Small data scattering of 2d Hartree type Dirac equations

“…As known result for the equation (1.4), Bejenaru and Herr([3]) showed the GWP in H 1 2 (R 2 ). And the known results for the equation (1.5) are in [8,20]. In [20], An author of this paper revealed the LWP in H s (R 2 ) with s > γ−1 2 and 1 ≤ γ < 2.…”

“…In [20], An author of this paper revealed the LWP in H s (R 2 ) with s > γ−1 2 and 1 ≤ γ < 2. It was studied in [8] that global well-posedness and small data scattering holds in H s (R 2 ) for s > γ − 1 and 1 < γ < 2. As related to (1.5), there is a Dirac equation with Yukawa potential.…”

Local well-posedness of Dirac equations with nonlinearity derived from honeycomb structure in 2 dimensions

“…As known result for the equation (1.4), Bejenaru and Herr([3]) showed the GWP in H 1 2 (R 2 ). And the known results for the equation (1.5) are in [8,20]. In [20], An author of this paper revealed the LWP in H s (R 2 ) with s > γ−1 2 and 1 ≤ γ < 2.…”

“…In [20], An author of this paper revealed the LWP in H s (R 2 ) with s > γ−1 2 and 1 ≤ γ < 2. It was studied in [8] that global well-posedness and small data scattering holds in H s (R 2 ) for s > γ − 1 and 1 < γ < 2. As related to (1.5), there is a Dirac equation with Yukawa potential.…”

Local well-posedness of Dirac equations with nonlinearity derived from honeycomb structure in 2 dimensions

“…Recently small data scattering results for the equation (1.5) have been well-known. For instance see [6,7,8,16,17,18] and references therein. We also refer to [10], which concerns global solutions for large H s -data in R 1+2 .…”

Conditional large-data global well-posedness of Dirac equation with Hartree-type nonlinearity

“…x for (1.1) with the Coulomb potential V 0 (x) = 1 4π|x| . In view of [5,19,7], there are trivial scattering conditions of (1.1). However, as observed in [7] for 2D problem, such scattering cannot occur for a certain class of solutions.…”

“…In view of [5,19,7], there are trivial scattering conditions of (1.1). However, as observed in [7] for 2D problem, such scattering cannot occur for a certain class of solutions. To be precise, let us define I as follows:…”

Scattering and non-scattering of the Hartree-type nonlinear Dirac system at critical regularity