Emil J. Straube Explained

Emil J. Straube
Birth Place:	Flums, Switzerland
Nationality:	Swiss; American
Alma Mater:	ETH Zurich
Fields:	Mathematics
Workplaces:	Texas A&M University
Doctoral Advisor:	Konrad Osterwalder
Thesis Title:	Cauchy-Riemann distributions and boundary values of analytic functions (1983)
Awards:	Stefan Bergman Prize (1995)

Emil Josef Straube is a Swiss and American mathematician.

Education and career

He received from ETH Zurich in 1977 his diploma in mathematics^[1] and in 1983 his doctorate in mathematics. For the academic year 1983–1984 Straube was a visiting research scholar at the University of North Carolina at Chapel Hill. He was a visiting assistant professor from 1984 to 1986 at Indiana University Bloomington and from 1986 to 1987 at the University of Pittsburgh. From 1996 to the present, he is a full professor at Texas A&M University, where he was an assistant professor from 1987 to 1991 and an associate professor from 1991 to 1996; from 2011 to the present, he is the head of the mathematics department there. He has held visiting research positions in Switzerland, Germany, the US, and Austria.^[1]

In 1995 he was a co-winner, with Harold P. Boas, of the Stefan Bergman Prize of the American Mathematical Society. In 2006 Straube was an invited speaker at the International Congress of Mathematicians in Madrid.^[2] In 2012 he was elected a fellow of the American Mathematical Society.^[3]

Selected publications

Articles

Harmonic and analytic functions admitting a distribution boundary value. Annali della Scuola Normale Superiore di Pisa-Classe di Scienze. 1984 . 11. 4. 559–591. Straube . Emil J. .
with H. P. Boas: Integral inequalities of Hardy and Poincaré type. Proceedings of the American Mathematical Society. 1988. 103. 1. 172–176. 10.1090/S0002-9939-1988-0938664-0. free. Boas. Harold P.. Straube. Emil J..
with H. P. Boas: Sobolev estimates for the
\overline{\partial}

-Neumann operator on domains in
C

ⁿ admitting a defining function that is plurisubharmonic on the boundary. Mathematische Zeitschrift. 206. 1. 81–88. 10.1007/BF02571327. 123468230.
with H. P. Boas: Sobolev estimates for the complex Green operator on a class of weakly pseudoconvex boundaries. Communications in Partial Differential Equations. 16. 10. 1991. 1573–1582. 10.1080/03605309108820813. Boas. Harold P.. Straube. Emil J..
Good Stein neighborhood bases and regularity of the
\overline{\partial}

-Neumann problem. Illinois Journal of Mathematics. 2001. 45. 3. 865–871. 10.1215/ijm/1258138156. free.
with Siqi Fu: Semi-classical analysis of Schrödinger operators and compactness in the
\overline{\partial}

-Neumann problem. Journal of Mathematical Analysis and Applications. 2002. 271. 1. 267–282. 10.1016/S0022-247X(02)00086-0. math/0201149. Fu. Siqi. Straube. Emil J..
with Marcel K. Sucheston: Levi foliations in pseudoconvex boundaries and vector fields that commute approximately with
\overline{\partial}

. Trans. Amer. Math. Soc.. 355. 2003. 143–154. 10.1090/S0002-9947-02-03133-1. free.
A sufficient condition for global regularity of the
\overline{\partial}

-Neumann operator. Advances in Mathematics. 2008. 217. 3. 1072–1095. 10.1016/j.aim.2007.08.003. free.

Books

Book: Lectures on the
L

²-Sobolev theory of the
\overline{\partial}

-Neumann problem. Lectures in Mathematics and Physics, volume 7. 2010. European Mathematical Society. 9783037190760.

Notes and References

Web site: Curriculum Vitae: Emil Straube. Mathematics Department, Texas A&M University. 2018-09-19. 2018-09-19. https://web.archive.org/web/20180919211402/http://www.math.tamu.edu/~emil.straube/vita.pdf. dead.
Book: Proceedings of the International Congress of Mathematicians, (Madrid, 2006). Aspects of the
L

²-Sobolev theory of the
\overline{\partial}

-Neumann problem. Straube, Emil J.. 2006. 1453–1478. 2. European Mathematical Society. math/0601128.
https://www.ams.org/profession/fellows-list List of Fellows of the American Mathematical Society