 | 2008 |
|---|
| 21 |       | Ian Anderson,
Donald A. Preece:
Some I terraces from I power-sequences, n being an odd prime.
Discrete Mathematics 308(18): 4086-4107 (2008) |
| 20 | | Ian Anderson,
Donald A. Preece:
Some da capo directed power-sequence Zn+1 terraces with n an odd prime power.
Discrete Mathematics 308(2-3): 192-206 (2008) |
| 19 | | Ian Anderson,
Donald A. Preece:
A general approach to constructing power-sequence terraces for Zn.
Discrete Mathematics 308(5-6): 631-644 (2008) |
| 2007 |
|---|
| 18 | | Peter Dobcsányi,
Donald A. Preece,
Leonard H. Soicher:
On balanced incomplete-block designs with repeated blocks.
Eur. J. Comb. 28(7): 1955-1970 (2007) |
| 2005 |
|---|
| 17 | | Nicholas C. K. Phillips,
Donald A. Preece,
Walter D. Wallis:
The seven classes of 5×6 triple arrays.
Discrete Mathematics 293(1-3): 213-218 (2005) |
| 16 | | Ian Anderson,
Donald A. Preece:
Some power-sequence terraces for Zpq with as few segments as possible.
Discrete Mathematics 293(1-3): 29-59 (2005) |
| 2004 |
|---|
| 15 | | Ian Anderson,
Donald A. Preece:
Narcissistic half-and-half power-sequence terraces for Zn with n=pqt.
Discrete Mathematics 279(1-3): 33-60 (2004) |
| 2003 |
|---|
| 14 | | Ian Anderson,
Donald A. Preece:
Power-sequence terraces for where n is an odd prime power.
Discrete Mathematics 261(1-3): 31-58 (2003) |
| 13 | | Matthew A. Ollis,
Donald A. Preece:
Sectionable terraces and the (generalised) Oberwolfach problem.
Discrete Mathematics 266(1-3): 399-416 (2003) |
| 12 | | R. A. Bailey,
Matthew A. Ollis,
Donald A. Preece:
Round-dance neighbour designs from terraces.
Discrete Mathematics 266(1-3): 69-86 (2003) |
| 2001 |
|---|
| 11 | | John P. Morgan,
Donald A. Preece,
David H. Rees:
Nested balanced incomplete block designs.
Discrete Mathematics 231(1-3): 351-389 (2001) |
| 1999 |
|---|
| 10 |  | Donald A. Preece,
B. J. Vowden,
Nicholas C. K. Phillips:
Double Youden rectangles of sizes p(2p+1) and (p+1)(2p+1).
Ars Comb. 51: (1999) |
| 9 | | B. J. Vowden,
Donald A. Preece:
Some New Infinite Series of Freeman-Youden Rectangles.
Ars Comb. 51: (1999) |
| 8 | | Donald A. Preece,
B. J. Vowden:
Some series of cyclic balanced hyper-graeco-Latin superimpositions of three Youden squares.
Discrete Mathematics 197-198: 671-682 (1999) |
| 7 | | David H. Rees,
Donald A. Preece:
Perfect Graeco-Latin balanced incomplete block designs (pergolas).
Discrete Mathematics 197-198: 691-712 (1999) |
| 1997 |
|---|
| 6 | | P. J. Owens,
Donald A. Preece:
Aspects of complete sets of 9 × 9 pairwise orthogonal latin squares.
Discrete Mathematics 167-168: 519-525 (1997) |
| 5 | | Donald A. Preece:
Some 6 × 11 Youden squares and double Youden rectangles.
Discrete Mathematics 167-168: 527-541 (1997) |
| 1996 |
|---|
| 4 | | P. J. Owens,
Donald A. Preece:
Some new non-cyclic latin squares that have cyclic and Youden properties.
Ars Comb. 44: (1996) |
| 1995 |
|---|
| 3 | | Donald A. Preece:
How many 7 × 7 latin squares can be partitioned into Youden squares?
Discrete Mathematics 138(1-3): 343-352 (1995) |
| 2 | | Donald A. Preece,
B. J. Vowden:
Graeco-Latin squares with embedded balanced superimpositions of Youden squares.
Discrete Mathematics 138(1-3): 353-363 (1995) |
| 1994 |
|---|
| 1 | | Donald A. Preece:
Double Youden rectangles - an update with examples of size 5x11.
Discrete Mathematics 125(1-3): 309-317 (1994) |
