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I'm trying to compare two numbers in R as a part of a if-statement condition:

(a-b) >= 0.5

In this particular instance, a = 0.58 and b = 0.08... and yet (a-b) >= 0.5 is false. I'm aware of the dangers of using == for exact number comparisons, and this seems related:

(a - b) == 0.5) is false, while

all.equal((a - b), 0.5) is true.

The only solution I can think of is to have two conditions: (a-b) > 0.5 | all.equal((a-b), 0.5). This works, but is that really the only solution? Should I just swear off of the = family of comparison operators forever?

Edit for clarity: I know that this is a floating point problem. More fundamentally, what I'm asking is: what should I do about it? What's a sensible way to deal with greater-than-or-equal-to comparisons in R, since the >= can't really be trusted?

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i could be way off but could this be a floating point problem? –  Dan May 4 '10 at 23:16
    
Indeed. I just don't know what to do about it. –  Matt Parker May 4 '10 at 23:20
    
Or rather, I don't know what people more savvy than me do about it. –  Matt Parker May 4 '10 at 23:21
2  
Why do you need to check for the equality? Bear in mind that most numb ers (including, I think, 0.08) cannot be represented exactly as floating point values, so the equality component of the test is meaningless. I think really you need to define some suitably small value "epsilon", and then check abs((a-b) - 0.5) < epsilon. –  James McLeod May 5 '10 at 0:19

5 Answers 5

up vote 15 down vote accepted

I've never been a fan of all.equal for such things. It seems to me the tolerance works in mysterious ways sometimes. Why not just check for something greater than a tolerance less than 0.05

tol = 1e-5

(a-b) >= (0.05-tol)

In general, without rounding and with just conventional logic I find straight logic better than all.equal

If x == y then x-y == 0. Perhaps x-y is not exactly 0 so for such cases I use

abs(x-y) <= tol

You have to set tolerance anyway for all.equal and this is actually more compact and straightforward than all.equal.

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You could create this as a separate operator or overwrite the original >= function (probably not a good idea) if you want to use this approach frequently:

# using a tolerance
epsilon <- 1e-10 # set this as a global setting
`%>=%` <- function(x, y) (x + epsilon > y)

# as a new operator with the original approach
`%>=%` <- function(x, y) (all.equal(x, y)==TRUE | (x > y))

# overwriting R's version (not advised)
`>=` <- function(x, y) (isTRUE(all.equal(x, y)) | (x > y))

> (a-b) >= 0.5
[1] TRUE
> c(1,3,5) >= 2:4
[1] FALSE FALSE  TRUE
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Personally I think this is the best approach, because you don't have to decide on the epsilon yourself. You could even take a page from Perl, and give them names like ge, le, and ne. –  Ken Williams May 5 '10 at 18:15

For completeness' sake, I'll point out that, in certain situations, you could simply round to a few decimal places (and this is kind of a lame solution by comparison to the better solution previously posted.)

round(0.58 - 0.08, 2) == 0.5
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1  
I think it's best solution and for original problem I will use round(a-b, 10) >= 0.5 (10 digits should be enough for future extends). –  Marek May 5 '10 at 11:53

Choose some tolerance level:

epsilon <- 1e-10

Then use

(a-b+epsilon) >= 0.5
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But, if your using tolerances anyway, why do you care that a-b == .5 (in fact) doesn't get evaluated? If you are using tolerances anyway you are saying I don't care about the end points exactly.

Here is what is true if( (a-b) >= .5) if( (a-b) < .5)

one of those should always evaluate true on every pair of doubles. Any code that uses one implicitly defines a no operation on the other one, at least. If your using tolerances to get actual .5 included in the first but your problem is defined on a continuous domain you arn't accomplishing much. In most problems involving continuous values in the underlying problem there will be very little point to that, since values arbitrarily over .5 will always evaluate as they should. Values arbitrarily close to .5 will go to the "wrong" flow control, but in continuous problems where you are using appropriate precision that doesn't matter.

The only time that tolerances make sense is when you are dealing with problems of the type if( (a-b) == c) if( (a-b) != c)

Here no amount of "appropriate precision" can help you. The reason is that you have to be prepared that the second will always evaluate to true unless you set the bits of a-b at a very low level by hand, when in fact you probably want the first to sometimes be true.

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