The question of how we come to accept new theories is a central area of inquiry in scientonomic discourse. However, there has yet to be a formal discussion of the subjective reasons an agent may have for accepting theories. This paper explores these epistemic reasons and constructs a historically sensitive definition of reason. This formulation takes an abstractionist stance towards the ontology of reasons and makes use of a composite basing relation. The descriptive and normative components of reasons are fully formulated in scientonomic terms through the application of the newly introduced notion of implication, and its separation from the notion of inference. In addition, the paper provides scientonomic definitions for sufficient reason, support, and normative inference. The fruitfulness of this formulation of reasons is illustrated by a few examples. Suggested Modifications [Sciento-2019-0009]: Accept the following definition of implication: Implication ≡ a logical transition from one theory to another. [Sciento-2019-0010]: Accept the following definitions of sufficient reason, reason, support, and normative inference: Sufficient Reason ≡ an agent takes theory A to be a sufficient reason for (accepting) theory B iff the following four conditions are met: (1) The agent accepts A. (2) The agent accepts that A→B. (3) The agent employs ε. (4) The agent accepts (ε, A, A→B) →ε (Should accept B). Support ≡ an agent takes theory A to be supporting theory B iff the agent accepts A and accepts that A→B. Reason ≡ an agent takes theory A to be a reason for theory B iff the agent accepts that A→B, employs ε, and accepts (ε, A, A→B) →ε (Should accept B). Normative Inference ≡ An agent takes theory A to normatively infer theory B iff the agent accepts A, accepts that A→B, and accepts (ε, A, A→B) →ε (Should accept B). [Sciento-2019-0011]: Provided that modification [Sciento-2019-0010] is accepted, accept the sufficient reason theorem and its deduction from the definition of sufficient reason and the second law: Sufficient Reason theorem: a theory becomes accepted by an agent, when an agent has a sufficient reason for accepting it. Accept the following question as a legitimate topic of scientonomic inquiry: Theory Acceptance without Sufficient Reason: how do theories become accepted without a sufficient reason, i.e. in the cases of circularity or theories without a reason?
This paper presents a diagrammatic notation for visualizing epistemic entities and relations. The notation was created during the Visualizing Worldviews project funded by the University of Toronto’s Jackman Humanities Institute and has been further developed by the scholars participating in the university’s Research Opportunity Program. Since any systematic diagrammatic notation should be based on a solid ontology of the respective domain, we first outline the current state of the scientonomic ontology. We then proceed to providing diagrammatic tools for visualizing the epistemic entities and relations of this ontology. These basic diagramming techniques allow us to construct diagrams of various types for both synchronic and diachronic visualizations. The paper concludes by highlighting some future research directions. As the notation presented here is de facto accepted and used in scientonomy, the paper suggests no modifications.
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