Projects per year

## Fingerprint The Fingerprint is created by mining the titles and abstracts of the person's research outputs and projects/funding awards to create an index of weighted terms from discipline-specific thesauri.

- 2 Similar Profiles

Parabolic Equation
Mathematics

Bellman Equation
Mathematics

Coefficient
Mathematics

Elliptic Equations
Mathematics

Diffusion Process
Mathematics

Finite Difference Approximation
Mathematics

Stochastic Partial Differential Equations
Mathematics

Sobolev Spaces
Mathematics

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

## Projects 2002 2016

- 6 Finished

Diffusion Process

Partial differential equation

Diffusion Process

Partial differential equation

## Riviere-Fabes Symposium 2011

Safonov, M. V., Krylov, N. V. & Sverak, V.

1/1/11 → 12/31/11

Project: Research project

Diffusion Process

Partial differential equation

## Research Output 1964 2019

## A few comments on a result of A. Novikov and Girsanov's theorem

Krylov, N. V., Jan 1 2019, In : Stochastics.Research output: Contribution to journal › Article

Girsanov Theorem

Local Martingale

## All functions are locally s-harmonic up to a small error

Krylov, N. V., Oct 15 2019, In : Journal of Functional Analysis. 277, 8, p. 2728-2733 6 p.Research output: Contribution to journal › Article

Harmonic

Norm

## A note on quasi-convex functions

Krylov, N. V., Jan 1 2019, In : Journal of Convex Analysis. 26, 1, p. 269-273 5 p.Research output: Contribution to journal › Article

Quasiconvex Functions

Smooth function

Convex function

Monotone

## Fully nonlinear elliptic and parabolic equations in weighted and mixed-norm Sobolev spaces

Dong, H. & Krylov, N. V., Aug 1 2019, In : Calculus of Variations and Partial Differential Equations. 58, 4, 145.Research output: Contribution to journal › Article

Mixed Norm Space

Fully Nonlinear Elliptic Equations

Sobolev spaces

Nonlinear Parabolic Equations

Sobolev Spaces

1
Citation
(Scopus)

## On Shige Peng's central limit theorem

Krylov, N. V., Jan 1 2019, In : Stochastic Processes and their Applications.Research output: Contribution to journal › Article

Central limit theorem

Probability Theory

Error Estimates

High-dimensional

Language