Tri Lai

According to our database¹, Tri Lai authored at least 29 papers between 2013 and 2022.

Collaborative distances:

Dijkstra number² of six.
Erdős number³ of five.

Timeline

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PhD thesis

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On csauthors.net:

Bibliography

2022

Tiling Enumeration of Hexagons with Off-Central Holes.

[BibT_eX]

[DOI]

Tri Lai

Electron. J. Comb., 2022

2021

Plane partitions of shifted double staircase shape.

[BibT_eX]

[DOI]

Sam Hopkins

Tri Lai

J. Comb. Theory, Ser. A, 2021

Tilings of hexagons with a removed triad of bowties.

[BibT_eX]

[DOI]

Mihai Ciucu

Tri Lai

Ranjan Rohatgi

J. Comb. Theory, Ser. A, 2021

A shuffling theorem for reflectively symmetric tilings.

[BibT_eX]

[DOI]

Tri Lai

Discret. Math., 2021

2020

Lozenge Tilings of Hexagons with Central Holes and Dents.

[BibT_eX]

[DOI]

Tri Lai

Electron. J. Comb., 2020

2019

Proof of a conjecture of Kenyon and Wilson on semicontiguous minors.

[BibT_eX]

[DOI]

Tri Lai

J. Comb. Theory, Ser. A, 2019

Lozenge tilings of doubly-intruded hexagons.

[BibT_eX]

[DOI]

Mihai Ciucu

Tri Lai

J. Comb. Theory, Ser. A, 2019

Enumeration of lozenge tilings of a hexagon with a shamrock missing on the symmetry axis.

[BibT_eX]

[DOI]

Tri Lai

Ranjan Rohatgi

Discret. Math., 2019

Enumeration of hybrid domino-lozenge tilings III: centrally symmetric tilings.

[BibT_eX]

[DOI]

Tri Lai

Australas. J Comb., 2019

2018

Lozenge Tilings of a Halved Hexagon with an Array of Triangles Removed from the Boundary.

[BibT_eX]

[DOI]

Tri Lai

SIAM J. Discret. Math., 2018

Lozenge Tilings of a Halved Hexagon with an Array of Triangles Removed from the Boundary, Part II.

[BibT_eX]

[DOI]

Tri Lai

Electron. J. Comb., 2018

Cyclically symmetric lozenge tilings of a hexagon with four holes.

[BibT_eX]

[DOI]

Tri Lai

Ranjan Rohatgi

Adv. Appl. Math., 2018

2017

A q-enumeration of lozenge tilings of a hexagon with four adjacent triangles removed from the boundary.

[BibT_eX]

[DOI]

Tri Lai

Eur. J. Comb., 2017

Proof of a refinement of Blum's conjecture on hexagonal dungeons.

[BibT_eX]

[DOI]

Tri Lai

Discret. Math., 2017

Perfect Matchings of Trimmed Aztec Rectangles.

[BibT_eX]

[DOI]

Tri Lai

Electron. J. Comb., 2017

A <i>q</i>-enumeration of lozenge tilings of a hexagon with three dents.

[BibT_eX]

[DOI]

Tri Lai

Adv. Appl. Math., 2017

2016

A Generalization of Aztec Dragons.

[BibT_eX]

[DOI]

Tri Lai

Graphs Comb., 2016

Generating Function of the Tilings of an Aztec Rectangle with Holes.

[BibT_eX]

[DOI]

Tri Lai

Graphs Comb., 2016

Enumeration of antisymmetric monotone triangles and domino tilings of quartered Aztec rectangles.

[BibT_eX]

[DOI]

Tri Lai

Discret. Math., 2016

A generalization of Aztec diamond theorem, part II.

[BibT_eX]

[DOI]

Tri Lai

Discret. Math., 2016

Enumeration of Hybrid Domino-Lozenge Tilings II: Quasi-Octagonal Regions.

[BibT_eX]

[DOI]

Tri Lai

Electron. J. Comb., 2016

Double Aztec rectangles.

[BibT_eX]

[DOI]

Tri Lai

Adv. Appl. Math., 2016

2015

A new proof for the number of lozenge tilings of quartered hexagons.

[BibT_eX]

[DOI]

Tri Lai

Discret. Math., 2015

2014

Enumeration of hybrid domino-lozenge tilings.

[BibT_eX]

[DOI]

Tri Lai

J. Comb. Theory, Ser. A, 2014

Proof of Blum's conjecture on hexagonal dungeons.

[BibT_eX]

[DOI]

Mihai Ciucu

Tri Lai

J. Comb. Theory, Ser. A, 2014

Enumeration of Tilings of Quartered Aztec Rectangles.

[BibT_eX]

[DOI]

Tri Lai

Electron. J. Comb., 2014

A Generalization of Aztec Diamond Theorem, Part I.

[BibT_eX]

[DOI]

Tri Lai

Electron. J. Comb., 2014

A Simple Proof for the Number of Tilings of Quartered Aztec Diamonds.

[BibT_eX]

[DOI]

Tri Lai

Electron. J. Comb., 2014

2013

New Aspects of Regions whose Tilings are Enumerated by Perfect Powers.

[BibT_eX]

[DOI]

Tri Lai

Electron. J. Comb., 2013

Tri Lai

Timeline

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