Caffarelli-Kohn-Nirenberg inequalities for curl-free vector fields and second order derivatives

Abstract

The present work has as a first goal to extend the previous results in CFL20 to weighted uncertainty principles with nontrivial radially symmetric weights applied to curl-free vector fields. Part of these new inequalities generalize the family of Caffarelli-Kohn-Nirenberg (CKN) inequalities studied by Catrina and Costa in CC from scalar fields to curl-free vector fields. We will apply a new representation of curl-free vector fields developed by Hamamoto in HT21. The newly obtained results are also sharp and minimizers are completely described. Secondly, we prove new sharp second order interpolation functional inequalities for scalar fields with radial weights generalizing the previous results in CFL20. We apply new factorization methods being inspired by our recent work CFL21. The main novelty in this case is that we are able to find a new independent family of minimizers based on the solutions of Kummer's differential equations. We point out that the two types of weighted inequalities under consideration (first order inequalities for curl-free vector fields vs. second order inequalities for scalar fields) represent independent families of inequalities unless the weights are trivial.