Inverse resonance problems for the Schroedinger operator on the real line with mixed given data

Abstract

In this work, we study inverse resonance problems for the Schr\"odinger operator on the real line with the potential supported in [0,1]. In general, all eigenvalues and resonances can not uniquely determine the potential. (i) It is shown that if the potential is known a priori on [0,1/2], then the unique recovery of the potential on the whole interval from all eigenvalues and resonances is valid. (ii) If the potential is known a priori on [0,a], then for the case a>1/2, infinitely many eigenvalues and resonances can be missing for the unique determination of the potential, and for the case a<1/2, all eigenvalues and resonances plus a part of so-called sign-set can uniquely determine the potential. (iii) It is also shown that all eigenvalues and resonances, together with a set of logarithmic derivative values of eigenfunctions and wave-functions at 1/2, can uniquely determine the potential.