We give an affirmative answer to the Grunwald problem for new families of nonsolvable finite groups G , away from the set of primes dividing | G | . Furthermore, we show that such G verify the condition (BM), that is, the Brauer–Manin obstruction to weak approximation is the only one for quotients of SL n by G . These new families include extensions of groups satisfying (BM) by kernels which are products of symmetric groups 𝔖 m , with m ≠ 2 , 6 , and alternating groups 𝔄 5 . We also investigate (BM) for small groups by giving an explicit list of small order groups for which (BM) is unknown and we show that for many of them (BM) holds under Schinzel’s hypothesis.
Boughattas et al. (Thu,) studied this question.