L4-norms and sign changes of Maass forms

Abstract

Unconditionally, we prove the Iwaniec-Sarnak conjecture for L4-norms of the Hecke-Maass cusp forms. From this result, we can justify that for even Maass cusp form φ with the eigenvalue λφ=14+tφ2, for a>0, a sufficiently large h>0 and for any 0<ε1<ε/107 (ε>0) , for almost all 1 k<tφ1-ε, we are able to find βk=\Xk+yi:a<y<a+h\ with -12+k-1tφ1-ε Xk-12+ktφ1-ε such that the number of sign changes of φ along the segment βk is ε tφ1-ε1 as tφ∞. Also, we obtain the similar result for horizontal lines. On the other hand, we conditionally prove that for a sufficiently large segment β on Re(z)=0 and Im(z)>0, the number of sign changes of φ along β is ε tφ1-ε and consequently, the number of inert nodal domains meeting any compact vertical segment on the imaginary axis is ε tφ1-ε as tφ∞.