Preasymptotic error estimates of higher-order EEM for the time-harmonic Maxwell equations with large wave number

Abstract

The time-harmonic Maxwell equations with impedance boundary condition and large wave number are discretized using the second-type N\'ed\'elec's edge element method (EEM). Preasymptotic error bounds are derived, showing that, under the mesh condition 2p+1h2p being sufficiently small, the error of the EEM of order p in the energy norm is bounded by O(php + 2p+1h2p), while the error in the -scaled L2 norm is bounded by O(( h)p+1 + 2p+1 h2p). Here, is the wave number and h is the mesh size. Numerical tests are provided to illustrate our theoretical results.

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