Adams-Trudinger-Moser inequalities of Adimurthi-Druet type regulated by the vanishing phenomenon and its extremals

Abstract

Let Wm,nm(Rn) with 1 m < n be the standard higher order derivative Sobolev space in the critical exponential growth threshold. We investigate a new Adams-Adimurthi-Druet type inequality on the whole space Rn which is strongly influenced by the vanishing phenomenon. Specifically, we prove equation \|∇m u\|nm^nm+\|u\|nmnm ≤ 1u∈ Wm,nm(Rn) ∫Rn(β (1+α\|u\|nmnm1-γα\|u\|nmnm)mn-m|u|nn-m) dx<+∞. equation where 0 α<1, 0<γ<1α-1 for α>0, ∇m u is the m-th order gradient for u, 0β β0, with β0 being the Adams critical constant, and (t) = et-Σj=0jm,n-2tjj! with jm,n=\j∈N\;:\: j n/m\. In addition, we prove that the constant β0 is sharp. In the subcritical case β<β0, the existence and non-existence of extremal function are investigated for n=2m and attainability is proven for n=4 and m=2 in the critical case β=β0. Our method to analyze the extremal problem is based on blow-up analysis, a truncation argument recently introduced by DelaTorre-Mancini DelaTorre and some ideas by Chen-Lu-Zhu luluzhu20, who studied the critical Adams inequality in R4.