On inequalities of Bliss-Moser type with loss of compactness in RN

Abstract

We prove the following Limiting Bliss inequalities equation v(0) = 0, ∫01|v'|Ndx=1 ∫01 eβ(es)vN(s)sN-1ds≤ C(N,β), \ for β 1 equation The inequalities are optimal with respect to β 1; there is compactness for β<1, and along the infinitesimal Moser sequence for β = 1. Moreover, we show that the improved inequalities equation v(0) = 0, ∫01|v'|Ndx=1 ∫01 e(es+γes)vN(s)sN-1ds≤ C(N,γ) equation hold for γ≤1, and for γ=1 the inequalities are critical with loss of compactness. The inequalities are optimal: no further improvement in the coefficient of the exponent is possible. The second result extends the result in [J. M. do \'O, B. Ruf and P. Ubilla, A critical Moser type inequality with loss of compactness due to infinitesimal shocks, Calc. Var. Partial Differential Equations 62 (2023)] from N=2 to general dimensions N≥2.