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da Silva, Cândida Nunes
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1

The Overfull Conjecture on split-comparability and split-in..:

da Soledade Gonzaga, Luis Gustavo ; de Sousa Cruz, Jadder Bismarck ; de Almeida, Sheila Morais.
Discrete Applied Mathematics.  340 (2023)  - p. 228-238 , 2023
Link: https://doi.org/10.1016/..
 
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2

Obstructions for χ-diperfectness:

Silva, Caroline Aparecida de Paula ; da Silva, Cândida Nunes ; Lee, Orlando
Procedia Computer Science.  223 (2023)  - p. 201-208 , 2023
Link: https://doi.org/10.1016/..
 
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3

On $$\chi $$-Diperfect Digraphs with Stability Number Two:

, In: LATIN 2022: Theoretical Informatics; Lecture Notes in Computer Science,
de Paula Silva, Caroline Aparecida ; da Silva, Cândida Nunes ; Lee, Orlando - p. 460-475 , 2022
Link: https://doi.org/10.1007/..
 
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4

The signature matrix for 6-Pfaffian graphs:

Costa Moço, Roberta Rasoviti Marques ; Assis Miranda, Alberto Alexandre ; da Silva, Cândida Nunes
Procedia Computer Science.  195 (2021)  - p. 298-305 , 2021
Link: https://doi.org/10.1016/..
 
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5

Hypohamiltonian Snarks Have a 5-Flow:

de Freitas, Breno Lima ; da Silva, Cândida Nunes ; Lucchesi, Cláudio L.
Electronic Notes in Discrete Mathematics.  50 (2015)  - p. 199-204 , 2015
Link: https://doi.org/10.1016/..
 
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6

A Faster Test for 4-Flow-Criticality in Snarks:

Carneiro, André Breda ; da Silva, Cândida Nunes ; McKay, Brendan
Electronic Notes in Discrete Mathematics.  50 (2015)  - p. 193-198 , 2015
Link: https://doi.org/10.1016/..
 
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7

3-Flows and Combs:

da Silva, Cândida Nunes ; Lucchesi, Cláudio L.
Journal of Graph Theory.  77 (2014)  4 - p. 260-277 , 2014
Link: https://doi.org/10.1002/..
 
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8

Snarks and Flow-Critical Graphs:

da Silva, Cândida Nunes ; Pesci, Lissa ; Lucchesi, Cláudio L.
Electronic Notes in Discrete Mathematics.  44 (2013)  - p. 299-305 , 2013
Link: https://doi.org/10.1016/..
 
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9

Flow-Critical Graphs:

da Silva, Cândida Nunes ; Lucchesi, Cláudio L.
Electronic Notes in Discrete Mathematics.  30 (2008)  - p. 165-170 , 2008
Link: https://doi.org/10.1016/..
 
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10

The chromatic index of split-interval graphs:

da Soledade Gonzaga, Luis Gustavo ; de Almeida, Sheila Morais ; Silva, da Cândida Nunes.
Procedia Computer Science.  195 (2021)  - p. 325-333 , 2021
Link: https://doi.org/10.1016/..
 
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11

Further split graphs known to be Class 1 and a characteriza..:

Cararo, Cintia Izabel ; Morais de Almeida, Sheila ; Nunes da Silva, Cândida
Discrete Applied Mathematics.  345 (2024)  - p. 114-124 , 2024
Link: https://doi.org/10.1016/..
 
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12

A family of counterexamples for a conjecture of Berge on α-..:

de Paula Silva, Caroline Aparecida ; Nunes da Silva, Cândida ; Lee, Orlando
Discrete Mathematics.  346 (2023)  8 - p. 113458 , 2023
Link: https://doi.org/10.1016/..
 
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13

χ-Diperfect digraphs:

Aparecida de Paula Silva, Caroline ; Nunes da Silva, Cândida ; Lee, Orlando
Discrete Mathematics.  345 (2022)  9 - p. 112941 , 2022
Link: https://doi.org/10.1016/..
 
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14

Berge's Conjecture and Aharoni–Hartman–Hoffman's Conjecture..:

Sambinelli, Maycon ; Negri Lintzmayer, Carla ; Nunes da Silva, Cândida.
Graphs and Combinatorics.  35 (2019)  4 - p. 921-931 , 2019
Link: https://doi.org/10.1007/..
 
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15

Advances in Aharoni-Hartman-Hoffman's Conjecture for Split ..:

Sambinelli, Maycon ; Nunes da Silva, Cândida ; Lee, Orlando
Electronic Notes in Discrete Mathematics.  62 (2017)  - p. 111-116 , 2017
Link: https://doi.org/10.1016/..
 
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