# Laboratory for Cyber Physical Networks and Systems (CyPhyNets)

CyPhyNets: Laboratory for Cyber Physical Networks and Systems.

School of Science & Engineering, SSE

Lahore University of Management Sciences LUMS

Lahore, Pakistan

This website is under construction.

# Group Members

Positions open.

### Affiliates

• Muhammad Ali, Consultant Engineer
• Zubair Khalid, Research Assistant

### Students

• Zahaib Akhtar, CmpE Senior
• Muhammad Ali Ahmed, CmpE Junior
• Muhammad Ammar Hassan, SSE freshman

### Former Members

• Shahzad Bhatti, Lecturer in Mathematics, COMSATS Institute of Technology, Islamabad

# Research

• Complex networked systems to enable the deployment of very-large scale uniquitous instances of sensor networks, robotic swarms and mobile networking
• Rapid information discovery in massive high-dimensional data sets in robotics, networks and other areas using geometrical and topological methods
• Quantum information theory and quantum control for understanding the physics of information

# Teaching

### Formal Courses

• COMP-208. Computers for engineers [McGill. Winter 2008]
• Phy-102. Electricity and magnetism [LUMS. Autumn 2009]
• CS-683. Information theory [LUMS. Winter 2009]
• BIO-103. Freshman biology (Module on systems biology) [LUMS. Winter 2009]
• Introductory Electronics Lab, [LUMS. Fall 2009]

These work ..... $\frac{5}{6}$

$\int dx$

But these very similar ones do not. I think the above ones were already compiled during testing. $\frac{5}{6}$

$\cfrac{2}{c + \cfrac{2}{d + \cfrac{1}{2}}} = a$

$\binom{n}{k}$

$\int dy$

$\dfrac{k}{k-1} = 0.5 \qquad \dfrac{2}{c + \dfrac{2}{d + \dfrac{1}{2}}} = a$

$\phi_n(\kappa) = 0.033C_n^2\kappa^{-11/3},\quad \frac{1}{L_0}\ll\kappa\ll\frac{1}{l_0}$

$\phi_n(\kappa) = 0.033C_n^2\kappa^{-11/3},\quad \frac{1}{L_0}\ll\kappa\ll\frac{1}{l_0}$

$\frac {a}{b}\ \tfrac {a}{b}$ $\begin{matrix} x & y \\ z & v \end{matrix}$

${}_pF_q(a_1,\dots,a_p;c_1,\dots,c_q;z) = \sum_{n=0}^\infty \frac{(a_1)_n\cdots(a_p)_n}{(c_1)_n\cdots(c_q)_n} \frac{z^n}{n!}$


$\begin{bmatrix} 0 & \cdots & 0 \\ \vdots & \ddots & \vdots \\ 0 & \cdots & 0 \end{bmatrix}$