Skip to product information
1 of 1
Regular price £33.49 GBP
Regular price £31.99 GBP Sale price £33.49 GBP
Sale Sold out
Free UK Shipping

Freshly Printed - allow 6 days lead

Efficient Algorithms for Listing Combinatorial Structures

First published in 1993, this thesis is concerned with the design of efficient algorithms for listing combinatorial structures.

Leslie Ann Goldberg (Author)

9780521117883, Cambridge University Press

Paperback, published 30 July 2009

180 pages
24.4 x 17 x 1 cm, 0.3 kg

"...an impressive and thorough examination of listing problems in this framework...the complicated probabilistic arguments needed for the analysis are handled well...this is an exceptional dissertation...well-written, with the author always carefully explaining the thrust of the argument, never allowing the technical nature of many of the results to obscure the overall picture." G.F. Royle, Mathematics of Computing

First published in 1993, this thesis is concerned with the design of efficient algorithms for listing combinatorial structures. The research described here gives some answers to the following questions: which families of combinatorial structures have fast computer algorithms for listing their members? What general methods are useful for listing combinatorial structures? How can these be applied to those families which are of interest to theoretical computer scientists and combinatorialists? Amongst those families considered are unlabelled graphs, first order one properties, Hamiltonian graphs, graphs with cliques of specified order, and k-colourable graphs. Some related work is also included, which compares the listing problem with the difficulty of solving the existence problem, the construction problem, the random sampling problem, and the counting problem. In particular, the difficulty of evaluating Pólya's cycle polynomial is demonstrated.

1. Introduction
2. Techniques for listing combinatorial structures
3. Applications to particular families of structures
4. Directions for future work on listing
5. Related results
6. Bibliography.

Subject Areas: Algorithms & data structures [UMB], Combinatorics & graph theory [PBV]

View full details