Combinatorial Approaches To The Jacobian Conjecture

Omar, Mohamed

January 2007

The Jacobian Conjecture is a long-standing open problem in algebraic geometry. Though the problem is inherently algebraic, it crops up in fields throughout mathematics including perturbation theory, quantum field theory and combinatorics. This thesis is a unified treatment of the combinatorial approaches toward resolving the conjecture, particularly investigating the work done by Wright and Singer. Along with surveying their contributions, we present new proofs of their theorems and motivate their constructions. We also resolve the Symmetric Cubic Linear case, and present new conjectures whose resolution would prove the Jacobian Conjecture to be true.

Jacobian Conjecture

Catalan Tree Inversion Formula

Combinatorics and Optimization

Combinatorial Approaches To The Jacobian Conjecture

Omar, Mohamed

January 2007

The Jacobian Conjecture is a long-standing open problem in algebraic geometry. Though the problem is inherently algebraic, it crops up in fields throughout mathematics including perturbation theory, quantum field theory and combinatorics. This thesis is a unified treatment of the combinatorial approaches toward resolving the conjecture, particularly investigating the work done by Wright and Singer. Along with surveying their contributions, we present new proofs of their theorems and motivate their constructions. We also resolve the Symmetric Cubic Linear case, and present new conjectures whose resolution would prove the Jacobian Conjecture to be true.

Jacobian Conjecture

Catalan Tree Inversion Formula

Combinatorics and Optimization

Parking Functions and Related Combinatorial Structures.

Rattan, Amarpreet

January 2001

The central topic of this thesis is parking functions. We give a survey of some of the current literature concerning parking functions and focus on their interaction with other combinatorial objects; namely noncrossing partitions, hyperplane arrangements and tree inversions. In the final chapter, we discuss generalizations of both parking functions and the above structures.

Mathematics

parking function

noncrossing partition

hyperplane arrangement

tree inversion

Parking Functions and Related Combinatorial Structures.

Rattan, Amarpreet

January 2001

The central topic of this thesis is parking functions. We give a survey of some of the current literature concerning parking functions and focus on their interaction with other combinatorial objects; namely noncrossing partitions, hyperplane arrangements and tree inversions. In the final chapter, we discuss generalizations of both parking functions and the above structures.

Mathematics

parking function

noncrossing partition

hyperplane arrangement

tree inversion