The backward theory of stochastic transport is elaborated for the case of s
ubcritical systems with a source that emits more than one particle in each
source emission event. Examples of such sources are spontaneous fission sou
rces, such as Cf-252, and, more important, spallation sources. Possible for
ms of the source distribution describing e.g. a spallation source in a thin
target are discussed. The essence of the theory is the generalization of a
formula due to Bartlett, connecting the probability distribution due to a
single particle, with that due to a continuous source, to the case of multi
ple emission sources. From this formula, expressions are derived for first
and second order moments of the particle distribution (or the detector coun
t), induced by a multiple source, expressed as integrals over similar momen
ts of the single-particle induced distribution. These expressions are suita
ble for the calculation of the Feynmann-alpha and Rossi-alpha formulae for
multiple emission sources.