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Fingerprint Dive into the research topics where Tohru Ozawa is active. These topic labels come from the works of this person. Together they form a unique fingerprint.

Mathematics

Besov Spaces
Blow-up
Blow-up of Solutions
Cauchy
Cauchy Problem
Decay
Derivative
Energy
Estimate
Existence and Uniqueness
Finite Time Blow-up
Fractional
Gauge
Ginzburg-Landau Model
Global Existence
Global Solution
Global Well-posedness
Hardy Inequality
Hartree Equation
Heat Flow
Infinity
Interaction
Interpolation Inequality
Klein-Gordon Equation
Leibniz' rule
Life Span
Local Solution
Local Well-posedness
Lorentz Spaces
Navier-Stokes
Nonexistence
Nonlinear Equations
Nonlinearity
Regularity
Regularity Criterion
Scattering
Scattering Problems
Schrodinger Equation
Smoothing Effect
Sobolev Spaces
Strichartz Estimates
Strong Solution
Superconductivity
System of equations
Term
Uniqueness
Wave equation
Wave Operator
Weak Solution
Weighted Estimates

Engineering & Materials Science

Boundary conditions
Derivatives
Electric commutators
Gages
Ground state
Initial value problems
Interpolation
Invariance
Magnetohydrodynamics
Navier Stokes equations
Nonlinear equations
Scattering
Sobolev spaces
Superconductivity
Wave equations