Maximum: Difference between revisions

This page is about the primitive function. For system limits, see LIMIT ERROR and Maximum rank.

Maximum (⌈), Max, Greater of, or Larger of is a dyadic scalar function which returns the larger of its two arguments. The name "Maximum" is sometimes also used for the Maximum Reduce ⌈/, which returns the largest element of a vector (this usage is related to the maximum of a function). Maximum is paired with Minimum, and shares the glyph ⌈ with the Ceiling function. It is not subject to comparison tolerance, since the result will be exactly equal to one argument, and there is no reason to choose a smaller argument even if the two arguments are tolerantly equal. As a Boolean function, Maximum is identical to Or.

Examples

See also Minimum#examples.

Maximum finds the larger of two numbers:

      2.4 ⌈ 1.9
2.4

Maximum Reduce finds the largest element in a vector:

      ⌈/ 4 3 2 7 5 1 3
7

The index of this element can be found with Index Of, but is also the First element of the Grade Down of the vector.

      {⍵⍳⌈/⍵} 4 3 2 7 5 1 3
4
      ⊃⍒ 4 3 2 7 5 1 3
4

Reducing over an empty axis yields the smallest representable number, as that is the identity element for Maximum. This value is usually ¯∞ (for dialects that support infinities) or ¯1.797693135E308 (with 64-bit floats) or ¯1E6145 (with 128-bit decimal floats).

External links

Documentation

• Dyalog
• APLX
• J Dictionary, NuVoc