The single-point spectrum operators satisfying Ritt's resolvent condition (Q2717569)

Let us recall that Ritt's condition for the resolvent \(R(\lambda,T) = (T-\lambda I)^{-1}\). Of a bounded linear operator \(T\) in a complex Banach space \(X\) is NEWLINE\[NEWLINE\|R(\lambda,T)\|\leq \frac{C}{|\lambda-1|} ,\quad |\lambda|>1NEWLINE\]NEWLINE where \(C\) is a constant \(C > 1\). In this article the author proved that if \(X = L_p (0,1)1\leq p \leq\infty\) and \(T\) satisfies Ritt's condition then \(T\) has single point spectrum. Moreover the author showed that the maximal sector for the extended resolvent condition can be prescribed a prior jointly with the corresponding order of the exponential growth of the resolvent in the complementary sector.