Results 121 to 130 of about 12,587 (151)
The efficacy of whole human genome capture on ancient dental calculus and dentin. [PDF]
Am J Phys Anthropol, 2019 Ziesemer KA +16 more
europepmc +1 more source
Poly(lactic acid) Degradation by Recombinant Cutinases from Aspergillus nidulans. [PDF]
Polymers (Basel)Alvarado E +4 more
europepmc +1 more source
Patients with chronic periodontitis are more likely to develop upper urinary tract stone: a nation-wide population-based eight-year follow up study. [PDF]
PeerJ, 2018 Huang IS +9 more
europepmc +1 more source
Evolutionarily Optimal Risk Aversion. [PDF]
Risk AnalChmura, Nguyen, Biermann.
europepmc +1 more source
Topiramate for the treatment of neonatal seizures and beyond. [PDF]
EpilepsiaLöscher W, Soul JS.
europepmc +1 more source
Schubert Calculus on Newton–Okounkov Polytopes
Springer Proceedings in Mathematics and Statistics, 2022 A Newton-Okounkov polytope of a complete flag variety can be turned into a convex geometric model for Schubert calculus. Namely, we can represent Schubert cycles by linear combinations of faces of the polytope so that the intersection product of cycles corresponds to the set-theoretic intersection of faces (whenever the latter are transverse).
Valentina Kiritchenko
exaly +3 more sources
Equivariant quantum Schubert calculus
Advances in Mathematics, 2006 We study the T-equivariant quantum cohomology of the Grassmannian. We prove the vanishing of a certain class of equivariant quantum Littlewood-Richardson coefficients, which implies an equivariant quantum Pieri rule. As in the equivariant case, this implies an algorithm to compute the equivariant quantum Littlewood-Richardson coefficients.
Leonardo C Mihalcea
exaly +3 more sources
The Secant Conjecture in the Real Schubert Calculus [PDF]
Experimental Mathematics, 2012 19 ...
Nickolas Hein +2 more
exaly +4 more sources
The Monotone Secant Conjecture in the Real Schubert Calculus [PDF]
Experimental Mathematics, 2015 The monotone secant conjecture posits a rich class of polynomial systems, all of whose solutions are real. These systems come from the Schubert calculus on flag manifolds, and the monotone secant conjecture is a compelling generalization of the Shapiro conjecture for Grassmannians (Theorem of Mukhin, Tarasov, and Varchenko). We present some theoretical
Nickolas Hein +2 more
exaly +3 more sources
A moebius-like formula in the schubert calculus
Inventiones Mathematicae, 1976 exaly +2 more sources