Introduction
In this paper and by employing some certain techniques and results arisen in the theory of Tanaka, we provide a short proof for the maximum conjecture on the rigidity of Beloshapkachr('39')s models of the specific CR dimension one and of length . As a consequence, we realize that the Lie group of biholomorphisms (CR automorphisms) associated with each of these models only consists of linear maps.   
Material and methods
Two major approaches employed so far to study Beloshapkachr('39')s maximum conjecture have been 1) the approach of envelope of holomorphy, applied by Ilya Kossovskii to confirm the mentioned conjecture in the specific lengths three and four and 2) Cartanchr('39')s approach of solving (biholomorphic) equivalence problems, employed by the present author in CR dimension one. Both of these approaches are geometric. In this paper, we introduce and employ the algebraic approach of applying some techniques in Tanakachr('39')s theory of transitive prolongations to study the already mentioned conjecture in the specific CR dimension one. The proofs are based upon some results concerning Tanaka prolongation of rank two fundamental algebras of lengths , achieved by Medori and Nacinovich (1997). Here, we prove first an algebraic parallel version of Beloshapkachr('39')s conjecture and employ the results to solve this geometric open problem in CR dimension one.
Results and discussion
As is the main goal of this paper, we confirm the maximum conjecture on the rigidity of Beloshapkachr('39')s CR models in CR dimension one. As a consequence, we realize that each biholomorphic deformation of these models is linear. It may be worth to notice that the maximum conjecture in CR dimension one has been confirmed before by the present author, using the Cartan approach of solving equivalence problems. But, here we provide a much shorter proof for this result.
Conclusion
The following conclusions were drawn from this research.

• We confirm Beloshapkachr('39')s maximum conjecture in CR dimension one.
• It is introduced a new approach to consider this conjecture.
• Comparing the performance of the Tanaka approach, employed in this paper, with two approaches of "envelope of holomorphy" and "Cartanchr('39')s theory", this algebraic approach seems the best weapon, introduced so far, to attack the maximum conjecture. ./files/site1/files/52/3.pdf