A new class of non-aligned Einstein-Maxwell solutions with a geodesic, shearfree and non-expanding multiple Debever-Penrose vector

Abstract

In a recent study [NVdB2017] of algebraically special Einstein-Maxwell fields it was shown that, for non-zero cosmological constant, non-aligned solutions cannot have a geodesic and shearfree multiple Debever-Penrose vector k. When =0 such solutions do exist and can be classified, after fixing the null-tetrad such that 0 = 1 = 1 = 0 and 0 = 1, according to whether the Newman-Penrose coefficient π is 0 or not. The family π = 0 contains the Griffiths solutions (Griffiths 1986), with as sub-families the Cahen-Spelkens, Cahen-Leroy and Szekeres metrics. It was claimed in [Griffiths 1986] and repeated in [NVdB2017] that for π = 0 both null-rays k and l are non-twisting: while it is certainly true that μ () = 0, the case μ = 0 appears to have been overlooked. A family of solutions is presented in which k is twisting but non-expanding.