On the approximation of electromagnetic fields by edge finite elements. Part 1: Sharp interpolation results for low-regularity fields

We propose sharp results on the numerical approximation of low-regularity electromagnetic fields by edge finite elements. We consider general geometrical settings, including topologically non-trivial domains or domains with a non-connected boundary. In the model, the electric permittivity and magnetic permeability are symmetric, tensor-valued, piecewise smooth coefficients. In all cases, the error can be bounded by hδhδ times a constant, where hh is the meshsize, for some exponent δ∈]0,1]δ∈]0,1] that depends both on the geometry and on the coefficients. It relies either on classical estimates when δ>1/2δ>1/2, or on a new combined interpolation operator when δ<1/2δ<1/2. The optimality of the value of δδ is discussed with respect to abstract shift theorems. In some simple configurations, typically for scalar-valued permittivity and permeability, the value of δδ can be further characterized. This paper is the first one in a series dealing with the approximation of electromagnetic fields by edge finite elements.