Projectively extended real line

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In real analysis, the projectively extended real line (also called the one-point compactification of the real line), is the extension of the set of the real numbers, , by a point denoted .[1] It is thus the set with the standard arithmetic operations extended where possible,[1] and is sometimes denoted by [2] or The added point is called the point at infinity, because it is considered as a neighbour of both ends of the real line. More precisely, the point at infinity is the limit of every sequence of real numbers whose absolute values are increasing and unbounded.

The projectively extended real line can be visualized as the real number line wrapped around a circle (by some form of stereographic projection) with an additional point at infinity.

The projectively extended real line may be identified with a real projective line in which three points have been assigned the specific values 0, 1 and . The projectively extended real number line is distinct from the affinely extended real number line, in which +∞ and −∞ are distinct.

Dividing by zero

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Unlike most mathematical models of numbers, this structure allows division by zero:

 

for nonzero a. In particular, 1 / 0 = ∞ and 1 / ∞ = 0, making the reciprocal function 1 / x a total function in this structure.[1] The structure, however, is not a field, and none of the binary arithmetic operations are total – for example, 0 ⋅ ∞ is undefined, even though the reciprocal is total.[1] It has usable interpretations, however – for example, in geometry, the slope of a vertical line is .[1]

Extensions of the real line

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The projectively extended real line extends the field of real numbers in the same way that the Riemann sphere extends the field of complex numbers, by adding a single point called conventionally .

In contrast, the affinely extended real number line (also called the two-point compactification of the real line) distinguishes between +∞ and −∞.

Order

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The order relation cannot be extended to   in a meaningful way. Given a number a ≠ ∞, there is no convincing argument to define either a > ∞ or that a < ∞. Since can't be compared with any of the other elements, there's no point in retaining this relation on  .[2] However, order on   is used in definitions in  .

Geometry

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Fundamental to the idea that is a point no different from any other is the way the real projective line is a homogeneous space, in fact homeomorphic to a circle. For example the general linear group of 2 × 2 real invertible matrices has a transitive action on it. The group action may be expressed by Möbius transformations (also called linear fractional transformations), with the understanding that when the denominator of the linear fractional transformation is 0, the image is .

The detailed analysis of the action shows that for any three distinct points P, Q and R, there is a linear fractional transformation taking P to 0, Q to 1, and R to that is, the group of linear fractional transformations is triply transitive on the real projective line. This cannot be extended to 4-tuples of points, because the cross-ratio is invariant.

The terminology projective line is appropriate, because the points are in 1-to-1 correspondence with one-dimensional linear subspaces of  .

Arithmetic operations

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Motivation for arithmetic operations

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The arithmetic operations on this space are an extension of the same operations on reals. A motivation for the new definitions is the limits of functions of real numbers.

Arithmetic operations that are defined

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In addition to the standard operations on the subset   of  , the following operations are defined for  , with exceptions as indicated:[3][2]

 

Arithmetic operations that are left undefined

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The following expressions cannot be motivated by considering limits of real functions, and no definition of them allows the statement of the standard algebraic properties to be retained unchanged in form for all defined cases.[a] Consequently, they are left undefined:

 

The exponential function   cannot be extended to  .[2]

Algebraic properties

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The following equalities mean: Either both sides are undefined, or both sides are defined and equal. This is true for any  

 

The following is true whenever expressions involved are defined, for any  

 

In general, all laws of arithmetic that are valid for   are also valid for   whenever all the occurring expressions are defined.

Intervals and topology

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The concept of an interval can be extended to  . However, since it is not an ordered set, the interval has a slightly different meaning. The definitions for closed intervals are as follows (it is assumed that  ):[2][additional citation(s) needed]

 

With the exception of when the end-points are equal, the corresponding open and half-open intervals are defined by removing the respective endpoints. This redefinition is useful in interval arithmetic when dividing by an interval containing 0.[2]

  and the empty set are also intervals, as is   excluding any single point.[b]

The open intervals as a base define a topology on  . Sufficient for a base are the bounded open intervals in   and the intervals   for all   such that  

As said, the topology is homeomorphic to a circle. Thus it is metrizable corresponding (for a given homeomorphism) to the ordinary metric on this circle (either measured straight or along the circle). There is no metric which is an extension of the ordinary metric on  

Interval arithmetic

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Interval arithmetic extends to   from  . The result of an arithmetic operation on intervals is always an interval, except when the intervals with a binary operation contain incompatible values leading to an undefined result.[c] In particular, we have, for every  :

 

irrespective of whether either interval includes 0 and .

Calculus

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The tools of calculus can be used to analyze functions of  . The definitions are motivated by the topology of this space.

Neighbourhoods

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Let   and  .

  • A is a neighbourhood of x, if A contains an open interval B that contains x.
  • A is a right-sided neighbourhood of x, if there is a real number y such that   and A contains the semi-open interval  .
  • A is a left-sided neighbourhood of x, if there is a real number y such that   and A contains the semi-open interval  .
  • A is a punctured neighbourhood (resp. a right-sided or a left-sided punctured neighbourhood) of x, if   and   is a neighbourhood (resp. a right-sided or a left-sided neighbourhood) of x.

Limits

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Basic definitions of limits

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Let     and  .

The limit of f (x) as x approaches p is L, denoted

 

if and only if for every neighbourhood A of L, there is a punctured neighbourhood B of p, such that   implies  .

The one-sided limit of f (x) as x approaches p from the right (left) is L, denoted

 

if and only if for every neighbourhood A of L, there is a right-sided (left-sided) punctured neighbourhood B of p, such that   implies  

It can be shown that   if and only if both   and  .

Comparison with limits in  

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The definitions given above can be compared with the usual definitions of limits of real functions. In the following statements,   the first limit is as defined above, and the second limit is in the usual sense:

  •   is equivalent to  
  •   is equivalent to  
  •   is equivalent to  
  •   is equivalent to  
  •   is equivalent to  
  •   is equivalent to  

Extended definition of limits

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Let  . Then p is a limit point of A if and only if every neighbourhood of p includes a point   such that  

Let  , p a limit point of A. The limit of f (x) as x approaches p through A is L, if and only if for every neighbourhood B of L, there is a punctured neighbourhood C of p, such that   implies  

This corresponds to the regular topological definition of continuity, applied to the subspace topology on   and the restriction of f to  

Continuity

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The function

 

is continuous at p if and only if f is defined at p and

 

If   the function

 

is continuous in A if and only if, for every  , f is defined at p and the limit of   as x tends to p through A is  

Every rational function P(x)/Q(x), where P and Q are polynomials, can be prolongated, in a unique way, to a function from   to   that is continuous in   In particular, this is the case of polynomial functions, which take the value   at   if they are not constant.

Also, if the tangent function   is extended so that

 

then   is continuous in   but cannot be prolongated further to a function that is continuous in  

Many elementary functions that are continuous in   cannot be prolongated to functions that are continuous in   This is the case, for example, of the exponential function and all trigonometric functions. For example, the sine function is continuous in   but it cannot be made continuous at   As seen above, the tangent function can be prolongated to a function that is continuous in   but this function cannot be made continuous at  

Many discontinuous functions that become continuous when the codomain is extended to   remain discontinuous if the codomain is extended to the affinely extended real number system   This is the case of the function   On the other hand, some functions that are continuous in   and discontinuous at   become continuous if the domain is extended to   This is the case for the arctangent.

As a projective range

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When the real projective line is considered in the context of the real projective plane, then the consequences of Desargues' theorem are implicit. In particular, the construction of the projective harmonic conjugate relation between points is part of the structure of the real projective line. For instance, given any pair of points, the point at infinity is the projective harmonic conjugate of their midpoint.

As projectivities preserve the harmonic relation, they form the automorphisms of the real projective line. The projectivities are described algebraically as homographies, since the real numbers form a ring, according to the general construction of a projective line over a ring. Collectively they form the group PGL(2, R).

The projectivities which are their own inverses are called involutions. A hyperbolic involution has two fixed points. Two of these correspond to elementary, arithmetic operations on the real projective line: negation and reciprocation. Indeed, 0 and ∞ are fixed under negation, while 1 and −1 are fixed under reciprocation.

See also

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Notes

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  1. ^ An extension does however exist in which all the algebraic properties, when restricted to defined operations in  , resolve to the standard rules: see Wheel theory.
  2. ^ If consistency of complementation is required, such that   and   for all   (where the interval on either side is defined), all intervals excluding   and   may be naturally represented using this notation, with   being interpreted as  , and half-open intervals with equal endpoints, e.g.  , remaining undefined.
  3. ^ For example, the ratio of intervals   contains 0 in both intervals, and since 0 / 0 is undefined, the result of division of these intervals is undefined.

References

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  1. ^ a b c d e NBU, DDE (2019-11-05). PG MTM 201 B1. Directorate of Distance Education, University of North Bengal.
  2. ^ a b c d e f Weisstein, Eric W. "Projectively Extended Real Numbers". mathworld.wolfram.com. Retrieved 2023-01-22.
  3. ^ Lee, Nam-Hoon (2020-04-28). Geometry: from Isometries to Special Relativity. Springer Nature. ISBN 978-3-030-42101-4.