User:David Lehavi: Difference between revisions

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'''Brief academic CV:'''
==Brief academic CV:==
 
Area of Specialization: Algebraic geometry. More specifically: Classical algebraic geometry, moduli spaces, birational geometry.
Area of Specialization: Algebraic geometry. More specifically: Classical algebraic geometry, moduli spaces, birational geometry.


'''Positions:'''
'''Positions:'''
 
* 9/2006 - present : Visiting assistant Professor at the University of Michigan.
9/2006 - present : Visiting assistant Professor at the University of Michigan.
* 9/2005 - 7/2006 : Lecturer at Princeton university.
 
*2002-2005: Zassenhaus assistant professor at Ohio state university.
9/2005 - 7/2006 : Lecturer at Princeton university.
 
2002-2005: Zassenhaus assistant professor at Ohio state university.


'''Education:'''
'''Education:'''
 
* 1997-2002 Ph.D. (accepted December 2002), the Hebrew University.
1997-2002 Ph.D. (accepted December 2002), the Hebrew University.
Thesis: ''Bitangents and 2-level Structure for Curves of Genus 3''.
Thesis: ''Bitangents and 2-level Structure for Curves of Genus 3''.
Adviser: Prof. Ron Livn´e.
Adviser: Prof. Ron Livn´e.
 
* 1994-1997 M.Sc. (magna cum laude) in mathematics, the Hebrew University.
1994-1997 M.Sc. (magna cum laude) in mathematics, the Hebrew University.
Thesis: ''A cohomological view of the Albert Hasse Brauer Noether theorem''.
Thesis: ''A cohomological view of the Albert Hasse Brauer Noether theorem''.
Adviser: Prof. Ehud De-Shalit.
Adviser: Prof. Ehud De-Shalit.
 
* 1991-1994 B.Sc. (summa cum laude) in mathematics, the Hebrew University.
1991-1994 B.Sc. (summa cum laude) in mathematics, the Hebrew University.


'''Research papers:'''
'''Research papers:'''
 
* ''Formulas for the arithmetic geometric mean of curves of genus 3'', joint with C. Ritzenthaler.
''Formulas for the arithmetic geometric mean of curves of genus 3'', joint with C. Ritzenthaler.
Accepted to Experimental Math.
Accepted to Experimental Math.
Preprint available online at math.AG/0403182.
Preprint available online at math.AG/0403182.
 
* ''Any smooth plane quartic can be reconstructed from its bitangents''.
''Any smooth plane quartic can be reconstructed from its bitangents''.
Israel J. Math. 146 (2005), 371–379.
Israel J. Math. 146 (2005), 371–379.
Earlier version available online at math.AG/0111017.
Earlier version available online at math.AG/0111017.


'''Expository papers:'''
'''Expository papers:'''
 
*Mikhalkin’s classification of M-curves in maximal position with respect to three lines.
Mikhalkin’s classification of M-curves in maximal position with respect to three lines.
AMS proceedings volume of Snowbird Joint Summer Research Conference Algebraic Geometry: Presentations by Young Researchers.
AMS proceedings volume of Snowbird Joint Summer Research Conference Algebraic Geometry: Presentations by Young Researchers.


== Currently working on ==
[[elliptic curves]]


[[Category:CZ Authors|Lehavi, David]]
[[Category:CZ Authors|Lehavi, David]]
[[Category:Mathematics Authors|Lehavi, David]]
[[Category:Mathematics Authors|Lehavi, David]]

Revision as of 22:30, 17 February 2007

Brief academic CV:

Area of Specialization: Algebraic geometry. More specifically: Classical algebraic geometry, moduli spaces, birational geometry.

Positions:

  • 9/2006 - present : Visiting assistant Professor at the University of Michigan.
  • 9/2005 - 7/2006 : Lecturer at Princeton university.
  • 2002-2005: Zassenhaus assistant professor at Ohio state university.

Education:

  • 1997-2002 Ph.D. (accepted December 2002), the Hebrew University.

Thesis: Bitangents and 2-level Structure for Curves of Genus 3. Adviser: Prof. Ron Livn´e.

  • 1994-1997 M.Sc. (magna cum laude) in mathematics, the Hebrew University.

Thesis: A cohomological view of the Albert Hasse Brauer Noether theorem. Adviser: Prof. Ehud De-Shalit.

  • 1991-1994 B.Sc. (summa cum laude) in mathematics, the Hebrew University.

Research papers:

  • Formulas for the arithmetic geometric mean of curves of genus 3, joint with C. Ritzenthaler.

Accepted to Experimental Math. Preprint available online at math.AG/0403182.

  • Any smooth plane quartic can be reconstructed from its bitangents.

Israel J. Math. 146 (2005), 371–379. Earlier version available online at math.AG/0111017.

Expository papers:

  • Mikhalkin’s classification of M-curves in maximal position with respect to three lines.

AMS proceedings volume of Snowbird Joint Summer Research Conference Algebraic Geometry: Presentations by Young Researchers.

Currently working on

elliptic curves