Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

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:

a = factor(1:3)

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?

share|improve this question
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
If you have access to it, you might want to look at the paper defining this notation: (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
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.

share|improve this answer

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)

share|improve this answer

To answer part of your question, tilde is used to separate the left- and right-hand sides in model formula. See ?"~" for more help.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.