Q-derivative
In mathematics, in the area of combinatorics, the q-derivative, or Jackson derivative, is a q-analog of the ordinary derivative, introduced by Frank Hilton Jackson. It is the inverse of Jackson's q-integration. For other forms of q-derivative, see (Chung et al. (1994)).
Words
This table shows the example usage of word lists for keywords extraction from the text above.
| Word | Word Frequency | Number of Articles | Relevance |
|---|---|---|---|
| q-derivative | 3 | 3 | 0.962 |
| derivative | 3 | 4076 | 0.481 |
| jackson | 3 | 18821 | 0.379 |
| q-differentiation | 1 | 2 | 0.33 |