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Lie Zhu

According to our database1, Lie Zhu authored at least 40 papers between 1986 and 2015.

Collaborative distances:
  • Dijkstra number2 of four.
  • Erdős number3 of two.

Timeline

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In proceedings 
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PhD thesis 
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Links

On csauthors.net:

Bibliography

2015
Constructions of large sets of disjoint group-divisible designs using a generalization of.
[BibTeX]
[DOI]
Haitao Cao
,
J. Lei
,
Lie Zhu
Discret. Math., 2015

2007
Constructions for generalized Steiner systems <i>GS</i> (3, 4, <i>v</i> , 2).
[BibTeX]
[DOI]
Haitao Cao
,
Lijun Ji
,
Lie Zhu
Des. Codes Cryptogr., 2007

2006
GOB designs for authentication codes with arbitration.
[BibTeX]
[DOI]
Gennian Ge
,
Ying Miao
,
Lie Zhu
Des. Codes Cryptogr., 2006

2005
Resolvable Steiner Quadruple Systems for the Last 23 Orders.
[BibTeX]
[DOI]
Lijun Ji
,
Lie Zhu
SIAM J. Discret. Math., 2005

2003
Completing the spectrum of r-orthogonal Latin squares.
[BibTeX]
[DOI]
Lie Zhu
,
Hantao Zhang
Discret. Math., 2003

Constructions for Steiner quadruple systems with a spanning block design.
[BibTeX]
[DOI]
Lijun Ji
,
Lie Zhu
Discret. Math., 2003

2002
Group-Divisible Designs with Block Size Four and Group-Type gum1 with m as Large or as Small as Possible.
[BibTeX]
[DOI]
Gennian Ge
,
Rolf S. Rees
,
Lie Zhu
J. Comb. Theory A, 2002

Transitive resolvable idempotent symmetric quasigroups and large sets of Kirkman triple systems.
[BibTeX]
[DOI]
Shengyuan Zhang
,
Lie Zhu
Discret. Math., 2002

Existence of frame SOLS of type <i>a<sup>n</sup>b</i><sup>1</sup>.
[BibTeX]
[DOI]
Yungqing Xu
,
Hantao Zhang
,
Lie Zhu
Discret. Math., 2002

Existence of Steiner seven-cycle systems.
[BibTeX]
[DOI]
R. Julian R. Abel
,
Frank E. Bennett
,
Gennian Ge
,
Lie Zhu
Discret. Math., 2002

Kirkman Packing Designs KPD ({3, 5*}, v).
[BibTeX]
Haitao Cao
,
Lie Zhu
Des. Codes Cryptogr., 2002

2001
Bounds and constructions for TWOOAs.
[BibTeX]
[DOI]
Dianhua Wu
,
Lie Zhu
Discret. Math., 2001

A few more <i>r</i>-orthogonal latin squares.
[BibTeX]
[DOI]
Lie Zhu
,
Hantao Zhang
Discret. Math., 2001

Resolvable BIBDs with block size 7 and index 6.
[BibTeX]
[DOI]
R. Julian R. Abel
,
Malcolm Greig
,
Ying Miao
,
Lie Zhu
Discret. Math., 2001

Steiner pentagon covering designs.
[BibTeX]
[DOI]
R. Julian R. Abel
,
Frank E. Bennett
,
Hantao Zhang
,
Lie Zhu
Discret. Math., 2001

2000
Some New Bounds for Cover-Free Families.
[BibTeX]
[DOI]
Douglas R. Stinson
,
Ruizhong Wei
,
Lie Zhu
J. Comb. Theory A, 2000

Generalized Steiner Triple Systems with Group Size g = 7, 8.
[BibTeX]
Dianhua Wu
,
Gennian Ge
,
Lie Zhu
Ars Comb., 2000

Existence of HSOLSSOMs with type h<sup>n</sup> and 1<sup>n</sup>u<sup>1</sup>.
[BibTeX]
R. Julian R. Abel
,
Frank E. Bennett
,
Hantao Zhang
,
Lie Zhu
Ars Comb., 2000

A few more incomplete self-orthogonal Latin squares and related designs.
[BibTeX]
[DOI]
R. Julian R. Abel
,
Frank E. Bennett
,
Hantao Zhang
,
Lie Zhu
Australas. J Comb., 2000

1996
Self-Orthogonal Mendelsohn Triple Systems.
[BibTeX]
[DOI]
Frank E. Bennett
,
Hantao Zhang
,
Lie Zhu
J. Comb. Theory A, 1996

The spectrum of HSOLSSOM(h<sup>n</sup>) where h is even.
[BibTeX]
[DOI]
Frank E. Bennett
,
Lie Zhu
Discret. Math., 1996

Existence of three HMOLS of types h<sup>n</sup> and 2<sup>n</sup>3<sup>1</sup>.
[BibTeX]
[DOI]
Frank E. Bennett
,
Charles J. Colbourn
,
Lie Zhu
Discret. Math., 1996

Further results on the existence of HSOLSSOM(h<sup>n</sup>).
[BibTeX]
[DOI]
Frank E. Bennett
,
Lie Zhu
Australas. J Comb., 1996

1995
Existence of almost resolvable directed 5-cycle systems.
[BibTeX]
[DOI]
Gennian Ge
,
Lie Zhu
Australas. J Comb., 1995

Existence of six incomplete MOLS.
[BibTeX]
[DOI]
Charles J. Colbourn
,
Lie Zhu
Australas. J Comb., 1995

1994
On the Spectra of Certain Classes of Room Frames.
[BibTeX]
[DOI]
Jeffrey H. Dinitz
,
Douglas R. Stinson
,
Lie Zhu
Electron. J. Comb., 1994

1993
Towards the Spectrum of Room Squares with Subsquares.
[BibTeX]
Douglas R. Stinson
,
Lie Zhu
J. Comb. Theory A, 1993

Some recent developments on BIBDs and related designs.
[BibTeX]
[DOI]
Lie Zhu
Discret. Math., 1993

On the existence of perfect Mendelsohn designs with k = 7 and lambda even.
[BibTeX]
[DOI]
Frank E. Bennett
,
J. Yin
,
Lie Zhu
Discret. Math., 1993

1992
Constructions of perfect Mendelsohn designs.
[BibTeX]
[DOI]
Frank E. Bennett
,
Kevin T. Phelps
,
Christopher A. Rodger
,
Lie Zhu
Discret. Math., 1992

Existence of perfect Mendelsohn designs with k=5 and lambda>1.
[BibTeX]
[DOI]
Frank E. Bennett
,
Kevin T. Phelps
,
Christopher A. Rodger
,
J. Yin
,
Lie Zhu
Discret. Math., 1992

1991
A few more RBIBDs with k = 5 and lambda = 1.
[BibTeX]
[DOI]
Lie Zhu
,
Beiliang Du
,
Xuebin Zhang
Discret. Math., 1991

Incomplete self-orthogonal latin squares ISOLS(6m + 6, 2m) exist for all m.
[BibTeX]
[DOI]
Katherine Heinrich
,
Lisheng Wu
,
Lie Zhu
Discret. Math., 1991

On the existence of three MOLS with equal-sized holes.
[BibTeX]
[DOI]
Douglas R. Stinson
,
Lie Zhu
Australas. J Comb., 1991

1990
Further results on incomplete (3, 2, 1)- conjugate orthogonal idempotent Latin squares.
[BibTeX]
[DOI]
Frank E. Bennett
,
Lisheng Wu
,
Lie Zhu
Discret. Math., 1990

On the existence of (v, 7, 1)-perfect Mendelsohn designs.
[BibTeX]
[DOI]
Frank E. Bennett
,
Beiliang Du
,
Lie Zhu
Discret. Math., 1990

1989
Embeddings of S(2, 4, v).
[BibTeX]
[DOI]
Ruizhong Wei
,
Lie Zhu
Eur. J. Comb., 1989

1987
Some new conjugate orthogonal Latin squares.
[BibTeX]
[DOI]
Frank E. Bennett
,
Lisheng Wu
,
Lie Zhu
J. Comb. Theory A, 1987

Incomplete conjugate orthogonal idempotent latin squares.
[BibTeX]
[DOI]
Frank E. Bennett
,
Lie Zhu
Discret. Math., 1987

1986
Existence of orthogonal latin squares with aligned subsquares.
[BibTeX]
[DOI]
Katherine Heinrich
,
Lie Zhu
Discret. Math., 1986


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