PlanetMath: linear equation

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linear equation

(Definition)

Let $L:U\rightarrow V$ be a linear mapping, and $v\in V$ an element of the codomain. A linear equation is a relation of the form,

$\displaystyle L(u)=v,$

where $u\in U$ is to be considered as the unknown. The solution set of a linear equation is the set of $u\in U$ that satisfy the above constraint, or to be more precise, the pre-image $L^{-1}(v)$ . The equation is called inconsistent if no solutions exist, that is, if the pre-image is the empty set. Otherwise, the equation is called consistent.

The general solution of a linear equation has the form

$\displaystyle u=u_p + u_h,\quad u_p,u_h\in U,$

where

$\displaystyle L(u_p)=v$

is a particular solution and where

$\displaystyle L(u_h)=0$

is any solution of the corresponding homogeneous problem, i.e. an element of the kernel of

Notes. Elementary treatments of linear algebra focus almost exclusively on finite-dimensional linear problems. They neglect to mention the underlying mapping, preferring to focus instead on “variables and equations.” However, the scope of the general concept is considerably wider, e.g. linear differential equations such as

$\displaystyle y''+y = 0.$

"linear equation" is owned by rmilson.

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Other names:

linear problem, linear system

Also defines:

consistent, inconsistent, particular solution

Attachments:: homogeneous linear problem (Definition) by rmilson
finite-dimensional linear problem (Definition) by rmilson

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Cross-references: linear differential equations, scope, mapping, finite-dimensional linear problems, focus, linear algebra, kernel, homogeneous, general solution, empty set, equation, solution, relation, codomain, linear mapping
There are 39 references to this entry.

This is version 5 of linear equation, born on 2002-02-22, modified 2007-03-27.
Object id is 2496, canonical name is LinearProblem.
Accessed 16345 times total.

Classification:

AMS MSC:

15A06 (Linear and multilinear algebra; matrix theory :: Linear equations)

Pending Errata and Addenda

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