Number |
Name, place and date |
1 |
. D Kalaj Harmonic mappings between convex domains
X Congress of Yugoslav Mathematicians, Beograd, Yugoslavia, January 2001
|
2 |
D. Kalaj, On Quasiconformal harmonic function of the unit disk onto a convex domain,
Rom-Finn.Seminar, 2001, Brasov, Rumunija
|
3 |
D Kalaj 5 International symposium of on mathematical analysis and its applictaions,
MAA5, Niška Banja, October 2-6 , 2002
|
4 |
D Kalaj, On the Nitsche’s conjecture for harmonic
mappings in R2 and in R3.
986 TH AMS Meeting, Courant Institute New York,
April 12-13, 2003 page 48-48
|
5 |
D Kalaj, M Pavlovic: Boundary correspondence
under harmonic quasiconformal mapping of the halfplane,
The book of abstract of X1 Congress of
Yugoslav Mathematicians, page 32, Petrovac,Octobar 2004.
|
6 |
D. Kalaj, On the first and on the radial derivative of
harmonic function defined on the unit ball,
Proceedings of the Workshop devoted to 25
anniversary of the Faculty of Natural Sciences and
mathematics, University of Montenegro, Septembar
2005.
|
7 |
D Kalaj, On the univalent solution of PDE ?u=f
between spherical annuli, The book of abstracts of
Harmonic Analysis and partial Differential Equations,
June 27-July 1, 2005, Keil, Germany.
|
8 |
D Kalaj, Harmonic and quasiconformal maps,
Extremal Problems in Complex and Real Analysis,
Peoples Friendship University of Russia Moscow,
Russia May 22-26, 2007. The book of abstracts.
|
9 |
D Kalaj, Quasiconformal harmonic maps, Seminar:
Mathematical Colloquim, Beograd 11. 05. 2007.
http://www.mi.sanu.ac.yu/colloquiums/mathcoll_prog
rams/mathcoll.may2007.htm
|
10 |
D. Kalaj, On the univalent solution of PDE ?u=f
between spherical annuli: Seminar: Differential
Equations in Theory and Applications 06.06. 2007
www.math.ntnu.no/seminarer/difta
|
11 |
D. Kalaj, On quasiconformal harmonic mappings,
Congress in memory of Adrien Douady, Paris, France Maj, 2008.
|
12 |
D. Kalaj, Mini conference on quasiconformal harmonic mappings,
Beograd, Srbija, 2009, septembar.
|
13 |
D. Kalaj: Deformation of annuli under smallest mean distortion on Riemann surfaces, Workshop on Quasiconformal mappings and Mappings of finite distortion, Prague, September 2011, Predavanje od 30 minuta (http://www.karlin.mff.cuni.cz/workshopprague2011/2011/talks.html).
|
14 |
D. Kalaj: Deformation of annuli under smallest mean distortion on Riemann surfaces and generalization of J. C. C. Nitsche Conjecture,
Workshop on Complex Analysis, Belgrade, February 2012. Predavanje po pozivu. (http://www.matf.bg.ac.rs/lat/vesti/731/mini-workshop-complex-analysis-and-applications-27-28-februar-2012/)
|
15 |
D. Kalaj: Deformations of Annuli on Riemann surfaces and the generalization of Nitsche conjecture and Quasiconformal harmonic mappings,
International Conference on Complex Analysis and Related Topics, Romania, Ploiesti 2012. http://imar.ro/RoFinSem2012/conf.php
Romanian finish seminar. Plenarno predavanja od 45 minuta.
|
16 |
D. Kalaj: Deformations of Annuli on Riemann surfaces and the generalization of Nitsche conjecture and Quasiconformal harmonic mappings, New Trends in Complex Analysis and Related Domains Exploratory Workshop, Ploiesti, Romania, June 27 - 29, 2012. Plenarno predavanja od 45 minuta. (http://imar.ro/WE-RoFinSem12/Workshop2012.php)
|
17 |
D. Kalaj: Deformations of Annuli on Riemann surfaces and the generalization of Nitsche conjecture,
The 6th European Congress of Mathematics, 2012, Krakow, Poljska. Poster sekcija (http://www.6ecm.pl/en/programme/posters).
|
18 |
David Kalaj: Cauchy transform and Poisson equation, Helsinki seminar of analysis, Finksa (8.10. 2012) Predavanje u trajanju od 90 minuta.
https://wiki.helsinki.fi/display/Analysis/Analysis+Seminar+2012-2013)
|
19 |
David Kalaj: Cauchy transform and Poisson equation, Turku analysis seminar, Finska (4.10. 2012) http://users.utu.fi/ripekl/seminar/index.html
|
20 |
David Kalaj, Energy-minimal diffeomorphisms between doubly connected Riemann surfaces, "Conference on Riemann surfaces and Kleinian
groups", which will be held in Osaka University, Japan, from January 12 to January 14. 2013.
|