Mathematical Foundations for Computer Engineering -- ENEE 641, Fall 2023
Instructor:
Dr. Uzi Vishkin
Telephone: 301-405-6763
E-mail: last name at umd.edu
Office: Iribe 5216
Office hours: W 5:00--6:00. By appointment
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Course web site:
www.umiacs.umd.edu/~vishkin/TEACHING/ENEE641F23/index.html
However, we will rely heavily on ELMS
Dry Homework
Programming assignment
Introduction:
The evolving discipline of computer engineering requires increasing
mathematical knowledge and sophistication.
Electronic design needs efficient computational methods, and its verification
a high level of mathematical rigor. More specifically,
computer aided design of digital systems and their verification are heavily
based on mathematical
computational methods and requires profound understanding of their efficiency and
apparent hardness
concepts. Layout, logic, and architectural-level synthesis are
almost entirely based on computational techniques.
Compilers are playing a dominant role in computing systems in general
including the embedded systems area.
Compilers must be correct and should be efficiently implemented.
Insuring correctness and efficiency require profound mathematical
understanding.
Communication networks is another electrical and computer engineering
domain where the understanding of mathematical computational methods and their
efficiency is important.
Course Goals:
Mathematical modeling, design, analysis, and proof techniques related to
computer engineering.
Probability, logic, combinatorics, set theory, and graph theory, as they
pertain to the design and performance of computer engineering systems.
Techniques for the design and analysis of efficient computational methods from
graph theory and networks.
Understanding of the limits on the efficiency of such computational methods.
Translation from mathematical theory to actual programming.
The course emphasizes mathematical rigor.
Course Prerequisite(s):
None.
Topics Prerequisite(s):
Properties of functions and counting principles, relations,
equivalence relations, partial orders and related topics,
asymptotic notation and recurrences, elementary sorting methods,
knowledge of C, and basic calculus.
Textbook(s)
Introduction to
Algorithms, T.H. Cormen, C.E. Leiserson, R.L. Rivest and C. Stein,
McGraw-Hill. Either Second Edition, 2002, ISBN 0-262-03293-7, or Third Edition, 2009, ISBN 978-0-262-03384-8.
Core Topics:
- Growth of functions.
- Propositional and predicate logic.
- Counting and probability.
- Recursion and recursive descriptions.
- Organizations of data.
- Computational methods: Dynamic programming and the greedy approach.
- Graph theory and computational methods.
- Uses of randomization.
- Combinatorial optimization.
- Apparent hardness of problems; practical ways for proving
apparent hardness; heuristics and other approaches for coping
with apparent hardness.
- Parallel algorithms (optional topic).
- Pattern matching (optional topic).
- Geometry computations (optional topic).
The presentation will provide computer engineering context to
the core topics covered.
Grading Method:
Homework 10%
Project(s) 5%
First Midterm 40%
Second Midterm 45%.
If your grade in the second midterm is higher than your grade in the first
midterm exam, the second midterm exam grade can be up to 85% of your course grade.There will be no final exam.
Documented Disability:
If you have a documented disability and wish to discuss academic accommodations
with me, please contact me as soon as possible.
ACADEMIC INTEGRITY
Academic dishonesty will not be tolerated. The University Code of
Academic Integrity, which can be found at
hhttps://www.president.umd.edu/administration/policies/section-iii-academic-affairs/iii-100a prohibits students
from committing the following acts of academic dishonesty: cheating,
fabrication, facilitating academic dishonesty, and plagiarism. Academic
dishonesty in this class includes outright copying on homework; however,
discussing homework problems and exchanging tips is permissible and also
encouraged. If there are any take-home exams, discussing the material
with anyone, inside or outside of the class, is considered academic
dishonesty. Instances of academic dishonesty will be referred to the Office
of Judicial Programs.
Last Updated:
May 12, 2023, Professor Uzi Vishkin.