On the parabolic 34 model for the harmonic oscillator: diagrams and local existence
Abstract
We prove the local wellposedness of the (renormalized) parabolic 43 model associated with the harmonic oscillator on R3, that is, the equation formally written as equation* ∂t X + HX= -X3+∞· X + , t>0, x ∈ R3, equation* where H:=-R3 +|x|2 and denotes a space-time white noise. This model is closely related to the Gross-Pitaevskii equation which is used in the description of Bose-Einstein condensation. Our overall formulation of the problem, based on the so-called paracontrolled calculus, follows the strategy outlined by Mourrat and Weber for the 43 model on the three-dimensional torus. Significant effort is then required to adapt, within the framework imposed by the harmonic oscillator, the key tools that contribute to the success of this method-particularly the construction of stochastic diagrams at the core of the dynamics.
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