As a rather separate line of attack, he also developed a purely descriptive theory of leaf-arrangement, or 'phyllotaxis' as it was called in biological Greek,
此外,图灵还提出了一个关于叶子分布的描述性理论,这在生物学中称为"叶序"。
in which he found ways of using matrices to represent the winding of spirals of leaves or seeds round a stem or flower-head.
图灵用矩阵来表示茎上环绕的叶子的螺旋结构,
He brought into this theory a concept of 'inverse lattices' somewhat like that used by crystallographers.
并引入了检晶器的"逆格"的概念。
It was also accompanied by a good deal of measurement-making of his own.
除此之外,他还提出了许多自创的测量方法。
The intention was that ultimately these two approaches would join up when he found a system of equations that would generate the Fibonacci patterns expressed by his matrices.
他的目的是找到一个方程系统,能够产生矩阵系统所表示的斐波那契序列,并将这两套系统结合起来。
Although there was some correspondence with a number of biologists, this work was essentially done on his own.
在这一系列研究中,图灵虽然与几位生物学家有书信来往,但本质上的工作,都是他独立完成的。
The Manchester botanist, C. W. Wardlaw, was particularly interested and wrote a paper describing, in biologists' terms, the significance of the first Turing paper.
曼彻斯特的植物学家C·W·瓦德劳对此非常有兴趣,他写了一篇专业的生物学文章,介绍图灵的第一篇论文的重要性。
This finally appeared in August 1952, and soon Alan had a letter from C. H. Waddington expressing interest but scepticism as to the correctness of the essential chemical hypothesis.
这篇文章在1952年8月发表,不久之后,图灵收到了来自瓦德劳的信,信中说他对"化学说"非常感兴趣,但对其正确性表示怀疑。