For a real irreducible dual pair \(G\), \(G'\) in a metaplectic group, with \(\text{rank }G\leq \text{rank }G'\), the author constructs an integral kernel operator from the space of invariant eigendistributions on \(G\) to the space of invariant distributions on \(G'\), and conjectures that this operator is compatible with Howe’s correspondence on the level of characters. The construction indicates a direct link between the Cauchy determinant identity and the Howe correspondence.