GAZI UNIVERSITY INFORMATION PACKAGE - 2019 ACADEMIC YEAR

COURSE DESCRIPTION
SPECIAL TOPICS IN ANALYSIS/MAT512A
Course Title: SPECIAL TOPICS IN ANALYSIS
Credits 3 ECTS 5
Semester 10 Compulsory/Elective Elective
COURSE INFO
 -- LANGUAGE OF INSTRUCTION
  Turkish
 -- NAME OF LECTURER(S)
  Prof.Dr. Ziya ARGÜN
 -- WEB SITE(S) OF LECTURER(S)
  www.gazi.edu.tr/~ziya
 -- EMAIL(S) OF LECTURER(S)
  ziya@gazi.edu.tr
 -- LEARNING OUTCOMES OF THE COURSE UNIT
They should be able to have basic knowledge and properties related with the spaces of Lp(X) , C(K)








 -- MODE OF DELIVERY
  Measure Theory and Topology
 -- PREREQUISITES AND CO-REQUISITES
  There is no prerequisite or co-requisite for this course
 -- RECOMMENDED OPTIONAL PROGRAMME COMPONENTS
  -
 --COURSE CONTENT
1. Week   Introduction to the this lecture (expectations and aims)
2. Week  Continous functions and their properties
3. Week  The vector space of Continous functions
4. Week  The Metrics which are defined on the vector space of Continous functions
5. Week  The norms which are defined on the vector space of Continous functions
6. Week  Completeness of the vector space of Continous functions
7. Week  Aprroximation to the Continous functions with polynomial functions
8. Week  Integrable functions and their properties
9. Week  The vector space of Integrable functions
10. Week  The Metrics which are defined on the vector space of Integrable functions
11. Week  The norms which are defined on the vector space of Integrable functions
12. Week  Completeness of the vector space of Integrable functions
13. Week  Aprroximation to the Integrable functions with the functions with compact support
14. Week  Summarize of the content of this lecture
15. Week  
16. Week  
 -- RECOMMENDED OR REQUIRED READING
  All recources related with the content of this lecture and internet
 -- PLANNED LEARNING ACTIVITIES AND TEACHING METHODS
  Exploration, Discussion, Brain storm, Demonstration,Concept map, inquiry, problem solving, discovery
 -- WORK PLACEMENT(S)
  -
 -- ASSESSMENT METHODS AND CRITERIA
 
Quantity
Percentage
 Mid-terms
1
25
 Assignment
1
10
 Exercises
1
5
 Projects
1
15
 Practice
0
0
 Quiz
0
0
 Contribution of In-term Studies to Overall Grade  
50
 Contribution of Final Examination to Overall Grade  
50
 -- WORKLOAD
 Efficiency  Total Week Count  Weekly Duration (in hour)  Total Workload in Semester
 Theoretical Study Hours of Course Per Week
14
2
28
 Practising Hours of Course Per Week
14
2
28
 Reading
0
 Searching in Internet and Library
0
 Designing and Applying Materials
14
1
14
 Preparing Reports
0
 Preparing Presentation
0
 Presentation
0
 Mid-Term and Studying for Mid-Term
0
 Final and Studying for Final
1
20
20
 Other
1
30
30
 TOTAL WORKLOAD: 
120
 TOTAL WORKLOAD / 25: 
4.8
 ECTS: 
5
 -- COURSE'S CONTRIBUTION TO PROGRAM
NO
 PROGRAM LEARNING OUTCOMES
1
2
3
4
5
1Acquisition of scientific thinking skillsX
2Making research and investigation independentlyX
3Acquisition of carefully observing and analytically thinking skillsX
4Acquisition of learning and teaching mathematics problemsX
5Comprehending, applying and explaining the importance of mathematical conceptsX
6Developing the thinking, producing, argumenting and probing abilitiesX
7Having the algorithm and sotftware writing abilities for solving computer supported problemsX
8Developing the ability of reaching information, evaluating and presenting informationX
9Improving yourself parallel to the developing technologyX
10Understands the disciplinary structure of mathematics, its historical development, related philosophical approaches and problems.X