Valentin Zakharevich scite author profile

Valentin Zakharevich

3Publications

10Citation Statements Received

49Citation Statements Given

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Affiliations

The University of Texas at Austin, University of Paris-Sud, Institut Polytechnique de Paris

Publications

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Isoperimetric inequalities for wave fronts and a generalization of Menzin's conjecture for bicycle monodromy on surfaces of constant curvature

Howe

Pancia

Zakharevich

2011

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ABSTRACT. The classical isoperimetric inequality relates the lengths of curves to the areas that they bound. More specifically, we have that for a smooth, simple closed curve of length L bounding area A on a surface of constant curvature c,with equality holding only if the curve is a geodesic circle. We prove generalizations of the isoperimetric inequality for both spherical and hyperbolic wave fronts (i.e. piecewise smooth curves which may have cusps). We then discuss "bicycle curves" using the generalized isoperimetric inequalities. The euclidean model of a bicycle is a unit segment AB that can move so that it remains tangent to the trajectory of point A (the rear wheel is fixed on the bicycle frame), as discussed in [5], [12], and [8]. We extend this definition to a general Riemannian manifold, and concern ourselves in particular with bicycle curves in the hyperbolic plane H 2 and on the sphere S 2 . We prove results along the lines of those in [8] and resolve both spherical and hyperbolic versions of Menzin's conjecture, which relates the area bounded by a curve to its associated monodromy map.

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Localization and stationary phase approximation on supermanifolds

Zakharevich

2017

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Given an odd vector field Q on a supermanifold M and a Q-invariant density µ on M , under certain compactness conditions on Q, the value of the integral M µ is determined by the value of µ on any neighborhood of the vanishing locus N of Q. We present a formula for the integral in the case where N is a subsupermanifold which is appropriately non-degenerate with respect to Q.In the process, we discuss the linear algebra necessary to express our result in a coordinate independent way. We also extend stationary phase approximation and the Morse-Bott Lemma to supermanifolds.

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K-theoretic computation of the Verlinde ring

Zakharevich¹

2018

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