Certain logarithmic integrals, including solution of Monthly problem #tbd, zeta values, and expressions for the Stieltjes constants

Abstract

We solve problem x proposed by O. Oloa, AMM xxx 2012 119? (to appear), p. yyy for certain definite logarithmic integrals. A number of generating functions are developed with certain coefficients pn, and some extensions are presented. The explicit relation of pn to N\"orlund numbers Bn(n) is discussed. Certain inequalities are conjectured for the \pn\ sequence of coefficients, including its convexity, and an upper bound is demonstrated. It is shown that pn values may be used to express the Stieltjes constants for the Hurwitz and Riemann zeta functions, as well as values of these zeta functions at integer argument. Other summations with the pn coefficients are presented.