On the number of points of an incomplete lattice in rectangular regions

In 2013–2015 it was shown that for any purely real algebraic irrationality 𝛼, starting from some place, all residual fractions in the expansion of 𝛼 into a continued fraction will appear to be the reduced algebraic irrationalities.

We construct the examples of purely real algebraic irrationalities 𝛼 for which this number of the residual fraction is arbitrarily large.

1. Dobrovol’skii, N.M. & Dobrovol’skii, N.N. 2015, “About minimal polynomial residual fractions for algebraic irrationalities”, Chebyshevskii Sbornik, vol. 16, no. 3(55), pp. 147–182. (Russian)

2. Dobrovol’skii, N.M., Dobrovol’skii, N.N., Sobolev, D.K. & Soboleva, V.N. 2017, “Classification of pure-real algebraic irrationalities”, Chebyshevskij sbornik, vol. 18, no. 2, pp. 98–128.

3. Dobrovol’skii, N.M., Sobolev, D.K. & Soboleva, V.N. 2013, “On a matrix decomposition of the reduced cubic irrational”, Chebyshevskii sbornik, vol. 14, no. 1, pp. 34–55.

4. Matiyasevich, Yu.V. 1974, “Existence of non-effectivizable estimates in the theory of exponentially Diophantine equations”, Zap. scientific. sem. LOMI, 40, pp. 77–93.

5. Matiyasevich, Yu.V., 1993, “Hilbert’s tenth problem”, M.: Science, Fizmatlit.

6. Matiyasevich, Yu.V., 2011, “What can and cannot be done with Diophantine problems”, Proc. Steklov Inst. Math., 275, pp. 118–132.

7. Trikolich, E. V. & Yushina, E. I. 2009, “Continued fractions for quadratic irrationalities from the field Q(√5)”, Chebyshevskii Sbornik., vol. 10, no. 1(29), pp. 77–94. (Russian)

8. Khinchin A. Y., 1949, “Continued fractions”, M.; L.: Gostekhizdat.