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I guess this is something easy that I'm overlooking is a clear sign of illiteracy, but anyway.

How is that

(Map[Sign, LessEqual[x, y]]) === LessEqual[Sign[x], Sign[y]]
-> True  


(Map[Sign, LessEqual[-1, -100]]) == LessEqual[Sign[-1], Sign[-100]]
-> False  
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2 Answers 2

up vote 7 down vote accepted

Using Trace on the lhs will help to show what has happened.

Trace[Map[Sign, LessEqual[-1, -100]]]

Out[2]= {{-1 <= -100, False}, Sign /@ False, False}

Notice that Map has no HoldXXX attributes.


Out[3]= {Protected}

So the LessEqual evaluates before Map does anything. At which point you get


As False is an atomic expression, this just evaluates to False.

The rhs of course evaluates to True, since Sign[-1] and Sign[-100] are both -1.

Daniel Lichtblau Wolfram Research

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Thanks! I almost always used Map with a List head, so never cared/realized about that. –  belisarius Feb 4 '11 at 18:35

Look what happens when you do it in two steps:

In[1]:= LessEqual[-1,-100]
Out[1]= False

In[2]:= Map[Sign, False]
Out[2]= False

The second result there may be surprising, but it happens to be how the Map function works; if you use Map on an expression with length 0 (like the symbol False), it just returns that expression unchanged. Another example:

In[3]:= Map[f, "Pillsy"]
Out[3]= "Pillsy"

On the other hand, obviously

In[4]:= LessEqual[Sign[-1],Sign[-100]]
Out[4]= True
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Thanks! You should not Map yourself! –  belisarius Feb 4 '11 at 18:31
@belisarius It's fine to Map yourself, if you don't mind suffering from idempotence. –  Daniel Lichtblau Feb 4 '11 at 18:47

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