|
Research Field: Microeconomic Theory, Game Theory Office: Room 523, School of Economics 111 Wuchuan Road Contact Information: Email: tangqianfeng198@gmail.com Phone: 86-21-65902570 |
 |
Position
Assistant Professor, School of Economics, Shanghai University of Finance and Economics, 2011
Education
Ph.D., Economics, The University of Texas at Austin, 2011
M.S., Economics, The University of Texas at Austin, 2008
B.A., Economics and mathematics, Huazhong University of Science and Technology, 2006
M.S., Economics, The University of Texas at Austin, 2008
B.A., Economics and mathematics, Huazhong University of Science and Technology, 2006
Research
"Top Trading Cycles under General Capacities: A Characterization", 2013, working paper.
"A Note on School Choice with Consent," 2013, working paper.
"Interim Partially Correlated Rationalizability," 2012, working paper.
"Hierarchies of Belief and the Belief-invariant Bayesian Solution," 2012, working paper.
"Auctions with Networked Bidders," 2011, working paper.
"A Note on School Choice with Consent," 2013, working paper.
"Interim Partially Correlated Rationalizability," 2012, working paper.
"Hierarchies of Belief and the Belief-invariant Bayesian Solution," 2012, working paper.
"Auctions with Networked Bidders," 2011, working paper.
Teaching
Mathematical Economics (Course #0097, Fall, 2012)
Syllabus
Lecture 1 : Notations and sets
Lecture 2 : Euclidean and metric spaces
Lecture 3 : Cardinality and basic point-set topology
Lecture 4 : Continuity
Lecture 5 : Differentiation
Lecture 6 : Contraction mapping, inverse and implicit function theorems
Lecture 7 : The Weierstrass theorem
Lecture 8 : Basic convex analysis
Lecture 9 : Unconstrained optimization
Lecture 10 : Optimization with equality constraints
Lecture 11 : Optimization with inequality constraints
Syllabus
Lecture 1 : Notations and sets
Lecture 2 : Euclidean and metric spaces
Lecture 3 : Cardinality and basic point-set topology
Lecture 4 : Continuity
Lecture 5 : Differentiation
Lecture 6 : Contraction mapping, inverse and implicit function theorems
Lecture 7 : The Weierstrass theorem
Lecture 8 : Basic convex analysis
Lecture 9 : Unconstrained optimization
Lecture 10 : Optimization with equality constraints
Lecture 11 : Optimization with inequality constraints
