A graph $H$ is an odd minor of a graph $G$ if $H$ arises from $G$ by first deleting some vertices and edges and then contracting all edges in some edge cut.
Is it known that families of graphs that are characterized by a list of forbidden odd minors are characterized by a finite list of forbidden odd minors?
Yes, this is true, but the result is still being written up by Geelen, Gerards and Whittle as part of their Matroid Minors Project.
Also, for any fixed signed graph $H$, there is a polynomial-time algorithm to test if an input signed graph contains $H$ as a minor. Together with the positive answer to your question, this implies that there is a polynomial-time algorithm to test for any minor-closed property of signed graphs. See my PhD thesis for the algorithm (which works more generally for any $\Gamma$-labelled graph, where $\Gamma$ is a fixed finite abelian group).
In the thesis there is also a mention of the well-quasi-ordering result that you want (Theorem 1.1.9).
