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<p>For example, in origin-1</p> | <p>For example, in origin-1</p> | ||
<apll> | <apll><pre> | ||
M←2 3⍴'abcdef' | |||
M⍳'afg' | |||
1 1 2 3 3 4 | |||
af | M[M⍳'af'] | ||
af | |||
┌3──────────┐ | L←2 ⋄ ⎕FMT L⍳⍳3 | ||
│┌0┐ ┌0┐ ┌0┐│ | ┌3──────────┐ | ||
││0│ │0│ │0││ | │┌0┐ ┌0┐ ┌0┐│ | ||
│└~┘ └~┘ └~┘2< | ││0│ │0│ │0││ | ||
│└~┘ └~┘ └~┘2 | |||
└∊──────────┘</pre></apll> | |||
<p>Note that this extension preserves the identity <apll>R≡L[L⍳R]</apll> for all <apll>R⊆L</apll>.</p> | <p>Note that this extension preserves the identity <apll>R≡L[L⍳R]</apll> for all <apll>R⊆L</apll>.</p> | ||
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<p>This extension is implemented via an internal magic function:</p> | <p>This extension is implemented via an internal magic function:</p> | ||
<apll> | <apll><pre> | ||
∇ Z←L #DydIota R;⎕IO;O | |||
[1] O←⎕IO ⋄ ⎕IO←0 | |||
[2] Z←⊂[0] O+(1+⍴L)⊤(¯1↓,(1+⍴L)↑L)⍳R | |||
∇</pre></apll> | |||
Latest revision as of 17:33, 15 April 2018
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| L is an array of rank not equal 1. | ||||
| R is an arbitrary array. | ||||
| Z is a nested array of shape ⍴R whose items are each integer vectors of length ⍴⍴L, suitable for use as indices to L, except for where the item in R is not found in L, in which case the corresponding item in Z is ⎕IO+⍴L. | ||||
| This feature extends dyadic iota to non-vector left arguments. | ||||
| This function is sensitive to ⎕IO and ⎕CT. |
For example, in origin-1
M←2 3⍴'abcdef'
M⍳'afg'
1 1 2 3 3 4
M[M⍳'af']
af
L←2 ⋄ ⎕FMT L⍳⍳3
┌3──────────┐
│┌0┐ ┌0┐ ┌0┐│
││0│ │0│ │0││
│└~┘ └~┘ └~┘2
└∊──────────┘
Note that this extension preserves the identity R≡L[L⍳R] for all R⊆L.
This extension is implemented via an internal magic function:
∇ Z←L #DydIota R;⎕IO;O
[1] O←⎕IO ⋄ ⎕IO←0
[2] Z←⊂[0] O+(1+⍴L)⊤(¯1↓,(1+⍴L)↑L)⍳R
∇