Heyting field: Difference between revisions

Template:One source A Heyting field is one of the inequivalent ways in constructive mathematics to capture the classical notion of a field. It is essentially a field with an apartness relation.

A commutative ring is a Heyting field if it is a field in the sense that

• ${\displaystyle \mathrm{\neg }(0=1)}$
• Each non-invertible element is zero

and if it is moreover local: Not only does the non-invertible ${\displaystyle 0}$ not equal the invertible ${\displaystyle 1}$, but the following disjunctions are granted more generally

• Either ${\displaystyle a}$ or ${\displaystyle 1-a}$ is invertible for every ${\displaystyle a}$

The third axiom may also be formulated as the statement that the algebraic "${\displaystyle +}$" transfers invertibility to one of its inputs: If ${\displaystyle a+b}$ is invertible, then either ${\displaystyle a}$ or ${\displaystyle b}$ is as well.

The structure defined without the third axiom may be called a weak Heyting field. Every such structure with decidable equality being a Heyting field is equivalent to excluded middle. Indeed, classically all fields are already local.

An apartness relation is defined by writing ${\displaystyle a\mathrm{\#}b}$ if ${\displaystyle a-b}$ is invertible. This relation is often now written as ${\displaystyle a\ne b}$ with the warning that it is not equivalent to ${\displaystyle \mathrm{\neg }(a=b)}$.

The assumption ${\displaystyle \mathrm{\neg }(a=0)}$ is then generally not sufficient to construct the inverse of ${\displaystyle a}$. However, ${\displaystyle a\mathrm{\#}0}$ is sufficient.

The prototypical Heyting field is the real numbers.

• Constructive analysis
• Pseudo-order
• Markov's principle

• Mines, Richman, Ruitenberg. A Course in Constructive Algebra. Springer, 1987.

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