On decomposing Betti tables and O-sequences

The Boij-S\"oderberg characterization decomposes a Betti table into a unique positive integral linear combination of pure diagrams. Given a module with a pure resolution, we describe explicit formulae for computing the decomposition of the Betti table of the module given the decomposition of the truncation of the Betti table, and vice versa. Nagel and Sturgeon described the decomposition of Betti tables of ideals with $d$-linear resolutions; indeed, the coefficients are precisely finite $O$-sequences. Using the extension formulae, we provide an explicit description of the coefficients of the decomposition of the Betti table of the quotient ring of such an ideal. Following from this, we describe the closed convex simplicial cone of $O$-sequences.