What is the meaning of A^(⊥) in a mathematical context?

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In the mathematical context, A^(⊥) refers to the orthogonal complement of a set A, denoted as R⊥, which consists of all elements that are orthogonal to every element in R. The symbol "⊕" represents the direct sum, indicating that any element x can be uniquely expressed as the sum of two components, one from R and one from R⊥. This means x is in the direct sum R ⊕ R⊥ if it can be written as x = a + b, where a ∈ R and b ∈ R⊥. The perpendicular symbol indicates a relationship of orthogonality, commonly used in linear algebra and functional analysis. Thus, if R is the real line, R⊥ would represent a line perpendicular to it, forming a plane with the direct sum.
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I'm looking at a condition in a maths paper that I don't understand, essentially it is:

x ∈ R ⊕ R

R is a set I think, but I'm not sure what the perpendicular symbol means.

Also am I correct in thinking the circled plus means that x must be in either R or R (but not both)?

Thanks
 
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The upside down capital T means <perpendicular>, both in elementary geometry and in linear algebra (or functional analysis). A to the power T upside dowm is the subset B of M made up of all y in M, such that whatever x from the subset A of M, <x,y> = 0, where (M,<,>) is a scalar product space.
 
MikeyW said:
I'm looking at a condition in a maths paper that I don't understand, essentially it is:

x ∈ R ⊕ R
It's usually read as "R perp".
 
If "R" is the real line, then "R perp" is a line perpendicular to it. Their direct sum is the plane containing the two lines.
 

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