Skip to main navigation
Skip to search
Skip to main content
Heriot-Watt Research Portal Home
Help & FAQ
Home
Profiles
Research units
Research output
Datasets
Impacts
Equipment
Prizes
Activities
Press/Media
Courses
Search by expertise, name or affiliation
Stochastic dissipative PDE's and Gibbs measures
Sergei Kuksin, Armen Shirikyan
School of Mathematical & Computer Sciences
Mathematics
Research output
:
Contribution to journal
›
Article
›
peer-review
92
Citations (Scopus)
Overview
Fingerprint
Fingerprint
Dive into the research topics of 'Stochastic dissipative PDE's and Gibbs measures'. Together they form a unique fingerprint.
Sort by
Weight
Alphabetically
INIS
randomness
100%
stochastic processes
100%
partial differential equations
100%
markov process
75%
chains
75%
space
50%
equations
50%
phase space
50%
compacts
25%
dirichlet problem
25%
nonlinear problems
25%
construction
25%
periodicity
25%
boundary conditions
25%
hydrodynamics
25%
navier-stokes equations
25%
Mathematics
Invariant Measure
100%
PDE
100%
Stochastics
100%
Markov Chain
100%
Phase Space
66%
Random Field
66%
Random Force
33%
Dirichlet Boundary Condition
33%
Navier-Stokes Equation
33%
Finite Frobenius Ring
33%
Bounded Domain
33%
Function Space
33%
Uniqueness Theorem
33%
Main Result
33%