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You can be quite sure that M. Meyniel means "Monsieur Meyniel" (a common usage in French).

Here is what I think is definite proof that M. Meyniel is H. Meyniel: The acknowledgement of the 1973 paper by M. Meyniel thanks J.C. Bermond, so evidently Bermond knew the author. In the article Cycles in digraphs - a survey Bermond and Thomassen cite the 1973 paper as follows:

Meynal, H., Une condition suffisante d'existance d'un circuit hamiltonien dans un graphe orienté, J. Combinatorial Theory B 14(1937), 137–147

You can be quite sure that M. Meyniel means "Monsieur Meyniel" (a common usage in French).

Here is what I think is definite proof that M. Meyniel is H. Meyniel: The acknowledgement of the 1973 paper by M. Meyniel thanks J.C. Bermond, so evidently Bermond knew the author. In the article Cycles in digraphs - a survey Bermond and Thomassen cite the 1973 paper as follows:

Meyniel, H., Une condition suffisante d'existance d'un circuit hamiltonien dans un graphe orienté, J. Combinatorial Theory B 14(1937), 137–147

You can be quite sure that M. Meyniel means "Monsieur Meyniel" (a common usage in French).

Here is what I think is definite proof that M. Meyniel is H. Meyniel: The acknowledgement of the 1973 paper by M. Meyniel thanks J.C. Bermond, so evidently Bermond knew the author. In the article Cycles in digraphs - a survey Bermond and Thomassen cite the 1973 paper as follows:

You can be quite sure that M. Meyniel means "Monsieur Meyniel" (a common usage in French).

Here is what I think is definite proof that M. Meyniel is H. Meyniel: The acknowledgement of the 1973 paper by M. Meyniel thanks J.C. Bermond, so evidently Bermond knew the author. In the article Cycles in digraphs - a survey Bermond and Thomassen cite the 1973 paper as follows:

Meynal, H., Une condition suffisante d'existance d'un circuit hamiltonien dans un graphe orienté, J. Combinatorial Theory B 14(1937), 137–147

You can be quite sure that M. Meyniel means "Monsieur Meyniel" (a common usage in French).

You can be quite sure that M. Meyniel means "Monsieur Meyniel" (a common usage in French).

Here is what I think is definite proof that M. Meyniel is H. Meyniel: The acknowledgement of the 1973 paper by M. Meyniel thanks J.C. Bermond, so evidently Bermond knew the author. In the article Cycles in digraphs - a survey Bermond and Thomassen cite the 1973 paper as follows: