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I have seen how to use ~ operator in formula. For example y~x means: y is distributed as x.

However I am really confused of what does ~0+a means in this code:

require(limma)
a = factor(1:3)
model.matrix(~0+a)

Why just model.matrix(a) does not work? Why the result of model.matrix(~a) is different from model.matrix(~0+a)? And finally what is the meaning of ~ operator here?

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Given your self-answer, I would argue that this is not an R specific question, but a more general question on linear models and formula symbology. –  mnel Oct 8 '12 at 1:20
3  
If you have access to it, you might want to look at the paper defining this notation: jstor.org/stable/2346786 (by Wilkinson and Rogers, hence this notation is often called "Wilkinson-Rogers notation" –  Ben Bolker Oct 8 '12 at 1:31
    
@mnel: this is the R specific notation to take ~a-1 as no-intercept formula. I am just resolving a problem in understanding R formula I faced for a long time. –  Ali Oct 8 '12 at 1:36
    
@BenBolker - thanks for the link, I knew there was a paper defining the notation, but couldn't find it! –  mnel Oct 8 '12 at 1:38
    
@BenBolker: Thanks for the nice link. –  Ali Oct 8 '12 at 1:44
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3 Answers 3

up vote 8 down vote accepted

~ creates a formula - it separates the righthand and lefthand sides of a formula

From ?`~`

Tilde is used to separate the left- and right-hand sides in model formula

Quoting from the help for formula

The models fit by, e.g., the lm and glm functions are specified in a compact symbolic form. The ~ operator is basic in the formation of such models. An expression of the form y ~ model is interpreted as a specification that the response y is modelled by a linear predictor specified symbolically by model. Such a model consists of a series of terms separated by + operators. The terms themselves consist of variable and factor names separated by : operators. Such a term is interpreted as the interaction of all the variables and factors appearing in the term.

In addition to + and :, a number of other operators are useful in model formulae. The * operator denotes factor crossing: a*b interpreted as a+b+a:b. The ^ operator indicates crossing to the specified degree. For example (a+b+c)^2 is identical to (a+b+c)*(a+b+c) which in turn expands to a formula containing the main effects for a, b and c together with their second-order interactions. The %in% operator indicates that the terms on its left are nested within those on the right. For example a + b %in% a expands to the formula a + a:b. The - operator removes the specified terms, so that (a+b+c)^2 - a:b is identical to a + b + c + b:c + a:c. It can also used to remove the intercept term: when fitting a linear model y ~ x - 1 specifies a line through the origin. A model with no intercept can be also specified as y ~ x + 0 or y ~ 0 + x.

So regarding specific issue with ~a+0

  • You creating a model matrix without an intercept. As a is a factor, model.matrix(~a) will return an intercept column which is a1 (You need n-1 indicators to fully specify n classes)

The help files for each function are well written, detailed and easy to find!

why doesn't model.matrix(a) work

model.matrix(a) doesn't work because a is a factor variable, not a formula or terms object

From the help for model.matrix

object an object of an appropriate class. For the default method, a model formula or a terms object.

R is looking for a particular class of object, by passing a formula ~a you are passing an object that is of class formula. model.matrix(terms(~a)) would also work, (passing the terms object corresponding to the formula ~a


general note

@BenBolker helpfully notes in his comment, This is a modified version of Wilkinson-Rogers notation.

There is a good description in the Introduction to R.

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After reading several manuals, I was confused by the meaning of model.matrix(~0+x) ountil recently that I found this excellent book chapter.

In mathematics 0+a is equal to a and writing a term like 0+a is very strange. However we are here dealing with linear models: A simple high-school equation such as y=ax+b that uncovers the relationship between the predictor variable (x) and the observation (y).

So we can think of ~0+x or equally ~x+0 as an equation of the form: y=ax+b. By adding 0 we are forcing b to be zero, that means that we are looking for a line passing the origin (no intercept). If we indicated a model like ~x+1 or just ~x, there fitted equation could possibily contain a non-zero term b. Equally we may restrict b by a formula ~x-1 or ~-1+x that both mean: no intercept (the same way we exclude a row or column in R by negative index). However something like ~x-2 or ~x+3 is meaningless.

Thanking @mnel for the useful comment, finally what's the reason to use ~ and not =? In standard mathematical terminology / symbology y~x denotes that y is equivalent to x, it is somewhat weaker that y=x. When you are fitting a linear model, you aren't really saying y=x, but more that you can model y as a linear function of x (y = ax+b for example)

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In standard mathematical terminology / symbology y~x denotes that y is equivalent to x, it is somewhat weaker that y=x. When you are fitting a linear model, you aren't really saying y=x, but more that you can model y as a linear function of x (y = ax+b for example). –  mnel Oct 8 '12 at 1:14
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To answer part of your question, tilde is used to separate the left- and right-hand sides in model formula. See ?"~" for more help.

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