Operator gradient of divergencie in subspaces of L2(G) space

Abstract

The author studies the structure of space L 2 (G) of vector-valued functions that are square integrable in a bounded connected domain G of the three-dimensional space with a smooth boundary and the role of gradient divergence operators and the rotor in the construction of bases in subspaces A and B . The self-adjointness of the extension N d of operator ∇ div to the subspace A γ ⊂ A and the basicity system of its own functions. Written explicit formulas for solving the spectral problem in a ball and the conditions for the decomposition vector-functions in a Fourier series in eigenfunctions gradient of divergence. The solvability of the boundary tasks: ∇ div \, u + λ \, u = f in G , ( n · u) | = g in Sobolev spaces H s (G) of order s ≥ 0 and in subspaces. In passing, similar results for the operator of the rotor and its symmetric extension S to B .