Course pages 2018–19

# Foundations of Computer Science

**Principal lecturers:** Prof Alan Mycroft, Dr Amanda Prorok**Taken by:** Part IA CST 50%, Part IA CST 75%, Part IA NST**Past exam questions**

No. of lectures and practicals: 12 + 5 (NST students will take 4 practicals)

Suggested hours of supervisions: 3

This course is a prerequisite for Programming in Java and Prolog (Part IB).

## Aims

The main aim of this course is to present the basic principles of programming. As the introductory course of the Computer Science Tripos, it caters for students from all backgrounds. To those who have had no programming experience, it will be comprehensible; to those experienced in languages such as C, it will attempt to correct any bad habits that they have learnt.

A further aim is to introduce the principles of data structures and
algorithms. The course will emphasise the algorithmic side of programming,
focusing on problem-solving rather than on hardware-level bits and bytes.
Accordingly it will present basic algorithms for sorting, searching, etc., and
discuss their efficiency using *O*-notation. Worked examples (such as
polynomial arithmetic) will demonstrate how algorithmic ideas can be used to
build efficient applications.

The course will use a functional language (ML). ML is particularly appropriate for inexperienced programmers, since a faulty program cannot crash and ML’s unobtrusive type system captures many program faults before execution. The course will present the elements of functional programming, such as curried and higher-order functions. But it will also introduce traditional (procedural) programming, such as assignments, arrays and references.

## Lectures

**Introduction to Programming.**The role of abstraction and representation. Introduction to integer and floating-point arithmetic. Declaring functions. Decisions and booleans. Example: integer exponentiation.**Recursion and Efficiency.**Examples: Exponentiation and summing integers. Overloading. Iteration*versus*recursion. Examples of growth rates. Dominance and*O*-Notation. The costs of some representative functions. Cost estimation.**Lists.**Basic list operations. Append. Naïve*versus*efficient functions for length and reverse. Strings.**More on lists.**The utilities`take`and`drop`. Pattern-matching: zip, unzip. A word on polymorphism. The “making change” example.**Sorting.**A random number generator. Insertion sort, mergesort, quicksort. Their efficiency.**Datatypes and trees.**Pattern-matching and case expressions. Exceptions. Binary tree traversal (conversion to lists): preorder, inorder, postorder.**Dictionaries and functional arrays.**Functional arrays. Dictionaries: association lists (slow)*versus*binary search trees. Problems with unbalanced trees.**Functions as values.**Nameless functions. Currying. The “apply to all” functional,`map`. Examples: matrix transpose and product. The predicate functionals`filter`and`exists`.**Sequences, or lazy lists.**Non-strict functions such as*IF*. Call-by-need*versus*call-by-name. Lazy lists. Their implementation in ML. Applications, for example Newton-Raphson square roots.**Queues and search strategies.**Depth-first search and its limitations. Breadth-first search (BFS). Implementing BFS using lists. An efficient representation of queues. Importance of efficient data representation.**Polynomial arithmetic.**Addition, multiplication of polynomials using ideas from sorting, etc.**Elements of procedural programming.**Address*versus*contents. Assignment*versus*binding. Own variables. Arrays, mutable or not. Introduction to linked lists.

## Objectives

At the end of the course, students should

- be able to write simple ML programs;
- understand the fundamentals of using a data structure to represent some mathematical abstraction;
- be able to estimate the efficiency of simple algorithms, using the notions of average-case, worse-case and amortised costs;
- know the comparative advantages of insertion sort, quick sort and merge sort;
- understand binary search and binary search trees;
- know how to use currying and higher-order functions;
- understand how ML combines imperative and functional programming in a single language.

## Recommended reading

* Paulson, L.C. (1996). *ML for the working programmer*. Cambridge University Press (2nd ed.).

Okasaki, C. (1998). *Purely functional data structures*. Cambridge University Press.

For reference only:

Gansner, E.R. & Reppy, J.H. (2004). *The Standard ML Basis Library*. Cambridge University Press. ISBN: 0521794781