New approach in the Besov space to the existence and uniqueness of solutions of the D-dimensional fractional magnetic B\'enard system without thermal diffusion
Abstract
This work investigates the existence and uniqueness of local weak solutions for the d-dimensional (d ≥ 2) fractional magnetic B\'enard system without thermal diffusion, integrating the B\'enard equation and MHD system. For = 0 and 1 ≤ α=β < 1 + d4, we establish that any starting conditions (u0,B0)∈ B2,11+d2-2α(Rd) and θ0∈ B2,11+d2-α(Rd).
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