A Fujikawa Coupling

A Fujikawa Coupling is an example of a Yakawa Coupling. The Fukikawa Coupling is when a one-dimensional superstring bends hermitianly to form a two-dimensional superstring via the Green function. A hermitian gauge-metric is a substringular action that is smooth in topological redistribution in all of the derivatives equal to the number of dimensions that it is differentiating in.

A Yakawa Coupling is a touch, rub, and/or curl of one substringular phenomenon upon another.
A Gliossi norm gauge-metric is a borne tangency of one substringular phenomenon upon another.

A borne tangency is a direct touch. Ward conditions are the multi-dimensional Caucy-like conditions that define the physical boundaries that bear upon the multi-dimensional setting of a substringular phenomenon. Neumann conditions are the direct boundaries of a physical phenomenon. Derichlet conditions are the boundaries of the first derivative of a physical phenomena. When considering the boundaries denoted by alterior derivatives of a physical phenomenon, you have Ward conditions. So, a Fujikawa Coupling is a Yakawa Coupling that produces a Gliossi condition between the two ends of a one-dimensional superstring, allowing for a bend in the associated one-dimensional superstring that is hermitian throughout the given Ward Conditions.