M-Order generalized Frobenius partitions with M colors

congruences involving 2-colored and 3-colored generalized Frobenius partitions of n which extend the work of George Andrews and Louis Kolitsch.

In this paper an alternative method of sorting M-order, colored generalized Frobenius partitions is presented. As a consequence of this new method of sorting we are able to prove identities relating colored, generalized Frobenius partitions with 2 and 10 colors and those with 3 and 9 colors.

In this paper we present a very simple analytic proof of some congruences for generalized Frobenius partitions with k colors. The proof highlights yet another combinatorial property of these objects.

Eingegangen am 2.9. 1980) DUCHON [S] has investigated the structure theory for convolution algebras of vector-valued meaaures on a compact totally ordered semigroup. The algebra studied in this paper is the algebra of regular BOREL vector-valued measures (with values in a BANACH algebra) on a certai