The grounding for Continuum

Abstract: It is a ubiquitous opinion among mathematicians that a real number is just a point in the line. If this rough definition is not enough, then a mathematician may provide a formal definition of the real numbers in the set theoretic and axiomatic fashion, i.e. via Cauchy sequences or Dedekind cuts, or as the collection of axioms characterizing exactly (up to isomorphism) the set of real numbers as the complete and totally ordered Archimedean field. Actually, the above notions of the real numbers are abstract and do not have a constructive grounding. Definition of Cauchy sequences, and equivalence classes of these sequences explicitly use the actual infinity. The same is for Dedekind cuts, where the set of rational numbers is used as actual infinity. Although there is no direct constructive grounding for these abstract notions, there are so called intuitions on which they are based. A rigorous approach to express these very intuition in a constructive way is proposed. It is based on the concept of the adjacency relation that seems to be a missing primitive concept in type theory. The approach corresponds to the intuitionistic view of Continuum proposed by Brouwer. The famous and controversial Brouwer Continuity Theorem is discussed on the basis of different principle than the Axiom of Continuity.