In the area of query complexity of Boolean functions, the most widely studied cost measure of an algorithm is the worst-case number of queries made by it on an input. Motivated by the most natural cost measure studied in online algorithms, the competitive ratio, we consider a different cost measure for query algorithms for Boolean functions that captures the ratio of the cost of the algorithm and the cost of an optimal algorithm that knows the input in advance. The cost of an algorithm is its largest cost over all inputs. Grossman, Komargodski and Naor [ITCS'20] introduced this measure for Boolean functions, and dubbed it instance complexity. Grossman et al. showed, among other results, that monotone Boolean functions with instance complexi...
In this thesis we study various models of query complexity. A query algorithm computes a function un...
AbstractWe define two measures, γ and c, of complexity for Boolean functions. These measures are rel...
Combinational complexity and depth are the most important complexity measures for Boolean functions....
This thesis studies computational complexity in concrete models of computation. We draw on a range o...
Instance complexity is a measure of goodness of an algorithm in which the performance of one algorit...
The central focus of computational complexity theory is to measure the "hardness" of computing diffe...
Relations between the decision tree complexity and various other complexity measures of Boolean func...
This work investigates the hardness of solving natural computational problems according to different...
This paper describes a purely functional library for computing level-$p$-complexity of Boolean funct...
AbstractThe computation of Boolean functions by parallel computers with shared memory (PRAMs and WRA...
AbstractIt is well known that probabilistic boolean decision trees cannot be much more powerful than...
We determine the complexity of evaluating monotone Boolean functions in a variant of the decision tr...
CREW-PRAM's are a powerful model of parallel computers. Lower bounds for this model are rather gener...
AbstractWe discuss several complexity measures for Boolean functions: certificate complexity, sensit...
AbstractThe parity decision tree model extends the decision tree model by allowing the computation o...
In this thesis we study various models of query complexity. A query algorithm computes a function un...
AbstractWe define two measures, γ and c, of complexity for Boolean functions. These measures are rel...
Combinational complexity and depth are the most important complexity measures for Boolean functions....
This thesis studies computational complexity in concrete models of computation. We draw on a range o...
Instance complexity is a measure of goodness of an algorithm in which the performance of one algorit...
The central focus of computational complexity theory is to measure the "hardness" of computing diffe...
Relations between the decision tree complexity and various other complexity measures of Boolean func...
This work investigates the hardness of solving natural computational problems according to different...
This paper describes a purely functional library for computing level-$p$-complexity of Boolean funct...
AbstractThe computation of Boolean functions by parallel computers with shared memory (PRAMs and WRA...
AbstractIt is well known that probabilistic boolean decision trees cannot be much more powerful than...
We determine the complexity of evaluating monotone Boolean functions in a variant of the decision tr...
CREW-PRAM's are a powerful model of parallel computers. Lower bounds for this model are rather gener...
AbstractWe discuss several complexity measures for Boolean functions: certificate complexity, sensit...
AbstractThe parity decision tree model extends the decision tree model by allowing the computation o...
In this thesis we study various models of query complexity. A query algorithm computes a function un...
AbstractWe define two measures, γ and c, of complexity for Boolean functions. These measures are rel...
Combinational complexity and depth are the most important complexity measures for Boolean functions....