BLOW-UP CRITERIA FOR THE 3D CUBIC NONLINEAR ¨ SCHRODINGER EQUATION JUSTIN HOLMER, RODRIGO PLATTE, AND SVETLANA ROUDENKO Abstract. We consider solutions u to the 3d nonlinear Schr¨odinger equation i∂t u+

Source URL: www.math.brown.edu

• Spectral theory
• Mathematics
• Multivariable calculus
• Partial differential equation
• Wave equation
• Mathematical analysis
• Operator theory
• Ordinary differential equations

ERRATA FOR “A SHARP CONDITION FOR SCATTERING OF ¨ THE RADIAL 3D CUBIC NONLINEAR SCHRODINGER EQUATION” JUSTIN HOLMER AND SVETLANA ROUDENKO

Source URL: www.math.brown.edu

SCATTERING FOR THE NON-RADIAL 3D CUBIC NONLINEAR ¨ SCHRODINGER EQUATION THOMAS DUYCKAERTS, JUSTIN HOLMER, AND SVETLANA ROUDENKO

Source URL: www.math.brown.edu

Science Instruction with the use of Information Communication Technologies –

Source URL: micro-kosmos.uoa.gr

• Quantum mechanics
• Quantum electrodynamics
• Bohr model
• Niels Bohr
• Introduction to quantum mechanics
• Electron
• Wave–particle duality
• Atomic theory
• Schrödinger equation
• Physics
• Atomic physics
• Introductory physics

A CLASS OF SOLUTIONS TO THE 3D CUBIC NONLINEAR ¨ SCHRODINGER EQUATION THAT BLOW-UP ON A CIRCLE JUSTIN HOLMER AND SVETLANA ROUDENKO Abstract. We consider the 3d cubic focusing nonlinear Schr¨odinger equation

Source URL: www.math.brown.edu

• Analytic number theory
• Elliptic curve
• Group theory
• Operator theory
• Spectral theory
• Spectral theory of ordinary differential equations
• Frobenius method
• Mathematical analysis
• Ordinary differential equations
• Mathematics

LOW REGULARITY GLOBAL WELL-POSEDNESS FOR THE ¨ ZAKHAROV AND KLEIN-GORDON-SCHRODINGER SYSTEMS JAMES COLLIANDER, JUSTIN HOLMER, AND NIKOLAOS TZIRAKIS Abstract. We prove low-regularity global well-posedness for the 1d Zakh

Source URL: www.math.brown.edu

• Symbol
• Wave equation
• Vehicle Identification Number
• Contraction
• Projection
• Mathematical analysis
• Operator theory
• Wave mechanics

J Comput Electron[removed]:65–97 DOI[removed]s10825[removed]Density-gradient theory: a macroscopic approach to quantum confinement and tunneling in semiconductor devices M.G. Ancona

Source URL: www.nrl.navy.mil

• Equations
• Partial differential equations
• Thermodynamics
• Schrödinger equation
• Ideal gas
• Electron
• Perturbation theory
• Density functional theory
• Momentum
• Physics
• Quantum mechanics
• Introductory physics

Curriculum Vitae Office[removed] – [removed]

Source URL: www.fsb.unizg.hr

• Biomechanics and Modeling in Mechanobiology
• Royal Institute of Technology
• Graz University of Technology
• Erwin Schrödinger
• University of Graz
• Biomechanics
• Graz
• Institute of technology
• Education
• Academia
• Knowledge

Stable Perturbations Jeremy Marzuola Stable perturbations of a minimal mass soliton for a saturated NLSE in 3d

Source URL: jessica2.msri.org

• Mathematical analysis
• Solitons
• Partial differential equations
• Stability theory
• Nonlinear Schrödinger equation
• Linearization
• Nonlinear system
• Differential equation
• Lyapunov stability
• Calculus
• Dynamical systems
• Physics

ON THE RIGOROUS DERIVATION OF THE 2D CUBIC NONLINEAR ¨ SCHRODINGER EQUATION FROM 3D QUANTUM MANY-BODY DYNAMICS XUWEN CHEN AND JUSTIN HOLMER

Source URL: www.math.brown.edu

• Mathematics
• Proof theory
• Constructible universe
• Mathematical logic
• Ordinal numbers