Sharp convergence for sequences of nonelliptic Schr\"odinger means

Abstract

We consider pointwise convergence of nonelliptic Schr\"odinger means eitnf(x) for f ∈ Hs(R2) and decreasing sequences \tn\n=1∞ converging to zero, where \[eitn f( x ): = ∫R2 ei( x · + tn 12 )f ( )d .\] We prove that when 0<s < 12, \[ n ∞ eitn f( x ) = f(x) 0.2cm a.e.0.2cm x∈ R2\] holds for all f ∈ Hs( R2 ) if and only if \tn\n=1∞ ∈ r(s), ∞(N), r(s)=s1-s. Moreover, our result remains valid in general dimensions.