A bstract We define and compute the four-dimensional thermal n -point conformal block in the projection channel using oscillator representations on S_¹ S³ S β 1 × S 3. This is done by evaluating a class of integrals over the homogeneous space D₄ D 4 of the four-dimensional conformal group. We restrict ourselves to scalar external operators and scalar exchange. In the low-temperature limit, our result reduces correctly to the vacuum (n + 2) -point block in the comb channel. The corresponding expressions can be written as a series of terminating hypergeometric functions or equivalently, a series of weighted SU (2) spin-networks. Alternatively, functions adapted to the SU (2, 2) representation are introduced and some properties are discussed.
Ammon et al. (Tue,) studied this question.