Discrete Mathematics DSBA2019/2020 — различия между версиями

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(Office hours)
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==Colloquiums ==
 
==Colloquiums ==
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== Homework deadlines ==
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'''For group 191:'''
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* HW 1 -- 09/23/19
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== Materials ==
 
== Materials ==

Версия 04:39, 14 сентября 2019

Exams

Colloquiums

Homework deadlines

For group 191:

  • HW 1 -- 09/23/19


Materials

You can find some useful materials (including the Lecture Notes) here.

Problems Keywords
cw1 kw1

Office hours

Teacher / Assistant Monday Tuesday Wednesday Thursday Friday
Evgeny V. Dashkov from 3.10 pm till 5 pm
Boris R. Danilov

Recommended Reading

Please notice that The Book for our Course does not exist. The latter is based on many sources.

  1. Anderson J. A., Discrete Mathematics With Combinatorics. Prentice Hall, 2003.
  2. Biggs N. L., Discrete mathematics. 2nd ed., New York; Oxford: Oxford University Press, 2004.
  3. Gavrilov G. P., Sapozhenko A. A. Problems and Exercises in Discrete Mathematics. Kluwer Texts in the Mathematical Sciences 14. Springer, 1996.
  4. Lehman E., Thomson Leighton F., Meyer A. R. Mathematics for Computer Science, 2017.
  5. Lovasz L., Vesztergombi K. Discrete Mathematics. Lecture Notes; Yale University, 1999.
  6. Melnikov O., Sarvanov V., Tyshkevich R., Yemelichev V., Zverovich I. Exercises in Graph Theory. Kluwer Texts in the Mathematical Sciences 19. Springer, 1998.
  7. Rosen K. H. Discrete Mathematics and Its Applications. McGraw-Hill, 1999.
  8. Stein C., Drysdale R. L., Bogart K. Discrete mathematics for computer scientists. Addison-Wesley, 2010.
  9. Vinogradov I. M. Elements of number theory. Dover, 1954.

In Russian

If you understand Russian (by any chance), you will probably benefit from reading the following books.

  1. Виноградов И. М. Основы теории чисел. 9-е изд., М.: Наука, 1981.
  2. Вялый М., Подольский В., Рубцов А., Шварц Д., Шень А. Лекции по дискретной математике.
  3. Гаврилов Г. П., Сапоженко А. А. Задачи и упражнения по дискретной математике. 3-е изд., М.: ФИЗМАТЛИТ, 2004.
  4. Дашков Е. В. Введение в математическую логику. Множества и отношения. М.: МФТИ, 2019.
  5. Зубков А. М., Севастьянов Б. А., Чистяков В. П. Сборник задач по теории вероятностей. 2-е изд., М.: Наука, 1989.
  6. Мельников О. И. Теория графов в занимательных задачах. 5-е изд., М.: Книжный дом "ЛИБРОКОМ", 2013.
  7. Шень А., Математическая индукция. 5-е изд, М.: МЦНМО, 2016.

Grading System

Intermediate grade-2 = (1/2) colloquium-2 + (1/2) homework-2.

Cumulative grade-3 = (3/10) colloquium-2 + (3/10) colloquium-3 + (4/10) homework-3.

Final grade-3 = (7/10) cumulative grade-3 + (3/10) final exam.

The number in a grade’s name is the number of the module when grading takes place. The grade homework-n is the normalized average grade for the homework in modules from 1 to n. The Intermediate and Final grades are subject to rounding half up to an integer. All the other grades are reported with the greatest precision available.