Seminar za analizo in algebro Alpe-Jadran (SAAAJ)
Datum objave: 1. 11. 2019
Seminar za algebro in funkcionalno analizo
Sobota, 9. 11. 2019, ob 10:00 v predavalnici 2.02, FMF, Jadranska 21, Ljubljana
Novo-ustanovljeni SAAAJ (Seminar za analizo in algebro Alpe-Jadran) bo
imel drugo srečanje v soboto, 9.11.2019, v Ljubljani. Naslovi in
povzetki so spodaj.
Vsi, ki se nam zelite pridruziti na kosilu, se javite pri Marjeti do četrtka, 7.11.
Vljudno vabljeni!
Marjeta Kramar Fijavž in Igor Klep
-------------------
10.00 - 10.45
Peter Šemrl
Title: Adjacency preserving maps
Abstract:
In the last 20 years most of my research was closely connected to the
problem of describing the general form of adjacency preserving maps.
The notion of adjacency is very simple and the problem of finding the
general form of such maps can be easily understood by an undergraduate
student. But it turned out that this elementary linear algebra problem is
quite difficult and closely related to various parts of mathematics such as
geometry, operator theory, and mathematical physics. I will describe the
problem, some of the most interesting results, ideas, and connections
with other parts of mathematics and physics.
10.55 - 11.40
Andrej Dujella
Title: Elliptic curves and Diophantine m-tuples
Abstract:
In this talk, we will describe some connections between
Diophantine m-tuples and elliptic curves.
A rational Diophantine m-tuple is a set of m nonzero rationals
such that the product of any two of them increased by 1 is a perfect square.
The first rational Diophantine quadruple was found by Diophantus.
It is known that there are infinitely many Diophantine quadruples in integers
(the first example, the set {1,3,8,120}, was found by Fermat),
and He, Togbe and Ziegler proved recently that there are no
Diophantine quintuples in integers.
Euler proved that there are infinitely many rational Diophantine quintuples.
In 1999, Gibbs found the first example of a rational Diophantine sextuple.
It is still an open question whether there exist any rational
Diophantine septuple.
We will describe several constructions of infinite families of
rational Diophantine sextuples.
These constructions use properties of corresponding elliptic curves.
We will show how Diophantine m-tuples can be used in
construction of high-rank elliptic curves over Q
with given torsion group.
11.50 - 12.35
Oliver Dragičević
Title: p-ellipticity
Abstract: We introduce a condition on complex accretive matrices which generalizes the notion of ellipticity. By presenting several examples, we argue that the condition might be of interest for the L^p-theory of elliptic PDE.
12.45 - 13.30
Ljiljana Arambasic
Title: On orthogonalities in Hilbert $C^*$-modules
Abstract: The notion of orthogonality in an arbitrary normed linear
space may be introduced in various ways. Let us mention only the
Birkhoff--James orthogonality and the Roberts orthogonality: if $x, y$
are elements of a normed linear space $X,$ then $x$ is orthogonal to
$y$ in the Birkhoff--James sense if $\|x+\lambda y\|\ge \|x\|$ for all
scalars $\lambda$, and $x$ and $y$ are Roberts orthogonal if
$\|x+\lambda y\|= \|x-\lambda y\|$ for all $\lambda$. A special class
of normed spaces are Hilbert $C^*$-modules where, besides B-J and
R-orthogonality, there is also orthogonality with respect to the
$C^*$-valued inner product. Since the role of scalars in Hilbert
$C^*$-modules is played by the elements of the underlying
$C^*$-algebra, it makes sense to introduce modular versions of BJ and
R-orthogonality and study their relations with existing
orthogonalities in a Hilbert $C^*$-module.