It's known, from Ravenel's green book, as well as other sources, that we build formal group laws over a ring from n-buds, where an n-bud is essentially a truncated formal group law (sometimes called a formal group law n-chunk). It is also known that a map of ring spectra $X(n)\to E$ where $X(n)$ is the Thom spectrum associated to the map $\Omega SU(n)\to \Omega SU\simeq BU$, determines an n-bud over $E_\ast$. These spectra are also important in the proof of the celebrated Nilpotence Theorem of chromatic homotopy theory. My question is a rather general one, but begins with wondering why we use $\Omega SU(n)$ rather than $BU(n)$? How different is the former filtration of $BU$ from the latter? Moreover, if we take the Thom spectrum of the inclusion $BU(n)\to BU$, do we still get the $X(n)$? If so, why do Devinatz, Hopkins and Smith use $\Omega SU(n)$ at all? I have a number of questions surrounding this issue, but I guess that's probably enough for now.
Thanks as usual!
-Jon
