Daoud Bshouti got his B.sc and D.Sc. degrees in Mathematics, from the Technion, in 1973 and 1976 simultaneously. His research interest is complex function theory, specifically Geoemetric function theory and its applications in harmonic mappings and Statistics. From 1999 to 2010, as academic head of the Landa Project of Equal Opportunities, where they initiated the Education Project for Arab Students at the Technion. Then a member of the Council oh Higher Education steering Committee for Integrating Israeli Arab Students into the Sciences. He served as Vice Dean of the Mathematics Department for Teaching for five years and from 2011 for two years as Dean of Undergraduate Studies at the Technion.
Complex Function Theory,
Specifically Geoemetric Function Theory and Its Applications in Harmonic Mappings and Statistics.
Papers
D. Bshouty, A. Lyzzaik, Uniqueness of Harmonic Mappings into Strictly Starlike Domains, Comput. Methods and Function Thy. 8(2008), 433-446.
D. Bshouty, A. Lyzzaik, Problems and Conjectures in Planar Harmonic Mappings, J. Analysis, 18(2010) 1-13.
D. Bshouty, A. Lyzzaik, Close-to-Convexity Criteria for planar Harmonic Mappings, Complex Anal. Operator Thy., 5(2011), 767-774.
D. Bshouty, A. Lyzzaik and A. Weitsman, On the Boundary Behaviour of Univalent Harmonic Mappings, Ann. Acad. Sci. Fenn. Ser. Math., 37(2012) 135-147.
D. Bshouty and A. Lyzzaik, On a Question of T. Sheil-Small Regarding Valency of Harmonic Maps, Ann. Mariae Curie-Sklodowska Ser. A., 66 (2012), 25-29.
D. Bshouty, S. S. Joshi, S. B. Joshi, On Close-to-Convex Harmonic Mappings, Complex Var. Theory Appl. (2012), 1-5.
D.Bshouty, E. Lundberg and A. Weitsman, A solution to Sheil-Small's harmonic mapping problem for Jordan polygons, Proc. Amer. Math. Soc. 143 (2015), 5219–5225.
D. Aharonov and D. Bshouty, A problem of Bombieri on univalent functions, Comput. Methods Funct. Theory 16 (2016), 677–688.
D. Bshouty, A. Lyzzaik and F. M. Sakar, Harmonic mappings of bounded boundary rotation. Proc. Amer. Math. Soc. 146 (2018), 1113–1121.
D. Bshouty and A. Lyzzaik, A note on the horizontal shears of harmonic mappings. Complex Anal. Operator Thy. (Accepted).
