Course goals:
Mathematical methods are essential for understanding and working in
theoretical and computational linguistics. This course introduces the
key concepts from the areas of set theory, algebra and logic, which
belong to the basic repertoire of linguistic methods. The main goal of
the course is to provide the students with sufficient competence in
basic notations, terminology and concepts of discrete mathematics for
their studies in theoretical and computational linguistics. Familiarity with
concepts such as sets, functions and propositions, and the ability to
work with simple proof techniques are a crucial prerequisite for
subsequent courses.
Instructors:
Course meets:
Online materials: We will be using the new department
Moodle for the course, which is accessible at
http://courses.sfs.uni-tuebingen.de. You will access it to
The first time you visit the department Moodle, you will need to create an account. To do so, select “Create new account” and enter your department user id as id, pick a new password, (do not use the same password for Moodle as for your department account) and enter your department email address (i.e. YOUR-ID@sfs.uni-tuebingen.de) as your email address. If you do not yet have a department account, please contact us asap.
For questions concerning the department accounts and computer system, you can contact the system administrator Jochen Saile. His office hours are: Thursdays 9–11 in room 2.25, Blochbau (Wilhelmstr. 19), email: saile@sfs.uni-tuebingen.de, phone: 29-78487.
Relatedly, we will at times send you email related to our class. Please be sure to read email sent to your department account at least once a day. You can ask Jochen Saile to forward your department email to another account that you read regularly.
Course readings: Part of this course will be
based on the excellent book Barbara H. Partee, Alice ter
Meulen, Robert E. Wall (1990): Mathematical Methods in
Linguistics. Kluwer Academic Publishers and we will assign regular
readings from it. Please get ahold of a copy of the book –
you will need to have a copy by the end of week 2 of the
semester. The book covers essential material that you’ll need to
refer to throughout your studies and the book is cheap, so buying a
copy for yourself generally is the best idea. We also ordered ten
copies of the book book for the Lehrbuchsammlung of the main
university library, where you can find them under the signature Lili A
900.
We will also make our slides and lecture notes available on our Moodle course site. They are only a skeleton of the material covered and definitely cannot replace actually being in class and doing the assigned readings. In our experience, students who actively participate in class enjoy the course more and do much better on the exams than those who don’t—very surprising, isn’t it? ;-)
Course requirements: The basic requirement is
regular attendance in class and active participation. If you
cannot attend class for an important reason, please contact us by email
before the class you will miss. Following the official rules
of the college, students who, without notifying us in advance, miss more
than two meetings will automatically fail the class.
There will be one online quiz per week, to step by step ensure the material covered in class is mastered. The contents of the quiz is discussed in the Monday sessions, for which attendance is obligatory. The midterm exam will consist of the material covered in the first half of the class, and the final exam will cover the contents covered in the second half of the class.
Grading: Grades will be based on participation
in classroom discussion, quizzes, homeworks, a midterm exam, and the
final examination, using the following scheme:
| Participation | 10% | |
| Quizzes | 30% | |
| Midterm | 30% | |
| Final | 30% |
Note: We will not remind you when you have a quiz due. It is your responsibility to keep up with the syllabus/calendar of the course.
The midterm and the final exam will be administered on-line as well, but you will be in the department lab when you take them. So you will want to do the quizzes in a way that best prepares you for doing the midterm and the final by yourself.
| B+/1.7 | 87–89 | C+/2.7 | 77–79 | D+/3.7 | 67–69 | ||||||||||
| A/1 | 93–100 | B/2 | 83–86 | C/3 | 73–76 | D/4 | 60–66 | ||||||||
| A−/1.3 | 90–92 | B−/2.3 | 80–82 | C−/3.3 | 70–72 |
Make-up Policy: If you know you won’t be able
to make a deadline or exam, please definitely let us know
before you miss the deadline or exam. If you miss the midterm
or final, you will have to provide extensive written documentation for
your excuse. As you generally will have a week to take them, there are
no make-ups for the quizzes.
Academic Misconduct: To state the obvious,
academic dishonesty is unacceptable. Cheating on tests or on other
assignments will be handled according to the university guidelines.
The most common form of misconduct is copying or plagiarism. Remember
that any time you use the ideas or the materials of another person,
you must acknowledge that you have done so in a citation. This
includes material that you have found on the Web or given to you by
another student by email, telephone or in person.
Class etiquette: Please do not read or work
on materials for other classes in class. When in the computer lab,
only use the computers when you are asked to do a specific activity –
do not read email or browse the web. Please come to class on time and
do not pack up early. All portable electronic devices such as cell
phones should be switched off for the length of the flight, oops,
class. If for some reason, you must leave early or you have an
important call coming in, notify us before class.
Schedule: The latest version of the schedule is always available on Moodle. After the lectures, the handouts and lecture notes are available from the Moodle web site.
| Week | Month | Date | Day | Topic |
| 2 | Oct | 20 | Mon | Introduction |
| 21 | Tue | Set Theory | ||
| 23 | Thu | Relations And Their Properties (Pt. 1) | ||
| 3 | 27 | Mon | Tutorial | |
| 28 | Tue | Relations And Their Properties (Pt. 2) | ||
| 30 | Thu | Functions | ||
| 4 | Nov | 3 | Mon | Tutorial |
| 4 | Tue | Infinities | ||
| 6 | Thu | Proof By Induction | ||
| 5 | 10 | Mon | Tutorial | |
| 11 | Tue | Valid reasoning, Propositional Logic (Pt. 1) | ||
| 13 | Thu | Propositional Logic (Pt. 2) | ||
| 6 | 17 | Mon | Tutorial | |
| 18 | Tue | Smullyan Tableaux | ||
| 20 | Thu | Natural Deduction | ||
| 7 | 24 | Mon | Tutorial | |
| 25 | Tue | Predicate Logic (Pt. 1) | ||
| 27 | Thu | Predicate Logic (Pt. 2) | ||
| 8 | Dec | 1 | Mon | Tutorial |
| 2 | Tue | Smullyan Tableaux | ||
| 4 | Thu | Natural Deduction | ||
| 9 | 8 | Mon | Midterm Exam! | |
| 9 | Tue | Higher-Order Predicate Logic | ||
| 11 | Thu | Algebra (semi groups, groups, monoids) | ||
| 10 | 15 | Mon | Tutorial | |
| 16 | Tue | Algebra (morphisms) | ||
| 18 | Thu | Algebra (boolean algebras) | ||
Christmas/New Year’s Break | ||||
| 11 | Jan | 8 | Thu | λ-Calculus (Pt. 1) |
| 12 | 12 | Mon | Tutorial | |
| 13 | Tue | λ-Calculus (Pt. 2) | ||
| 15 | Thu | Complexity Theory and Formal Languages (Pt. 1) | ||
| 13 | 19 | Mon | Tutorial | |
| 20 | Tue | Complexity Theory and Formal Languages (Pt. 2) | ||
| 22 | Thu | Complexity Theory and Formal Languages (Pt. 3) | ||
| 14 | 26 | Mon | Tutorial | |
| 27 | Tue | Complexity Theory and Formal Languages (Pt. 4) | ||
| 29 | Thu | Complexity Theory and Formal Languages (Pt. 5) | ||
| 15 | Feb | 2 | Mon | Tutorial |
| 3 | Tue | Complexity Theory and Formal Languages (Pt. 6) | ||
| 5 | Thu | Complexity Theory and Formal Languages (Pt. 7) | ||
| 16 | 9 | Mon | Tutorial | |
| 10 | Tue | Wrap-Up and Exam-Prep | ||
| 12 | Thu | Final Exam! | ||
This document was translated from LATEX by HEVEA.