Definition:Pointwise Scalar Multiplication of Extended Real-Valued Functions

Definition
Let $S$ be a non-empty set, and let ${\overline \R}^S$ be the set of all mappings $f: S \to \overline \R$.

Here $\overline \R$ denotes the set of extended real numbers.

Then pointwise ($\overline \R$-)scalar multiplication on ${\overline \R}^S$ is the binary operation $\cdot: \overline \R \times {\overline \R}^S \to {\overline \R}^S$ defined by:


 * $\forall \lambda \in \overline \R: \forall f \in {\overline \R}^S: \forall s \in S: \left({\lambda \cdot f}\right) \left({s}\right) := \lambda \cdot f \left({s}\right)$

where the $\cdot$ on the right is extended real multiplication.

Pointwise scalar multiplication thence is an instance of a pointwise operation on extended real-valued functions.

Also defined as
Some sources only define $\cdot$ on $\R \times {\overline \R}^S$, viewing it as pointwise $\R$-scalar multiplication.

This casts $\cdot$ into the form of Pointwise Scalar Multiplication of Mappings by virtue of Extended Real Numbers form R-Algebraic Structure over Real Numbers.

However, ${\overline \R}^S$ is not a vector space over $\R$, since pointwise addition cannot be consistently defined on all of ${\overline \R}^S \times {\overline \R}^S$.

Also known as
Like the $\cdot$ for extended real multiplication, its pointwise analog (also denoted $\cdot$) is often omitted.

That is, one often encounters $\lambda f$ instead of $\lambda \cdot f$.

Furthermore, by the way pointwise $\overline \R$-scalar multiplication is defined, one often disposes of parentheses.

Thus one simply writes $\lambda f \left({s}\right)$, leaving unspecified whether this means $\left({\lambda \cdot f}\right) \left({s}\right)$ or $\lambda \cdot f \left({s}\right)$.

This is justified as the expressions are equal in any case, and it saves one from writing excessive parentheses.

Also see

 * Pointwise Scalar Multiplication of Extended Real-Valued Functions is Associative
 * Pointwise Scalar Multiplication of Mappings for pointwise scalar multiplication of more general mappings
 * Pointwise Operation on Extended Real-Valued Functions