ABSTRACT
Quantification of field f comes to the construction of tangent space at each of its point. Geometric properties of a three-dimensional tangent space are determined by metric tensor, which depends on the chemical realization of each amino acid in four-dimensional space-time. All three-index chemical configurations form a nucleus of parallel transfers to other point of the space and do not depend on the time; all 4f-index configurations depend on time and can be determined as three-index ones under condition that f = 0, i.e., in Hamiltonian gauge. Division of the set of amino acid chemical configurations on three-index and 4f-index expresses the principle of equivalency connection to space-time Lorentz-interval: each chemical configuration can be brought to standard connection form by means of introduction of marked point; for example:
F {+ A + P + S} Æ F {+ A – P* + S} A {+ R + S – f – Y} Æ A {– R* + S – f – Y}.
