Counting Rational Points on Determinant surfaces and its applications
I will talk about Counting rational points on determinant surfaces $ad-bc =1$ using Analytic Number Theory approach. This problem is directly related to the shifted convolution sum of the restricted divisor function $\tau_X(n)$. Our method also allows us to restrict up to two of the entries to be primes.
Proof Outline, Lazard's theorem and Galois cohomology of $\mathcal{O}_{C}$
Moduli problems and some linear algebra
Convolution identities for divisor functions
In this talk, we consider exact identities for infinite sums of even divisor
functions weighted by Laurent polynomials with logarithms for which the sum is
absolutely convergent. Such identities are motivated by computations in string theory
related to the scattering of 4-gravitons. We show that in general they give Fourier
coefficients of holomorphic cusp forms using the method of holomorphic projection
and discuss an application of spectral techniques to such sums. The talk is based on
Modification of vector bundles
Extremal entropy rigidities for Riemannian metric measure spaces
We extend the work of Ledrappier-Wang and Besson-Courtois-Gallot 's barycenter technique to apply it to RCD measure metric spaces.
We prove minimal and maximal volume entropy rigidity results and express them with a new notion of homotopic degree suitable for RCD spaces.
For example, we show that an RCD(-(N-1), N) space homotopic to a hyperbolic manifold M has total measure bounded below by M's hyperbolic
volume, and equality occurs if and only if the space is isometric to M.
Joint with Dai, Connell, Perales, Núñez Zimbrón, and Wei.
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Multivariable polynomials of knots from Nichols algebras
Using finite dimensional Nichols algebras with automorphisms, we construct R-matrices with entries polynomials in the structure constants of the Nichols algebras. The R-matrices satisfy the Yang-Baxter equation and can be used to define multivariable polynomials of knots that generalize the colored Jones polynomial. For a Nichols algebra of rank 2, we define a sequence of polynomials $V_n(t,q)$ in two variables, whose first knot invariant is the Links-Gould polynomial and the second one $V_2$ is a new polynomial invariant that gives bounds for the Seifert-genus of a knot. Joint work with Rinat Kashaev.
CAT(0) polygonal complexes are 2 median
A (1-)median space is a space in which for every three points the intersection of the three intervals between them is a unique point.
Having this in mind, in the talk I will define a 2-median space which is a 2 dimensional variation of the median space, explain the title
and present the idea of the proof of the theorem in the title.
This talk is based on my Master Thesis done under the supervision of Nir Lazarovich.
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