Cauchy's functional equation

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Cauchy's functional equation is the functional equation:

A function that solves this equation is called an additive function. Over the rational numbers, it can be shown using elementary algebra that there is a single family of solutions, namely for any rational constant Over the real numbers, the family of linear maps now with an arbitrary real constant, is likewise a family of solutions; however there can exist other solutions not of this form that are extremely complicated. However, any of a number of regularity conditions, some of them quite weak, will preclude the existence of these pathological solutions. For example, an additive function is linear if:

  • is continuous (Cauchy, 1821). In fact, it suffices for to be continuous at one point (Darboux, 1875).
  • or for all .
  • is monotonic on any interval.
  • is bounded on any interval.
  • is Lebesgue measurable.
  • for all real and some positive integer .

On the other hand, if no further conditions are imposed on then (assuming the axiom of choice) there are infinitely many other functions that satisfy the equation. This was proved in 1905 by Georg Hamel using Hamel bases. Such functions are sometimes called Hamel functions.[1]

The fifth problem on Hilbert's list is a generalisation of this equation. Functions where there exists a real number such that are known as Cauchy-Hamel functions and are used in Dehn-Hadwiger invariants which are used in the extension of Hilbert's third problem from 3D to higher dimensions.[2]

This equation is sometimes referred to as Cauchy's additive functional equation to distinguish it from Cauchy's exponential functional equation Cauchy's logarithmic functional equation and Cauchy's multiplicative functional equation

Solutions over the rational numbers

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A simple argument, involving only elementary algebra, demonstrates that the set of additive maps  , where   are vector spaces over an extension field of  , is identical to the set of  -linear maps from   to  .

Theorem: Let   be an additive function. Then   is  -linear.

Proof: We want to prove that any solution   to Cauchy’s functional equation,  , satisfies   for any   and  . Let  .

First note  , hence  , and therewith   from which follows  .

Via induction,   is proved for any  .

For any negative integer   we know  , therefore  . Thus far we have proved

  for any  .

Let  , then   and hence  .

Finally, any   has a representation   with   and  , so, putting things together,

 , q.e.d.

Properties of nonlinear solutions over the real numbers

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We prove below that any other solutions must be highly pathological functions. In particular, it is shown that any other solution must have the property that its graph   is dense in   that is, that any disk in the plane (however small) contains a point from the graph. From this it is easy to prove the various conditions given in the introductory paragraph.

Lemma — Let  . If   satisfies the Cauchy functional equation on the interval   , but is not linear, then its graph is dense on the strip  .

Proof

WLOG, scale   on the x-axis and y-axis, so that   satisfies the Cauchy functional equation on  , and  . It suffices to show that the graph of   is dense in  , which is dense in  .

Since   is not linear, we have   for some  .

Claim: The lattice defined by   is dense in  .

Consider the linear transformation   defined by

 

With this transformation, we have  .

Since  , the transformation is invertible, thus it is bicontinuous. Since   is dense in  , so is  .  

Claim: if  , and  , then  .

If  , then it is true by additivity. If  , then  , contradiction.

If  , then since  , we have  . Let   be a positive integer large enough such that  . Then we have by additivity:

 

That is,

   

Thus, the graph of   contains  , which is dense in  .

Existence of nonlinear solutions over the real numbers

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The linearity proof given above also applies to   where   is a scaled copy of the rationals. This shows that only linear solutions are permitted when the domain of   is restricted to such sets. Thus, in general, we have   for all   and   However, as we will demonstrate below, highly pathological solutions can be found for functions   based on these linear solutions, by viewing the reals as a vector space over the field of rational numbers. Note, however, that this method is nonconstructive, relying as it does on the existence of a (Hamel) basis for any vector space, a statement proved using Zorn's lemma. (In fact, the existence of a basis for every vector space is logically equivalent to the axiom of choice.) There exist models[3] where all sets of reals are measurable which are consistent with ZF + DC, and therein all solutions are linear.[4]

To show that solutions other than the ones defined by   exist, we first note that because every vector space has a basis, there is a basis for   over the field   i.e. a set   with the property that any   can be expressed uniquely as   where   is a finite subset of   and each   is in   We note that because no explicit basis for   over   can be written down, the pathological solutions defined below likewise cannot be expressed explicitly.

As argued above, the restriction of   to   must be a linear map for each   Moreover, because   for   it is clear that   is the constant of proportionality. In other words,   is the map   Since any   can be expressed as a unique (finite) linear combination of the  s, and   is additive,   is well-defined for all   and is given by:  

It is easy to check that   is a solution to Cauchy's functional equation given a definition of   on the basis elements,   Moreover, it is clear that every solution is of this form. In particular, the solutions of the functional equation are linear if and only if   is constant over all   Thus, in a sense, despite the inability to exhibit a nonlinear solution, "most" (in the sense of cardinality[5]) solutions to the Cauchy functional equation are actually nonlinear and pathological.

See also

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  • Antilinear map – Conjugate homogeneous additive map
  • Homogeneous function – Function with a multiplicative scaling behaviour
  • Minkowski functional – Function made from a set
  • Semilinear map – homomorphism between modules, paired with the associated homomorphism between the respective base rings

References

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  1. ^ Kuczma (2009), p.130
  2. ^ V.G. Boltianskii (1978) "Hilbert's third problem", Halsted Press, Washington
  3. ^ Solovay, Robert M. (1970). "A Model of Set-Theory in Which Every Set of Reals is Lebesgue Measurable". Annals of Mathematics. 92 (1): 1–56. doi:10.2307/1970696. ISSN 0003-486X.
  4. ^ E. Caicedo, Andrés (2011-03-06). "Are there any non-linear solutions of Cauchy's equation $f(x+y)=f(x)+f(y)$ without assuming the Axiom of Choice?". MathOverflow. Retrieved 2024-02-21.
  5. ^ It can easily be shown that  ; thus there are   functions   each of which could be extended to a unique solution of the functional equation. On the other hand, there are only   solutions that are linear.
  • Kuczma, Marek (2009). An introduction to the theory of functional equations and inequalities. Cauchy's equation and Jensen's inequality. Basel: Birkhäuser. ISBN 9783764387495.
  • Hamel, Georg (1905). "Eine Basis aller Zahlen und die unstetigen Lösungen der Funktionalgleichung: f(x+y) = f(x) + f(y)". Mathematische Annalen.
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