Projects per year

## Fingerprint The fingerprint is based on mining the text of the scientific documents related to the associated persons. Based on that an index of weighted terms is created, which defines the key subjects of research unit

Model
Mathematics

Class
Mathematics

Estimator
Business & Economics

Bandwidth
Business & Economics

Estimate
Mathematics

Smoothing
Business & Economics

Simulation
Mathematics

Sample size
Business & Economics

##
Network
Recent external collaboration on country level. Dive into details by clicking on the dots.

## Profiles

## Projects 1981 2020

## Collaborative Research: Generalized Fiducial Inference for Massive Data and High Dimensional Problems

National Science Foundation (NSF)

9/1/15 → 8/31/18

Project: Research project

High-dimensional

Uncertainty Quantification

Continuation

Uncertainty

Matrix Completion Problem

## Imaging Genomics based Brain Disease Prediction

Kaufer, D. I., Wilhelmsen, K. C., Shen, D., Lee, Y. Z. & Liu, Y.

University of Texas at Arlington

9/1/15 → 4/30/20

Project: Research project

Brain

Imaging techniques

Systems Biology

Genomics

Data integration

## Advancing extreme value analysis of high impact climate and weather events.

National Science Foundation (NSF)

7/1/13 → 6/30/18

Project: Research project

climate effect

weather

climate change

analysis

project

## Research Output 1968 2017

## Continuum limit of critical inhomogeneous random graphs

Bhamidi, S., Sen, S. & Wang, X. Oct 1 2017 In : Probability Theory and Related Fields. 169, 1-2, p. 565-641 77 p.Research output: Research - peer-review › Article

Continuum Limit

Random Graphs

Random graphs

Graph Model

Model

## Energy landscape for large average submatrix detection problems in Gaussian random matrices

Bhamidi, S., Dey, P. S. & Nobel, A. B. Mar 9 2017 (Accepted/In press) In : Probability Theory and Related Fields. p. 1-65 65 p.Research output: Research - peer-review › Article

Energy Landscape

Random Matrices

Energy

Joint distribution

Joint Distribution

2
Citations

## Exact duals and short certificates of infeasibility and weak infeasibility in conic linear programming

Liu, M. & Pataki, G. Apr 10 2017 (Accepted/In press) In : Mathematical Programming. p. 1-46 46 p.Research output: Research - peer-review › Article

Infeasibility

Certificate

Linear programming

Cones

Linear systems