Personal Details
- Full Name: Hernández Jiménez, Enric
- Email: enriche@lsi.upc.edu
- Hobbies: since 1996 I enjoy playing serious Scrabble. You can have a look at my Scrabble cv.
Education
Date | Description |
---|---|
Since 01/2007 | Ph.D. in Artificial Intelligence by the Departament of Llenguatges i Sistemes Informàtics (LSI) of the Universitat Politècnica de Catalunya (UPC). (Degree regulated by Real Decreto 56/2005). |
Ph.D. Dissertation:
Uncertainty and Indistinguishability. Application to Modelling with Words. Mark: Excellent Cum Laude. Mentions: European Doctor (mention regulated by Real Decreto 56/2005). |
|
03/2000 04/2000 | Diploma of Advanced Studies (DEA) by the Universitat Politècnica de Catalunya (degree regulated by Real Decreto 778/1998). |
01/1996 08/1996 | Visiting Researcher at the University of Bath (UK) collaborating with the Computing Group of the School of Mathematical Sciences. |
09/1989 06/1993 | Computer Science Engineering by the Universitat Politècnica de Catalunya. |
Others
Reviewer of the following International Journals:
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Member of the OASIS Digital Signature Services eXtended (DSS-X) Technical Committee. |
Erdös Number
My Erdös number is 5 based on (for instance) the following sequence:
[1] |
E. Hernández and J. Recasens.
On possibilistic and probabilistic approximations of unrestricted
Belief Functions based on the concept of Fuzzy T-Preorder.
International Journal of Uncertainty, Fuzziness and Knowledge-Based Systems, 10(2):185-200, 2002. |
[2] |
J. Jacas and J. Recasens.
The Group of Isometries of an Indistinguishability Operator.
Fuzzy Sets and Systems, 146:27-41, 2004. |
[3] |
E. Trillas and C. Alsina and J. Jacas.
On contradiction in fuzzy logic.
Soft Computing, 3(4):197-199, 1999. |
[4] |
J. Aczel and C. Alsina.
Characterizations of some classes of quasilinear functions with applications to triangular norms and to synthesizing judgements. Contributions to production theory, natural resources, economic indices and related topics.
Methods Oper. Res., 48:3-22, 1984. |
[5] |
J. Aczel and P. Erdös.
The non-existence of a Hamel-basis and the general solution of Cauchy's functional equation for non-negative numbers.
Publ. Math. Debrecen, 12:259-263, 1965. |