OEIS A000294: Partitions and related series

Today we dive into OEIS A000294, the sequence counting solid partitions of n—and you’ll see how this number sits at a striking crossroads between partitions and 3D geometry. Solid partitions are 3D corner partitions: stacks of unit cubes arranged so counts don’t increase along each axis. Remarkably, the same sequence also counts partitions of n when each part size k comes in k different ‘flavors,’ a weighted viewpoint that expands ordinary partition counting. The two pictures share the same underlying counting rules, revealing a deep isomorphism between combinatorics and spatial structure. We’ll explore the generating function viewpoint—a product-form master recipe that encodes these rules—and discuss recurrences that involve divisor sums, as well as the rich asymptotics governed by constants like the Glaisher–Kinkelin constant and zeta(3). Practical tools—Maple, Mathematica, Sage—make playing with A000294 accessible, inviting you to experiment and see the connections for yourself. Tune in as we glimpse how a single sequence stitches together partitions, 3D geometry, and analytic structure, and then invite you to explore OEIS to discover even more hidden bridges in mathematics.

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