Mathematical Discovery of Natural Laws in Biomedical Sciences: A New Methodology
Leonid Hanin

TL;DR
This paper introduces a novel methodology that uses general mathematical models rooted in biomedical knowledge to identify natural laws in biomedical processes, exemplified by a key law in cancer metastasis.
Contribution
The authors propose a new approach to discover natural laws in biomedical sciences by analyzing model parameters independent of data, demonstrated through a law governing cancer metastasis.
Findings
Identified a universal pattern in cancer metastasis progression.
Supported by clinical and experimental evidence over 110 years.
Method reveals natural laws without relying on traditional empirical data.
Abstract
As biomedical sciences discover new layers of complexity in the mechanisms of life and disease, mathematical models trying to catch up with these developments become mathematically intractable. As a result, in the grand scheme of things, mathematical models have so far played an auxiliary role in biomedical sciences. We propose a new methodology allowing mathematical modeling to give, in certain cases, definitive answers to systemic biomedical questions that elude empirical resolution. Our methodology is based on two ideas: (1) employing mathematical models that are firmly rooted in established biomedical knowledge yet so general that they can account for any, or at least many, biological mechanisms, both known and unknown; (2) finding model parameters whose likelihood-maximizing values are independent of observations (existence of such parameters implies that the model must not meet…
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Taxonomy
TopicsMathematical Biology Tumor Growth · Cancer Cells and Metastasis · Cancer Genomics and Diagnostics
