Dr. Angel Francisco Tenorio
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Dr. Angel Francisco Tenorio

Senior Lecturer
Pablo de Olavide University, Spain


Highest Degree
Ph.D. in Lie groups and algebras from University of Seville, Spain

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Area of Interest:

Mathematics
100%
Lie Algebras
62%
Computer Algebra
90%
Graph Theory
75%
Representation Theory
55%

Research Publications in Numbers

Books
4
Chapters
4
Articles
81
Abstracts
11

Selected Publications

  1. Falcon, O.J., R.M. Falcon, J. Nunez and A.F. Tenorio, 2010. Analysis of several WebQuest devoted to history of mathematics. Revista Numeros, 73: 89-101.
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  2. Ceballos, M., J. Nunez and A.F. Tenorio, 2010. The computation of abelian subalgebras in low-dimensional solvable lie algebras. WSEAS Trans. Mathe., 9: 22-31.
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  3. Ceballos, M., J. Nunez and A.F. Tenorio, 2010. Computing matrix representations of filiform lie algebras. Lecture Notes Comput. Sci., 6244: 61-72.
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  4. Hernandez, I., C. Mateos, J. Nunez and A.F. Tenorio, 2009. Lie theory: Applications to problems in mathematical finance and economics. Applied Mathe. Comput., 208: 446-452.
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  5. Ceballos, M., J. Nunez and A.F. Tenorio, 2009. An Algorithm to compute Abelian Subalgebras in linear algebras of upper-triangular matrices. AIP Conf. Proce., 1148: 53-56.
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  6. Ceballos, M., J. Nunez and A.F. Tenorio, 2009. Algorithm to compute the maximal abelian dimension of lie algebras. Computing, 84: 231-239.
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  7. Ceballos, M., J. Nunez and A.F. Tenorio, 2009. Abelian subalgebras in some particular types of lie algebras. Nonlinear Anal. A Theory Methods Appl., 71: e401-e408.
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  8. Benjumea, J.C., J. Nunez and A.F. Tenorio, 2009. Computing the law of a family of solvable lie algebras. Int. J. Algebra Comput., 19: 337-345.
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  9. Tenorio, A.F., 2008. Solvable lie algebras and maximal abelian dimensions. Acta Mathe. Univ. Comenianae, 77: 141-145.
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  10. Benjumea, J.C., J. Nunez and A.F. Tenorio, 2008. Minimal linear representations of low-dimensional nilpotent lie algebras. Mathe. Scand., 102: 17-26.
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  11. Benjumea, J.C., J. Nunez and A.F. Tenorio, 2007. The maximal abelian dimension of linear algebras formed by strictly upper triangular matrices. Theor. Mathe. Phys., 152: 1225-1233.
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  12. Benjumea, J.C., F.J. Echarte, J. Nunez and A.F. Tenorio, 2006. A method to obtain the lie group associated with a nilpotent lie algebra. Comput. Mathe. Appl., 51: 1493-1506.
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