Traditional optimization algorithms are concerned with static input, static constraints, and attempt to produce static output of optimal value. Recent literature has strayed from this conventional approach to deal with more realistic situations in which the input changes over time. Incremental optimization is a new framework for handling this type of dynamic behavior. We consider a general model for producing incremental versions of traditional covering problems along with several natural incremental metrics. Using this model, we demonstrate how to convert conventional algorithms into incremental algorithms with only a constant factor loss in approximation power. We introduce incremental versions of min cut, edge cover, and (k, r)-center a...
Hard combinatorial optimization problems are often approximated using linear or semidefinite program...
The authors propose a general technique called solution decomposition to devise approximation algori...
We study dynamic decision making under uncertainty when, at each period, the decision maker faces a ...
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...
Typical optimization problems aim to select a single solution of maximum or minimum value from a lar...
We propose a theoretical framework to capture incremental solutions to cardinality constrained maxim...
We consider incremental combinatorial optimization problems, in which a solution is constructed incr...
We consider incremental combinatorial optimization problems, in which a solution is constructed incr...
A general powerful method that permits simple proofs of relative lower bounds for incremental update...
A study of the general properties of incremental algorithms is presented. First, it is shown that wi...
An incremental algorithm (also called a dynamic update algorithm) updates the answer to some problem...
We study the incremental knapsack problem, where one wishes to sequentially pack items into a knapsa...
We develop fast approximations for several LP relaxations that arise in discrete and combinatorial o...
Combinatorial optimization is a multidisciplinary scientific area, lying in the interface of three m...
Hard combinatorial optimization problems are often approximated using linear or semidefinite program...
The authors propose a general technique called solution decomposition to devise approximation algori...
We study dynamic decision making under uncertainty when, at each period, the decision maker faces a ...
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...
Typical optimization problems aim to select a single solution of maximum or minimum value from a lar...
We propose a theoretical framework to capture incremental solutions to cardinality constrained maxim...
We consider incremental combinatorial optimization problems, in which a solution is constructed incr...
We consider incremental combinatorial optimization problems, in which a solution is constructed incr...
A general powerful method that permits simple proofs of relative lower bounds for incremental update...
A study of the general properties of incremental algorithms is presented. First, it is shown that wi...
An incremental algorithm (also called a dynamic update algorithm) updates the answer to some problem...
We study the incremental knapsack problem, where one wishes to sequentially pack items into a knapsa...
We develop fast approximations for several LP relaxations that arise in discrete and combinatorial o...
Combinatorial optimization is a multidisciplinary scientific area, lying in the interface of three m...
Hard combinatorial optimization problems are often approximated using linear or semidefinite program...
The authors propose a general technique called solution decomposition to devise approximation algori...
We study dynamic decision making under uncertainty when, at each period, the decision maker faces a ...