Research output: Contribution to journal › Article › peer-review
On the maximal L_p-L_q regularity theorem for the linearized electro-magnetic field equations with interface conditions. / Frolova, E.V.; Shibata, Yoshihiro.
In: ЗАПИСКИ НАУЧНЫХ СЕМИНАРОВ САНКТ-ПЕТЕРБУРГСКОГО ОТДЕЛЕНИЯ МАТЕМАТИЧЕСКОГО ИНСТИТУТА ИМ. В.А. СТЕКЛОВА РАН, Vol. 489, 2020, p. 130-172.Research output: Contribution to journal › Article › peer-review
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TY - JOUR
T1 - On the maximal L_p-L_q regularity theorem for the linearized electro-magnetic field equations with interface conditions
AU - Frolova, E.V.
AU - Shibata, Yoshihiro
PY - 2020
Y1 - 2020
N2 - This paper deals with the maximal L_p-L_q regularity theorem for the linearized electro-magnetic field equations with interface conditions and perfect wall condition. This problem is motivated by linearization of the coupled magnetohydrodynamics system, which generates two separate problems. The first problem is associated with the well studied Stokes system. Another problem related to the magnetic field is studied in this paper. The maximal L_p-L_q regularity theorem for the Stokes equations with interface and non-slip boundary conditions has been proved by Pruess and Simonett [15], Maryani and Saito [12]. Combination of these results and the result obtained in this paper yields local well-posedness for MHD problem in the case of two incompressible liquids separated by a closed interface. We plan to prove it in a forthcoming paper. The main part of the paper is devoted to proving the existence of \mathcal{R} bounded solution operators associated with the generalized resolvent problem. The maximal L_p-L_q regularity is established by applying the Weis operator valued Fourier multiplier theorem.
AB - This paper deals with the maximal L_p-L_q regularity theorem for the linearized electro-magnetic field equations with interface conditions and perfect wall condition. This problem is motivated by linearization of the coupled magnetohydrodynamics system, which generates two separate problems. The first problem is associated with the well studied Stokes system. Another problem related to the magnetic field is studied in this paper. The maximal L_p-L_q regularity theorem for the Stokes equations with interface and non-slip boundary conditions has been proved by Pruess and Simonett [15], Maryani and Saito [12]. Combination of these results and the result obtained in this paper yields local well-posedness for MHD problem in the case of two incompressible liquids separated by a closed interface. We plan to prove it in a forthcoming paper. The main part of the paper is devoted to proving the existence of \mathcal{R} bounded solution operators associated with the generalized resolvent problem. The maximal L_p-L_q regularity is established by applying the Weis operator valued Fourier multiplier theorem.
UR - https://elibrary.ru/item.asp?id=46327286
M3 - Article
VL - 489
SP - 130
EP - 172
JO - ЗАПИСКИ НАУЧНЫХ СЕМИНАРОВ САНКТ-ПЕТЕРБУРГСКОГО ОТДЕЛЕНИЯ МАТЕМАТИЧЕСКОГО ИНСТИТУТА ИМ. В.А. СТЕКЛОВА РАН
JF - ЗАПИСКИ НАУЧНЫХ СЕМИНАРОВ САНКТ-ПЕТЕРБУРГСКОГО ОТДЕЛЕНИЯ МАТЕМАТИЧЕСКОГО ИНСТИТУТА ИМ. В.А. СТЕКЛОВА РАН
SN - 0373-2703
ER -
ID: 87276414