analogues of totally positive and ...
arXiv:1610.06746International audienceWe introduce tropical spectrahedra, defined as the images by t...
The present results were announced in the conference MEGA2017 (INTERNATIONAL CONFERENCE ON EFFECTIVE...
I will define and discuss the tropicalization and analytification of semialgebraic sets. We show tha...
Towards building tropical analogues of adic spaces, we study certain spaces of prime congruences as ...
Preprint arXiv:1408.6176International audienceIt is known that any tropical polytope is the image un...
La programmation semi-définie est un outil fondamental d'optimisation convexe et polynomiale. Elle r...
Semidefinite programming (SDP) is a fundamental tool in convex and polynomial optimization. It consi...
This dissertation presents recent contributions in tropical geometry with a view towards positivity,...
We study toric varieties over the tropical semifield. We define tropical cycles inside these toric v...
Abstract. We introduce tropical complexes, which are ∆-complexes together with additional numerical ...
In recent decades, tropical mathematics gradually evolved as a field of study in mathematics and it ...
Tropical geometry is a relatively new field of mathematics that studies the tropicalization map: a m...
An abridged version of this article appeared in the proceedings of ISSAC 2016International audienceA...
arXiv:1606.00238International audienceWe investigate the tropical analogues of totally positive and ...
arXiv:1610.06746International audienceWe introduce tropical spectrahedra, defined as the images by t...
The present results were announced in the conference MEGA2017 (INTERNATIONAL CONFERENCE ON EFFECTIVE...
I will define and discuss the tropicalization and analytification of semialgebraic sets. We show tha...
Towards building tropical analogues of adic spaces, we study certain spaces of prime congruences as ...
Preprint arXiv:1408.6176International audienceIt is known that any tropical polytope is the image un...
La programmation semi-définie est un outil fondamental d'optimisation convexe et polynomiale. Elle r...
Semidefinite programming (SDP) is a fundamental tool in convex and polynomial optimization. It consi...
This dissertation presents recent contributions in tropical geometry with a view towards positivity,...
We study toric varieties over the tropical semifield. We define tropical cycles inside these toric v...
Abstract. We introduce tropical complexes, which are ∆-complexes together with additional numerical ...
In recent decades, tropical mathematics gradually evolved as a field of study in mathematics and it ...
Tropical geometry is a relatively new field of mathematics that studies the tropicalization map: a m...
An abridged version of this article appeared in the proceedings of ISSAC 2016International audienceA...
arXiv:1606.00238International audienceWe investigate the tropical analogues of totally positive and ...