## About me

Before coming to Weizmann, I was a Postdoctoral Assistant Professor at the University of Michigan. Before that, I was a CRM-ISM Posdoctoral Research fellow at the CRM, Montreal. I received my PhD in 2014 from Tel Aviv University, under the supervision of Prof. Shiri Artstein-Avidan.

My primary research interests lie in Asymptotic Geometric Analysis and Convex Geometry.

My CV is available here

## Papers

- On duality and endomorphisms of lattices of closed convex sets, Adv. Geom. (2011) Vol. 11, Issue 2, pp. 225–239
- Order isomorphisms in cones and a characterization of duality for ellipsoids, Selecta Math. (N.S.) 18 (2011), no. 2, 391–415. (with S. Artstein-Avidan)
- A characterization of duality through section/projection correspondence in the finite dimensional setting, J. Funct. Anal. 261 (2011), no. 11, 3366–3389. (with A. Segal and V. Milman)
- Projections of log-concave functions, Commun. Contemp. Math. 14 (2012), no. 05, 1250036. (with A. Segal)
- Duality on Convex Sets in Generalized Regions. Asymptotic Geometric Analysis, Fields Institute Communications, vol. 68, Springer New York, 2013, pp. 289–298. (with A. Segal)

- On polygons and injective mappings of the plane, Asymptotic Geometric Analysis, Fields Institute Communications, vol. 68, Springer New York, 2013, pp. 299–312.

- A note on Santaló inequality for the polarity transform and its reverse, Proc. Amer. Math. Soc. 143 (2015), no. 4, 1693–1704. (with S. Artstein-Avidan)
- On weighted covering numbers and the Levi-Hadwiger conjecture, Isr. J. Math. (2015) 209: 125. (with S. Artstein-Avidan)
- The fundamental theorems of affine and projective geometry revisited, Commun. Contemp. Math. 19 (2017), no. 05, 1650059. (with S. Artstein-Avidan)

- Approximations of convex bodies by measure-generated sets, to appear in Geom. Ded., arXiv: 1706.07112. (with H. Huang)

- Functional covering numbers, submitted, arXiv:1704.06753. (with S. Artstein- Avidan)
- Ulam floating bodies, submitted, arXiv:1803.08224 (with H. Huang and E. Werner)
- Covering numbers of log-concave functions and related inequalities, in preparation.

## Teaching

**Past Teaching**:

- Math 425 - Introduction to Probability (Winter 2016-18, Fall 2016-17), University of Michigan. Lecture Notes

- Math 115 - Calculus 1 (Fall 2015), University of Michigan

- Math 111- Mathematics for Education students (Winter 2015), McGill University. Lecture Notes

**Past courses TA'd**: