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2021/2022

Research and Innovation

Code: 43475 ECTS Credits: 6
Degree Type Year Semester
4313136 Modelling for Science and Engineering OB 0 1
The proposed teaching and assessment methodology that appear in the guide may be subject to changes as a result of the restrictions to face-to-face class attendance imposed by the health authorities.

Contact

Name:
Anna Cima Mollet
Email:
Anna.Cima@uab.cat

Use of Languages

Principal working language:
english (eng)

Teachers

Ana Cortes Garcia
Martín-Hernán Campos Heredia
Isabel Serra Mochales

Prerequisites

There are no specific prerequisites. Students must have mathematical skills at a graduate level of a scientific or technological degree.

Objectives and Contextualisation

The aim of this module is to show students the variety of fields in which they will be able to apply the tools acquired during the Master courses. Hopefully they will be able to use them as guidance when looking for Internships in Companies and Institutions and also when choosing a topic and an advisor for the Master’s Thesis. We also expect that it will help them to find a career path.

Competences

  • Analyse complex systems in different fields and determine the basic structures and parameters of their workings.
  • Analyse, synthesise, organise and plan projects in the field of study.
  • Apply specific methodologies, techniques and resources to conduct research and produce innovative results in the area of specialisation.
  • Apply techniques for solving mathematical models and their real implementation problems.
  • Communicate and justify conclusions clearly and unambiguously to both specialised and non-specialised audiences.
  • Formulate, analyse and validate mathematical models of practical problems in different fields.
  • Integrate knowledge and use it to make judgements in complex situations, with incomplete information, while keeping in mind social and ethical responsibilities.
  • Isolate the main difficulty in a complex problem from other, less important issues.
  • Look for new areas to open up within the field.
  • Recognise the human, economic, legal and ethical dimension in professional practice.
  • Solve complex problems by applying the knowledge acquired to areas that are different to the original ones.
  • Solve problems in new or little-known situations within broader (or multidisciplinary) contexts related to the field of study.

Learning Outcomes

  1. Analyse, synthesise, organise and plan projects in the field of study.
  2. Apply specific methodologies, techniques and resources to conduct research and produce innovative results in the area of specialisation.
  3. Check the validity of the model with regard to the behaviour of the real system.
  4. Communicate and justify conclusions clearly and unambiguously to both specialised and non-specialised audiences.
  5. Describe the functional dependencies of the system with regard to the different parameters
  6. Design mathematical models that represent the system and its behaviour.
  7. Identify the parameters that determine how a system works.
  8. Implement the proposed solutions reliably and efficiently.
  9. Integrate knowledge and use it to make judgements in complex situations, with incomplete information, while keeping in mind social and ethical responsibilities.
  10. Isolate the main difficulty in a complex problem from other, less important issues.
  11. Look for new areas to open up within the field.
  12. Recognise the human, economic, legal and ethical dimension in professional practice.
  13. Solve complex problems by applying the knowledge acquired to areas that are different to the original ones.
  14. Solve mathematical models efficiently.
  15. Solve problems in new or little-known situations within broader (or multidisciplinary) contexts related to the field of study.

Content

We have two types of activities during the semester: to attend a three innovative mini-courses and attend a series of lectures given by people who work for companies or researchers working in universities or research centres.

The courses are the following:

  1. Introduction to Python for analytical purposes. Python basics. Data with Python. Problem solving with Python. Machine Learning with Python.
  2. Machine learning. Machine learning, artificial intelligence and data science: from deterministic to stochastic point of view. Supervised and unsupervised techniques: from trees to random forests.  Introduction to neural networks and mathematical challenges: performance assessment. ROC curves and cross validation.

    3. Numerical weather forecast models. Numerical Weather Prediction (NWP): A general overview, Basic concepts of Atmospheric Modelization: Approximations and Parameterizations, NWP models and computational power, Applications of Numerical Weather Prediction at   the Meteorological Service of Catalonia (SMC)

     

We will invite specialists in the fields of Modelling Complex Systems, Modelling of Engineering, Mathematical Modelling and Data Science. Among the others we will have talks from people coming from:

  • SMC, Servei Meteorològic de Catalunya, http://www.meteo.cat
  • CRM, Centre de Recerca Matemàtica, http://www.crm.cat
  • BTD, Barcelona Digital Talent, https://barcelonadigitaltalent.com
  • DSBlab, Dynamical Systems Biology lab (UPF), https://www.upf.edu/web/dsb
  • Meteosim, https://www.meteosim.com

Methodology

The methodology of the three courses is based on master classes which consist in the presentation of the theory, examples and some case studies.

Relating the lectures, they will be announced previously on the virtual campus of the module Research and Innovation. There the students will find the title of the talk, the name of the speaker, a short summary and links of interest.

 

         
         
         
         

 

Annotation: Within the schedule set by the centre or degree programme, 15 minutes of one class will be reserved for students to evaluate their lecturers and their courses or modules through questionnaires.

Activities

Title Hours ECTS Learning Outcomes
Type: Directed      
Attending Lectures 16 0.64 1, 2, 3, 5, 6, 10, 7, 8, 11, 9, 4, 15, 12, 14, 13
Attending Mini-courses 22 0.88 1, 2, 3, 5, 6, 10, 7, 8, 11, 9, 4, 15, 12, 14, 13

Assessment

Students must submit three projects corresponding to the three announced courses.

 

The Python for analytical course will be held on September 14, 21 and 28 and October 5. The deadline to submit the report is October 29. It must be done in teams of 2 or 3 people.

The proposed Machine learning course will take place on November 2, 5, 9 and 12. The corresponding report must be submitted by December 3 to the virtual campus. It must be done in teams of 2 or 3 people.

Finally, the courses on numerical weather forecast models will be presented on November 30 and December 14,21. The report must be submitted by January 21. It must be done in teams of 3 people.

On the other hand, attendance at the talks contributes to 10% of the final grade.

Assessment Activities

Title Weighting Hours ECTS Learning Outcomes
Attending Lectures 10% 16 0.64 3, 5, 7, 9, 4, 15
Making a report on Maching Learning 30% 32 1.28 1, 2, 3, 5, 6, 10, 7, 8, 11, 9, 4, 15, 12, 14, 13
Making a report on Numerical Weather Forecast Models 30% 32 1.28 3, 5, 7, 9, 4, 15
Report on Python for analitical purposes 30% 32 1.28 1, 2, 3, 5, 6, 10, 7, 8, 11, 9, 4, 15, 12, 14, 13

Bibliography

  • Bibliography and links of interest

 

  • https://www.python.org/about/gettingstarted/
  • https://www.learnpython.org/
  • https://learntocodewith.me/posts/python-for-data-science
  • Pitts W McCulloch W. A logical calculus of the ideas immanent in nervous activity. Bulletin of Mathematical Biophysics, 5, 1943.
  • L. Breiman, J.H. Friedman, R.A. Olshen and C.J Stone. Classification and Regression Trees. Wadsworth, Belmont, Ca, 1988.
  • Friedman, Jerome H. Data Mining and Statistics: What's the connection?". Computing Science and Statistics. 29. 1998.
  • B Ripley. Pattern Recognition and Neural Networks, Cambridge University Press, Cambridge. 2002.
  • T Hastie, R Tibshirani, J Friedman. The Elements of Statistical Learning. Data Mining, Inference and Prediction, Springer, New York. 2009.
  • Bishop, C. M. Pattern Recognition and Machine Learning, Springer, ISBN 978-0-387-31073-2. 2006.
  • Ethem Alpaydin. Introduction to Machine Learning (Fourth ed.). MIT. 2020.
  • Ahrens, C. Meteorology Today: An Introduction to Weather, Climate, and the Environment. International student edition. Brooks/Cole, CengageLearning. 2009.
  • Holton, J. R., & Hakim, G. J. (2012). An introduction to dynamic meteorology (Vol. 88). Academic press.
  • Wilks, D. S. (2011). Statistical methods in the atmospheric sciences (Vol. 100). Academic press.Gutiérrez, J. M. (2004). Redes probabilísticas y neuronales en las ciencias atmosféricas. Ministerio de Medio Ambiente, Secretaría General Técnica.

Software

The software will be detailed in each one of the courses.