Frame: Difference between revisions
m (1 revision imported: Migrate from miraheze) |
m (Categories) |
||
Line 2: | Line 2: | ||
The frame is complementary to the [[cell shape]] for cells of a particular rank: while the frame occupies leading axes (and its [[shape]] is a [[prefix]] of the array's shape), the cell shape is derived from the trailing axes, so that every axis belongs to either the frame or the cells. | The frame is complementary to the [[cell shape]] for cells of a particular rank: while the frame occupies leading axes (and its [[shape]] is a [[prefix]] of the array's shape), the cell shape is derived from the trailing axes, so that every axis belongs to either the frame or the cells. | ||
[[Category:Leading axis theory]][[Category:Function characteristics]] |
Revision as of 14:24, 30 April 2020
In leading axis theory, the frame is an abstract array-like structure which organizes the k-cells of an array. For k-cells of an array with rank r, the frame consists of the first r-k
axes of the array. The frame concept is most used in working with the Rank operator, or function rank: it is shared between the arguments and result of a function with rank. A concrete array which shares the frame's structure can be produced by applying Enclose or Box with rank k to an array. When representing arrays as nested lists as in K, this array already exists: simply consider the first r-k
levels of nesting to be the array, whose contents are cells.
The frame is complementary to the cell shape for cells of a particular rank: while the frame occupies leading axes (and its shape is a prefix of the array's shape), the cell shape is derived from the trailing axes, so that every axis belongs to either the frame or the cells.