i study reality
Reality, in this context, isn't just 'everything' in a colloquial sense, but rather the underlying structure or 'fabric' of the universe as we attempt to understand it through scientific and mathematical models. Mathematics provides us with tools to describe, predict, and understand phenomena that are otherwise intangible or complex.
For instance:
Mathematical Physics: Mathematics is essential in formulating theories like quantum mechanics or general relativity, which describe the fundamental nature of space, time, matter, and energy. These theories give us insights into what we can call 'reality' at its most fundamental level.
Ontological Clarification: By studying mathematics, we delve into questions of ontology—what exists, how it exists, and how it interacts. Here, mathematical structures can be seen as representations or models of reality, helping us to conceptualize entities like spacetime curvature or quantum states.
Philosophy of Mathematics: There's an ongoing debate about whether mathematical truths are discovered or invented, which directly impacts our understanding of reality. If mathematical truths are discovered, this suggests they have an existence independent of human thought, reflecting the 'reality' of our universe.
Computational Universality: The idea that the universe might be computational at its core, where everything can be described by algorithms or equations, pushes the boundary between what we perceive as reality and what we can model mathematically.
By saying I study reality through mathematics, I mean I'm trying to grasp how these abstract structures correlate with or even constitute what we experience as the physical world. This isn't just about 'everything'; it's about understanding the rules, patterns, and potential limits of our universe in a rigorous, quantifiable manner. Hence, my study involves not just learning math but applying it to probe deeper into the nature of existence itself.