Multicontinuum

An analogy of a multicontinuum is the analogy to the numbered geometric spaces. A number line is like a single continuum. There is one sequence of numbers on the number line, the numbers that are closest alike are closest together on the number line. A numbered plane has two number attached to each point. It forms two dimensional continuum. Again the number pairs that are closest alike are closest together in the continuum. So a multicontinuum is a n dimensional continuum. When one set of a group of concepts is each paired with a single different concept we have a continuum. When every concept in a set of concepts is pared or combined with every concept is a set of different concepts we have formed a multicontinuum of concepts. If the two continuum group of concepts are the internapaths and externapaths, we have formed a multicontinuum of physapths.