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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

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

Engineering & Materials Science

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