This paper presents a rigorous functional-analytic proof of the compactness of theresolvent of the modified Dirac operator D = −i(x*d/dx + 1/2)on the space of adelic commensurabilityclasses AQ/Q∗. The justification relies on the compactness of the non-Archimedean topology of the ring of integral adeles bZ, the embedding of weighted Sobolevspaces, Schauder’s finite-rank approximation criterion, and the theory of KMS states onC∗-algebras. The proven compactness implies a purely discrete and real character of theeigenvalue spectrum, which eliminates the existence of de Branges defects and fixes thezeros of the Riemann zeta function on the critical line.
Ilgiz Murtazin (Sat,) studied this question.