Assignment
Engineering Mathematics 1
· Paper has to be submitted November 10, 2014 at 12 noon.
· Presentation of papers will be scheduled later on.
· Only submitted papers can be presented.
· Papers should be written and presented in English.
· Paper consists of at most 8 pages, with the following structure:
Abstract
1. Introduction (Background, objectives, scopes)
2. Literature review (From the references only: Definitions, properties, recent
results, examples)
3. Applications (Better applications in your field of study)
4. Discussions (Your opinions, interpretations, potential applications, etc)
5. Conclusions
Acknowledgements
References
· The topics are as follows:
No 
TOPIC 
NAME 
A 
Liouville's theorem  Adrian Rau 
B 
Green's theorem (for line integral)  
C 
Quantum optimization  
D 
Stokes' theorem (for line integral) 
Cecilia Mandagi 
E 
Knapsack problem 
Tigri Runtuarow 
F 
Harnack's theorem 
Touries Mentang 
G 
WeierstrassCasorati theorem 
Asrini Rompas 
H 
Hadamard matrices and Errorcorrecting coding 
Fergy Sompie 
I 
KarushKuhnTucker theorem 
Evangelina Untung 
J 
Heisenberg uncertainty principle 
I Putu Suartana 
K 
Zorn's lemma 
Firmansyah Pumpente 
L 
Quantum theory of solids 
Debby Mumu 
M 
Banach spaces 
Fandel Maluw 
N 
Eigenvector of graph 
Windy Monoarfa 
O 
Balayage spaces 

P 

Meita Tumewu 
Q 
Hilbert spaces 
Jolan Sumajow 
R 
Prisoner's dilemma 

S 
GMRES (generalized minimal residuals) 

T 
Crossing number of graphs 

U 
Split binary semaphores 
Randi Mirah 
V 
Rectangular dual graphs 

W  Schwartz's theorem  Vanny Kandow 
X  Morera's theorem  Thresna Anastasia 
Y  Bloch space  
Z  WeierstrassCasorati theorem 