Calendar - TIMS

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Random Matrices, Strong Szegö's theorem and L functions>

Random Matrices, Strong Szegö's theorem and L functions

Nonparametric and adaptive modeling of dynamic periodicity and trend with heteroscedastic and dependent errors>

Nonparametric and adaptive modeling of dynamic periodicity and trend with heteroscedastic and dependent errors

Statistical Methods for cryo-EM Image Analysis>

Statistical Methods for cryo-EM Image Analysis

Regression Spline: an Average Approach>

Regression Spline: an Average Approach

Heterogeneous Domain Adaptation and Classification by Exploiting the Correlation Subspace>

Heterogeneous Domain Adaptation and Classification by Exploiting the Correlation Subspace

Universality for Coulomb gases>

Universality for Coulomb gases

Zeros of the Riemann Zeta-function (1)>

Zeros of the Riemann Zeta-function (1)

Zeros of the Riemann Zeta-function (2)>

Zeros of the Riemann Zeta-function (2)

Zeros of the Riemann Zeta-function (3)>

Zeros of the Riemann Zeta-function (3)

Modular Blowups and Application to GW Theory — Survey on modular blowups and their applications to Gromov-Witten theory of Calabi-Yau threefold.>

Modular Blowups and Application to GW Theory — Survey on modular blowups and their applications to Gromov-Witten theory of Calabi-Yau threefold.

The stack of stable log maps — A quick review on the basics of log geometry, Olsson's log stacks, and the stack of log curves>

The stack of stable log maps — A quick review on the basics of log geometry, Olsson's log stacks, and the stack of log curves

Mirror theorem, Seidel representation, and holomorphic disks.>

Mirror theorem, Seidel representation, and holomorphic disks.

Modular Blowups and Application to GW Theory — Why modular blowups work?>

Modular Blowups and Application to GW Theory — Why modular blowups work?

The stack of stable log maps — On the construction of the stack of log maps>

The stack of stable log maps — On the construction of the stack of log maps

Introduction>

Introduction
Exponential -Kloosterman Sums>

Exponential -Kloosterman Sums>

Exponential -Kloosterman Sums
Arithmetic Functions>

Arithmetic Functions>

Arithmetic Functions

Modular Blowups and Application to GW Theory — Applications to higher genus GW numbers of quintic threefolds.>

Modular Blowups and Application to GW Theory — Applications to higher genus GW numbers of quintic threefolds.

The stack of stable log maps — Properties and examples of the stacks of log maps (finiteness, product structures, and decomposition formula)>

The stack of stable log maps — Properties and examples of the stacks of log maps (finiteness, product structures, and decomposition formula)

Prime Number Theorem>

Prime Number Theorem

Subconvexity bounds for automorphic L-functions (1)>

Subconvexity bounds for automorphic L-functions (1)

Subconvexity bounds for automorphic L-functions (2)>

Subconvexity bounds for automorphic L-functions (2)

Automorphic forms and L-functions on higher rank groups.>

Automorphic forms and L-functions on higher rank groups.

Subconvexity bounds for automorphic L-functions (3)>

Subconvexity bounds for automorphic L-functions (3)

Subconvexity bounds of L-functions.>

Subconvexity bounds of L-functions.

Subconvexity bounds for automorphic L-functions (4)>

Subconvexity bounds for automorphic L-functions (4)

Subconvexity bounds for automorphic L-functions (5)>

Subconvexity bounds for automorphic L-functions (5)

Subconvexity bounds for automorphic L-functions (6)>

Subconvexity bounds for automorphic L-functions (6)