Typical optimization problems aim to select a single solution of maximum or minimum value from a large space of feasible solutions. For many such problems, feasible solutions are subsets of a global set of elements that meet certain constraints and achieve certain goals. Recent trends in optimization literature have shown a drift from classic optimization problems, which deal with static problems, to dynamic optimization paradigms such as the online methodology. We introduce a general framework for dynamic optimization, incremental optimization, in which problem constraints are allowed to develop monotonically in discrete time steps. Solutions to such problems are sequences of feasible solutions, one for each time step, such that later solu...
Linear programming (LP) and semidefinite programming (SDP) are among the most important tools in Ope...
The focus of this thesis is on solving a sequence of optimization problems that change over time in ...
Many real-world applications involve multiple competing objectives, but due to conflict between the ...
We propose a theoretical framework to capture incremental solutions to cardinality constrained maxim...
Traditional optimization algorithms are concerned with static input, static constraints, and attemp...
Many combinatorial optimization problems aim to select a subset of elements of maximum value subjec...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2018Cataloged from...
We consider incremental combinatorial optimization problems, in which a solution is constructed incr...
This paper is an attempt at describing the State of the Art of the vast field of continuous optimiza...
We consider incremental combinatorial optimization problems, in which a solution is constructed incr...
Optimization is a fundamental tool in modern science. Numerous important tasks in biology, economy, ...
Monotonic optimization consists of minimizing or maximizing a monotonic objective function over a s...
Min-max optimization is a classic problem with applications in constrained optimization, robust opti...
This thesis aims to improve the efficiency and accuracy of optimization algorithms. High-dimensiona...
In this thesis, we propose and study discrete, multi-period extensions of classical packing problems...
Linear programming (LP) and semidefinite programming (SDP) are among the most important tools in Ope...
The focus of this thesis is on solving a sequence of optimization problems that change over time in ...
Many real-world applications involve multiple competing objectives, but due to conflict between the ...
We propose a theoretical framework to capture incremental solutions to cardinality constrained maxim...
Traditional optimization algorithms are concerned with static input, static constraints, and attemp...
Many combinatorial optimization problems aim to select a subset of elements of maximum value subjec...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2018Cataloged from...
We consider incremental combinatorial optimization problems, in which a solution is constructed incr...
This paper is an attempt at describing the State of the Art of the vast field of continuous optimiza...
We consider incremental combinatorial optimization problems, in which a solution is constructed incr...
Optimization is a fundamental tool in modern science. Numerous important tasks in biology, economy, ...
Monotonic optimization consists of minimizing or maximizing a monotonic objective function over a s...
Min-max optimization is a classic problem with applications in constrained optimization, robust opti...
This thesis aims to improve the efficiency and accuracy of optimization algorithms. High-dimensiona...
In this thesis, we propose and study discrete, multi-period extensions of classical packing problems...
Linear programming (LP) and semidefinite programming (SDP) are among the most important tools in Ope...
The focus of this thesis is on solving a sequence of optimization problems that change over time in ...
Many real-world applications involve multiple competing objectives, but due to conflict between the ...