Pingala

Acharya Pingala^[2] (piṅgala; c. 3rd–2nd century BCE)^[1] was an ancient Indian poet and mathematician,he invented binary codes also,^[3]and the author of the Chandaḥśāstra (also called the Pingala-sutras), the earliest known treatise on Sanskrit prosody.^[4]

The Chandaḥśāstra is a work of eight chapters in the late Sūtra style, not fully comprehensible without a commentary. It has been dated to the last few centuries BCE.^[5][6] In the 10th century CE, Halayudha wrote a commentary elaborating on the Chandaḥśāstra. Pingala Maharshi was also said to be the brother of Pāṇini,^{[citation needed]} the famous Sanskrit grammarian, considered the first descriptive linguist.^[7]

The Chandaḥśāstra presents the first known description of a binary numeral system in connection with the systematic enumeration of metres with fixed patterns of short and long syllables.^[8] Pingala's discussion of the combinatorics of metre corresponds to the binomial theorem. Halāyudha's 10th-century commentary on the Chandaḥśāstra includes a presentation of this theorem in what is now called Pascal's triangle (called meruprastāra in the commentary), named after French mathematician Blaise Pascal despite its discovery by Halayudha and others centuries before. Pingala's work also includes material related to the Fibonacci numbers, called mātrāmeru.^[9]

Pingala is credited with the first use of binary numbers, using light (laghu) and heavy (guru) syllables to describe combinatorics of Sanskrit metre.^[10] Because of this, Pingala is sometimes also credited with the first use of zero, as he used the Sanskrit word śūnya to explicitly refer to the number.^[11] Pingala's binary system of metre starts with four light laghu syllables as the first pattern ("0000" in binary), three light laghu and one heavy guru as the second pattern ("0001" in binary), and so on, so that in general the ${\displaystyle n}$-th syllable pattern corresponds to the binary representation of ${\displaystyle n-1}$ (with increasing positional values).

• A. Weber, Indische Studien 8, Leipzig, 1863.

• Amulya Kumar Bag, 'Binomial theorem in ancient India', Indian J. Hist. Sci. 1 (1966), 68–74.
• George Gheverghese Joseph (2000). The Crest of the Peacock, p. 254, 355. Princeton University Press.
• Klaus Mylius, Geschichte der altindischen Literatur, Wiesbaden (1983).
• Van Nooten, B. (1993-03-01). "Binary numbers in Indian antiquity". Journal of Indian Philosophy. 21 (1): 31–50. doi:10.1007/BF01092744. S2CID 171039636.

• Math for Poets and Drummers, Rachel W. Hall, Saint Joseph's University, 2005.
• Mathematics of Poetry, Rachel W. Hall