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.

- 5 Similar Profiles

Second Order Elliptic Equations
Mathematics

Harnack Inequality
Mathematics

Elliptic Equations
Mathematics

Parabolic Equation
Mathematics

Bellman Equation
Mathematics

Coefficient
Mathematics

Dirichlet Problem
Mathematics

Second Order Equations
Mathematics

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

## Projects 2010 2020

## Riviere-Fabes Symposium 2011

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

1/1/11 → 12/31/11

Project: Research project

## Riviere Fabes Symposium

Sverak, V., Reitich, F. & Safonov, M. V.

2/1/10 → 1/31/11

Project: Research project

## Research Output 1977 2018

## On the boundary estimates for second-order elliptic equations

Safonov, M. V., Aug 3 2018, In : Complex Variables and Elliptic Equations. 63, 7-8, p. 1123-1141 19 p.Research output: Contribution to journal › Article

Second Order Elliptic Equations

Elliptic Equations

Estimate

Nonexistence

Form

## On second order elliptic and parabolic equations of mixed type

Chen, G. & Safonov, M. V., Apr 15 2017, In : Journal of Functional Analysis. 272, 8, p. 3216-3237 22 p.Research output: Contribution to journal › Article

Harnack Inequality

Second Order Elliptic Equations

Elliptic Equations

Parabolic Equation

Strictly positive

## Narrow domains and the harnack inequality for elliptic equations

Safonov, M. V., Jan 1 2016, In : St. Petersburg Mathematical Journal. 27, 3, p. 509-522 14 p.Research output: Contribution to journal › Article

Harnack Inequality

Elliptic Equations

Estimate

Iteration

2
Citations
(Scopus)

## Boundary Harnack principle for second order elliptic equations with unbounded drift

Kim, H. & Safonov, M. V., Nov 1 2011, In : Journal of Mathematical Sciences. 179, 1, p. 127-143 17 p.Research output: Contribution to journal › Article

Boundary Harnack Principle

Second Order Elliptic Equations

Bibliographies

Bounded Domain

Regularity

3
Citations
(Scopus)

## Carleson type estimates for second order elliptic equations with unbounded drift

Kim, H. & Safonov, M. V., Aug 1 2011, In : Journal of Mathematical Sciences. 176, 6, p. 928-944 17 p.Research output: Contribution to journal › Article

Second Order Elliptic Equations

Bibliographies

Regularity Conditions

Positive Solution

Bounded Domain