APPLICATION OF THE BANACH FIXED POINT THEOREM ON FUZZY QUASI-METRIC SPACES TO STUDY THE COST OF ALGORITHMS WITH TWO RECURRENCE EQUATIONS
Francisco Castro-Company, Salvador Romaguera, Pedro Tirado
2010
Abstract
Considering recursiveness as a unifying theory for algorithm related problems, we take advantage of algorithms formulation in terms of recurrence equations to show the existence and uniqueness of solution for the two recurrence equations associated to a kind of algorithms defined as two procedures depending the one on the other by applying the Banach contraction principle in a suitable product of fuzzy quasi-metrics on the domain of words.
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Paper Citation
in Harvard Style
Castro-Company F., Romaguera S. and Tirado P. (2010). APPLICATION OF THE BANACH FIXED POINT THEOREM ON FUZZY QUASI-METRIC SPACES TO STUDY THE COST OF ALGORITHMS WITH TWO RECURRENCE EQUATIONS . In Proceedings of the International Conference on Fuzzy Computation and 2nd International Conference on Neural Computation - Volume 1: ICFC, (IJCCI 2010) ISBN 978-989-8425-32-4, pages 105-109. DOI: 10.5220/0003081301050109
in Bibtex Style
@conference{icfc10,
author={Francisco Castro-Company and Salvador Romaguera and Pedro Tirado},
title={APPLICATION OF THE BANACH FIXED POINT THEOREM ON FUZZY QUASI-METRIC SPACES TO STUDY THE COST OF ALGORITHMS WITH TWO RECURRENCE EQUATIONS},
booktitle={Proceedings of the International Conference on Fuzzy Computation and 2nd International Conference on Neural Computation - Volume 1: ICFC, (IJCCI 2010)},
year={2010},
pages={105-109},
publisher={SciTePress},
organization={INSTICC},
doi={10.5220/0003081301050109},
isbn={978-989-8425-32-4},
}
in EndNote Style
TY - CONF
JO - Proceedings of the International Conference on Fuzzy Computation and 2nd International Conference on Neural Computation - Volume 1: ICFC, (IJCCI 2010)
TI - APPLICATION OF THE BANACH FIXED POINT THEOREM ON FUZZY QUASI-METRIC SPACES TO STUDY THE COST OF ALGORITHMS WITH TWO RECURRENCE EQUATIONS
SN - 978-989-8425-32-4
AU - Castro-Company F.
AU - Romaguera S.
AU - Tirado P.
PY - 2010
SP - 105
EP - 109
DO - 10.5220/0003081301050109