Hend Dawood
Hend Dawood is a Senior Lecturer of Computational Mathematics in the Department of Mathematics at Cairo University. She has more than ten years of research experience in the field of computational mathematics. Her current research interests include algebraic systems of interval mathematics, logical foundations of computation, proof theory and axiomatics, ordered algebraic structures and algebraic logic, mathematical cryptography, formal fuzzy logics, fractional calculus, automatic differentiation, uncertainty quantification, and uncertain computing. She authored a monograph on the foundations of interval mathematics and a number of related publications.
Hend Dawood is an Associate Editor for the International Journal of Fuzzy Computation and Modeling (IJFCM – Inderscience); and serves as a Reviewer for a number of international journals of repute in the field of computational mathematics including Neural Computing and Applications (NCA – Springer Verlag), Neural Processing Letters (NEPL - Springer Verlag), the Journal of the Egyptian Mathematical Society (JOEMS – Elsevier), Alexandria Engineering Journal (AEJ – Elsevier), Coupled Systems Mechanics (CSM – Techno-Press), and Reliable Computing (RC). She is a member of the Egyptian Mathematical Society (EMS), a member of the Cairo University Interval Arithmetic Research Group (CUIA), and a member of the IEEE 1788 committee for standardizing interval arithmetic.
As recognition of her professional contribution and activities, Hend Dawood is recipient of many research and academic awards including Schlumberger Award and Certificate of Merit (2003), ESSP Shield of Excellence and Certificate of Merit (2006), CUSC Medal and Certificate of Merit (2008), and CU International Publication Excellence Award (2012 and 2015).
Address: Department of Mathematics, Faculty of Science, Cairo University, Giza 12613, Egypt.
Hend Dawood is an Associate Editor for the International Journal of Fuzzy Computation and Modeling (IJFCM – Inderscience); and serves as a Reviewer for a number of international journals of repute in the field of computational mathematics including Neural Computing and Applications (NCA – Springer Verlag), Neural Processing Letters (NEPL - Springer Verlag), the Journal of the Egyptian Mathematical Society (JOEMS – Elsevier), Alexandria Engineering Journal (AEJ – Elsevier), Coupled Systems Mechanics (CSM – Techno-Press), and Reliable Computing (RC). She is a member of the Egyptian Mathematical Society (EMS), a member of the Cairo University Interval Arithmetic Research Group (CUIA), and a member of the IEEE 1788 committee for standardizing interval arithmetic.
As recognition of her professional contribution and activities, Hend Dawood is recipient of many research and academic awards including Schlumberger Award and Certificate of Merit (2003), ESSP Shield of Excellence and Certificate of Merit (2006), CUSC Medal and Certificate of Merit (2008), and CU International Publication Excellence Award (2012 and 2015).
Address: Department of Mathematics, Faculty of Science, Cairo University, Giza 12613, Egypt.
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Papers by Hend Dawood
Books & Chapters by Hend Dawood
The final publication will be available in 2020 from John Wiley and Sons, Inc.
Hend Dawood and Yasser Dawood. Universal Intervals: Towards a Dependency-Aware Interval Algebra. In S. Chakraverty, editor, Mathematical Methods in Interdisciplinary Sciences. John Wiley & Sons, Hoboken, New Jersey, 2020. ISBN 9781119585503.
Keywords. Interval mathematics, Uncertainty, Quantitative Knowledge, Reliability, Complex interval arithmetic, Machine interval arithmetic, Interval automatic differentiation, Computer graphics, Ray tracing, Interval root isolation.
Recommended Citation:
Hend Dawood. Interval Mathematics as a Potential Weapon against Uncertainty. In S. Chakraverty, editor, Mathematics of Uncertainty Modeling in the Analysis of Engineering and Science Problems. chapter 1, pages 1-38. IGI Global, Hershey, PA, 2014. ISBN 978-1-4666-4991-0.
The final publication is available at IGI Global via http://dx.doi.org/10.4018/978-1-4666-4991-0.ch001
Keywords. Classical interval arithmetic; Machine interval arithmetic; Interval dependency; Constraint intervals; Modal intervals; Classical complex intervals; Optimizational intervals; Optimizational complex intervals; S-field algebra; Ordering interval numbers.
Preprints & Reports by Hend Dawood
Teaching Documents by Hend Dawood
https://www.academia.edu/s/c3a3c25017/logical-methodology-chart?source=link
Readers of this chart will note its similarity to another which charts a very different method with very different goals.
This method aims at knowledge of validity and invalidity; the other aims at knowledge of truth and falsity.
https://www.academia.edu/s/c3a3c25017/logical-methodology-chart?source=link
https://www.academia.edu/s/874f52b183/applying-logic-chart?source=link
The dynamically combined deductive and hypothetico-deductive method has been available to objective investigators since ancient times. Only in the last half-century has it been taught in courses on scientific method and critical thinking. The below chart for teaching and applying it is only about thirty years old.—John Corcoran, June 2018
https://www.academia.edu/s/29117f7553/applied-logic-flow-chart?source=link
Its theoretical underpinnings are discuss in the 1989 essay “Argumentations and logic”.
https://www.academia.edu/s/e22733b6a9/argumentations-and-logic?source=link
https://www.academia.edu/s/c3a3c25017/logical-methodology-chart?source=link
Readers of this chart will note its similarity to another which charts a very different method with very different goals.
This method aims at knowledge of validity and invalidity; the other aims at knowledge of truth and falsity.
https://www.academia.edu/s/874f52b183/applying-logic-chart?source=link
PLEASE VET THE TRANSLATION , SUGGEST ALTERNATIVE WORDINGS, ETC. ALSO PLEASE MAKE FRANK OBJECTIONS TO THE ORIGINAL AND TO THE THEORY IT ILLUSTRATES.
https://www.academia.edu/s/29117f7553/applied-logic-flow-chart?source=link
The dynamically combined deductive and hypothetico-deductive method has been available to objective investigators since ancient times. Only in the last half-century has it been taught in courses on scientific method and critical thinking. The below chart for teaching and applying it is only about thirty years old.—John Corcoran, June 2018
Its theoretical underpinnings are discuss in the 1989 essay “Argumentations and logic”.
https://www.academia.edu/s/e22733b6a9/argumentations-and-logic?source=link
PLEASE MAKE SUGGESTIONS FOR ALTERNATIVE TRANSLATIONS, IMPROVEMENTS, CORRECTIONS, ETC.
The final publication will be available in 2020 from John Wiley and Sons, Inc.
Hend Dawood and Yasser Dawood. Universal Intervals: Towards a Dependency-Aware Interval Algebra. In S. Chakraverty, editor, Mathematical Methods in Interdisciplinary Sciences. John Wiley & Sons, Hoboken, New Jersey, 2020. ISBN 9781119585503.
Keywords. Interval mathematics, Uncertainty, Quantitative Knowledge, Reliability, Complex interval arithmetic, Machine interval arithmetic, Interval automatic differentiation, Computer graphics, Ray tracing, Interval root isolation.
Recommended Citation:
Hend Dawood. Interval Mathematics as a Potential Weapon against Uncertainty. In S. Chakraverty, editor, Mathematics of Uncertainty Modeling in the Analysis of Engineering and Science Problems. chapter 1, pages 1-38. IGI Global, Hershey, PA, 2014. ISBN 978-1-4666-4991-0.
The final publication is available at IGI Global via http://dx.doi.org/10.4018/978-1-4666-4991-0.ch001
Keywords. Classical interval arithmetic; Machine interval arithmetic; Interval dependency; Constraint intervals; Modal intervals; Classical complex intervals; Optimizational intervals; Optimizational complex intervals; S-field algebra; Ordering interval numbers.
https://www.academia.edu/s/c3a3c25017/logical-methodology-chart?source=link
Readers of this chart will note its similarity to another which charts a very different method with very different goals.
This method aims at knowledge of validity and invalidity; the other aims at knowledge of truth and falsity.
https://www.academia.edu/s/c3a3c25017/logical-methodology-chart?source=link
https://www.academia.edu/s/874f52b183/applying-logic-chart?source=link
The dynamically combined deductive and hypothetico-deductive method has been available to objective investigators since ancient times. Only in the last half-century has it been taught in courses on scientific method and critical thinking. The below chart for teaching and applying it is only about thirty years old.—John Corcoran, June 2018
https://www.academia.edu/s/29117f7553/applied-logic-flow-chart?source=link
Its theoretical underpinnings are discuss in the 1989 essay “Argumentations and logic”.
https://www.academia.edu/s/e22733b6a9/argumentations-and-logic?source=link
https://www.academia.edu/s/c3a3c25017/logical-methodology-chart?source=link
Readers of this chart will note its similarity to another which charts a very different method with very different goals.
This method aims at knowledge of validity and invalidity; the other aims at knowledge of truth and falsity.
https://www.academia.edu/s/874f52b183/applying-logic-chart?source=link
PLEASE VET THE TRANSLATION , SUGGEST ALTERNATIVE WORDINGS, ETC. ALSO PLEASE MAKE FRANK OBJECTIONS TO THE ORIGINAL AND TO THE THEORY IT ILLUSTRATES.
https://www.academia.edu/s/29117f7553/applied-logic-flow-chart?source=link
The dynamically combined deductive and hypothetico-deductive method has been available to objective investigators since ancient times. Only in the last half-century has it been taught in courses on scientific method and critical thinking. The below chart for teaching and applying it is only about thirty years old.—John Corcoran, June 2018
Its theoretical underpinnings are discuss in the 1989 essay “Argumentations and logic”.
https://www.academia.edu/s/e22733b6a9/argumentations-and-logic?source=link
PLEASE MAKE SUGGESTIONS FOR ALTERNATIVE TRANSLATIONS, IMPROVEMENTS, CORRECTIONS, ETC.
Citation:
Hend Dawood, & Yasser Dawood. (2019). InCLosure Code for Guaranteed Enclosures Under Interval Dependency: Supplementary Material for Article "A Logical Formalization of the Notion of Interval Dependency: Towards Reliable Intervalizations of Quantifiable Uncertainties" [Data set]. Zenodo. https://doi.org/10.5281/zenodo.3466032
Citation:
Hend Dawood, & Yasser Dawood. (2019). InCLosure Code for Enclosures of Real Functions: Supplementary Material for Chapter "Universal Intervals: Towards a Dependency-Aware Interval Algebra" [Data set]. Zenodo. https://doi.org/10.5281/zenodo.3236736