Results 321 to 330 of about 571,101 (336)
High-throughput Mucus Microrheology for Phenotyping and Disease Modeling
Ling F +11 more
europepmc +1 more source
Some of the next articles are maybe not open access.
Related searches:
Related searches:
On the moduli space of ’t Hooft bundles
ANNALI DELL UNIVERSITA DI FERRARA, 2001We describe the moduli spaceM 1 (c 2) of 't Hooft bundles onP 3, that is instanton bundles having sections at the first twist. We prove that such a moduli space is a rational variety whose singular locus is the moduli space of special 't Hooft bundles studied in [HN]. It turns out thatM 1 (
BEORCHIA V, FRANCO, DAVIDE
openaire +4 more sources
Computations in Moduli Spaces [PDF]
Computational Methods and Function Theory, 2007 Today the techniques related to Riemann surfaces are widely used in different branches of mathematics, theoretical physics, industry and even in medicine. Unfortunately, many achievements of the theory remain on paper since theoretical formulae contain special functions that few scholars try to compute.
openaire +1 more source
1980
In this section we introduce the crucial concept of stability of holomorphic vector bundles over ℙ n . We begin by collecting together several theorems about torsion-free, normal and reflexive sheaves which we shall need later. Then we define stable and semistable torsion-free sheaves in the sense of Mumford and Takemoto and compare this concept of ...
Christian Okonek +2 more
openaire +2 more sources
In this section we introduce the crucial concept of stability of holomorphic vector bundles over ℙ n . We begin by collecting together several theorems about torsion-free, normal and reflexive sheaves which we shall need later. Then we define stable and semistable torsion-free sheaves in the sense of Mumford and Takemoto and compare this concept of ...
Christian Okonek +2 more
openaire +2 more sources
2014
Moduli theory is the study of how objects, typically in algebraic geometry but sometimes in other areas of mathematics, vary in families and is fundamental to an understanding of the objects themselves. First formalised in the 1960s, it represents a significant topic of modern mathematical research with strong connections to many areas of mathematics ...
Oscar García-Prada +3 more
openaire +2 more sources
Moduli theory is the study of how objects, typically in algebraic geometry but sometimes in other areas of mathematics, vary in families and is fundamental to an understanding of the objects themselves. First formalised in the 1960s, it represents a significant topic of modern mathematical research with strong connections to many areas of mathematics ...
Oscar García-Prada +3 more
openaire +2 more sources
Math Horizons, 1998
There's more to math than just numbers and equations. In fact, much of mathematics concerns space?not outer space, but mental representations of space and spatial relationships. While many people think of Descartes as the first person to describe points in a plane by means of a pair of coordi nates, the idea of coordinatizing planar space was known to ...
openaire +2 more sources
There's more to math than just numbers and equations. In fact, much of mathematics concerns space?not outer space, but mental representations of space and spatial relationships. While many people think of Descartes as the first person to describe points in a plane by means of a pair of coordi nates, the idea of coordinatizing planar space was known to ...
openaire +2 more sources
Moduli Spaces and Teichmüller Spaces
2021The hyperbolic three space \( \mathbb{H}^{3} \) is the moduli space for all Riemannian metrics of curvature +1 in the conformal class of a fixed conformal 2-sphere.
openaire +2 more sources
Parameter Spaces and Moduli Spaces
1992We can now give a slightly expanded introduction to the notion of parameter space, introduced in Lecture 4 and discussed occasionally since. This is a fairly delicate subject, and one that is clearly best understood from the point of view of scheme theory, so that in some sense this discussion violates our basic principle of dealing only with topics ...
openaire +2 more sources