Foreword to BIOMATH 2017 Proceedings: Some comments on mathematical modelling and biomathematics.

Texts in Biomathematics Pub Date : 2018-07-23 DOI:10.11145/TEXTS.2018.06.107

J. Banasiak

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Abstract

Both biology and mathematics have existed as well established branches of science for hundreds of years and both, maybe not in a well defined way, have been with the humankind for a couple of thousands of years. Though nature was studied by the ancient civilizations of Mesopotamia, Egypt, the Indian subcontinent and China, the origins of modern biology are typically traced back to the ancient Greece, where Aristotle (384-322 BC) contributed most extensively to its development. Similarly, the ancient Babylonians were able to solve quadratic equation over four millennia ago and we can see the development of mathematical methods in all ancient civilisations, notably in China and on the Indian subcontinent. However, possibly again the Greeks were the first who studied mathematics for its own sake, as a collection of abstract objects and relations between them. Nevertheless, despite the fact that the development of such a mathematics has not required any external stimuli, an amazing feature of the human mind is that a large number of abstract mathematical constructs has proved to be very well suited for describing natural phenomena.This prompted Eugene Wigner to write his famous article The Unreasonable Effectiveness of Mathematics in the Natural Sciences, ...

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BIOMATH 2017论文集前言:关于数学建模和生物数学的一些评论。

生物学和数学作为科学的分支已经存在了几百年，两者都存在了几千年，也许不是以一种明确的方式存在。尽管美索不达米亚、埃及、印度次大陆和中国等古文明都对自然进行了研究，但现代生物学的起源通常可以追溯到古希腊，亚里士多德(公元前384-322年)对其发展贡献最大。同样，古巴比伦人在4000多年前就能解出二次方程，我们可以看到所有古代文明中数学方法的发展，尤其是在中国和印度次大陆。然而，希腊人可能又是第一个为了数学本身而研究数学的人，他们把数学当作抽象对象及其相互关系的集合。然而，尽管这种数学的发展不需要任何外部刺激，但人类思维的一个惊人特征是，大量抽象的数学结构已被证明非常适合于描述自然现象。这促使尤金·维格纳写下了他那篇著名的文章《数学在自然科学中不合理的有效性》。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Texts in Biomathematics

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