\BOOKMARK [1][-]{section.1}{Introduction}{}% 1
\BOOKMARK [2][-]{subsection.1.1}{Generalized f-factorial functions}{section.1}% 2
\BOOKMARK [3][-]{subsubsection.1.1.1}{Definitions}{subsection.1.1}% 3
\BOOKMARK [3][-]{subsubsection.1.1.2}{Special cases}{subsection.1.1}% 4
\BOOKMARK [3][-]{subsubsection.1.1.3}{New results proved in the article}{subsection.1.1}% 5
\BOOKMARK [2][-]{subsection.1.2}{Definitions of generalized f-factorial Stirling numbers}{section.1}% 6
\BOOKMARK [1][-]{section.2}{Generating functions and expansions by f-harmonic numbers}{}% 7
\BOOKMARK [2][-]{subsection.2.1}{Motivation from a technique of Euler}{section.2}% 8
\BOOKMARK [2][-]{subsection.2.2}{Generating the integer order f-harmonic numbers}{section.2}% 9
\BOOKMARK [2][-]{subsection.2.3}{Expansions of the generalized coefficients by f-harmonic numbers}{section.2}% 10
\BOOKMARK [2][-]{subsection.2.4}{Combinatorial sums and functional equations for the f-harmonic numbers}{section.2}% 11
\BOOKMARK [1][-]{section.3}{Coefficient identities and generalized forms of the Stirling convolution polynomials}{}% 12
\BOOKMARK [2][-]{subsection.3.1}{Generalized Coefficient Identities and Relations}{section.3}% 13
\BOOKMARK [2][-]{subsection.3.2}{Generalized forms of the Stirling convolution polynomials}{section.3}% 14
\BOOKMARK [3][-]{subsubsection.3.2.1}{An experimental procedure towards evaluating the generalized polynomials}{subsection.3.2}% 15
\BOOKMARK [1][-]{section.4}{Conclusions and future research}{}% 16
\BOOKMARK [2][-]{subsection.4.1}{Summary}{section.4}% 17
\BOOKMARK [2][-]{subsection.4.2}{Topics suggested for future research}{section.4}% 18