In mathematics, the Iverson bracket, named after Kenneth E. Iverson, is a notation that generalises the Kronecker delta. It converts any logical proposition into a number that is 1 if the proposition is satisfied, and 0 otherwise, and is generally written by putting the proposition inside square brackets: where is a statement that can be true or false. In the context of summation, the notation can be used to write any sum as an infinite sum without limits: If is any property of the integer, Note that by this convention, a summand must evaluate to 0 regardless of whether is defined. Likewise for products: The notation was originally introduced by Kenneth E. Iverson in his programming languageAPL, though restricted to single relational operators enclosed in parentheses, while the generalisation to arbitrary statements, notational restriction to square brackets, and applications to summation, was advocated by Donald Knuth to avoid ambiguity in parenthesized logical expressions.
Properties
There is a direct correspondence between arithmetic on Iverson brackets, logic, and set operations. For instance, let A and B be sets and any property of integers; then we have
Examples
The notation allows moving boundary conditions of summations as a separate factor into the summand, freeing up space around the summation operator, but more importantly allowing it to be manipulated algebraically.
Double-counting rule
We mechanically derive a well-known sum manipulation rule using Iverson brackets:
Another use of the Iverson bracket is to simplify equations with special cases. For example, the formula is valid for but is off by for. To get an identity valid for all positive integers , a correction term involving the Iverson bracket may be added:
Common functions
Many common functions, especially those with a natural piecewise definition, may be expressed in terms of the Iverson bracket. The Kronecker delta notation is a specific case of Iverson notation when the condition is equality. That is, The indicator function, often denoted, or, is an Iverson bracket with set membership as its condition: The Heaviside step function, sign function, and absolute value function are also easily expressed in this notation: and The comparison functions max and min may be written as The floor and ceiling functions can be expressed as and where the index of summation is understood to range over all the integers. The ramp function can be expressed The trichotomy of the reals is equivalent to the following identity: The Möbius function has the property
Formulation in terms of usual functions
In the 1830s, Guglielmo Libri Carucci dalla Sommaja used as a replacement for what would now be written, as well as variants such as for. Indeed, following the usual conventions, those quantities are equal where defined: is 1 if x > 0, 0 if x = 0, and undefined otherwise.