On the multiplication of spherical functions of reductive spherical pairs of type A

Let G be a simple complex algebraic group and let K G be a reductive subgroup such that the coordinate ring of G=K is a multiplicity free G-module. We consider the G-algebra structure of C[G=K], and study the decomposition into irreducible summands of the product of irreducible G-submodules in C[G=K]. When the spherical roots of G=K generate a root system of type A we propose a conjectural decomposition rule, which relies on a conjecture of Stanley on the multiplication of Jack symmetric functions. With the exception of one case, we show that the rule holds true whenever the root system generated by the spherical roots of G=K is a direct sum of subsystems of rank one.