This past week’s class activities brought a lot of moving parts into one place, allowing me to begin operationalizing many of the connecting nodes (i.e., theory) we’ve been absorbing. For example, even as I wrote this last sentence, I began to question whether my use of the term “node” really captures the latent kinesthetic power and potential activity or “motive” (Miller) that node implies through relationship or connectivity. As several of our theorists have expressed (Foucault, Bazerman, Vatz), the action is where our analytical attentions should be focused. Seeing nodes, therefore, as potential activity — whether as a router or a switch (“How Stuff Works”) — is an essential component of fitting all of these puzzle pieces (theory and objects of study) together.
Physics refers to this idea as potential energy, which has been defined as “the stored energy of position possessed by an object” (The Physics Classroom). I seem to be constantly dipping back into the realm of physics (a class I did not pass as an undergraduate — but that’s another story), perhaps demonstrating the viability of network theory as a way to connect not only concepts but actions as well (thinking here of interdisciplinary work).
In the mindmap for this week, that idea of nodes being storehouses of energy (or knowledge, as the case may be) fits some of the connections I found myself making as I reviewed our classroom notes. The discussions of theory application and function reinforced the “power of analogy” that theory can provide. In an earlier post, I asked the question, “Is that what theory is? A metaphoric framework whereby we take an existing accepted structural system and treat it as an analogy-based means of translating knowledge or data?” Perhaps it is, indeed.