We present a new method for deriving lower bounds to the expected number of queries made by noisy decision trees computing Boolean functions. The new method has the feature that expectations are taken with respect to a uniformly distributed random input, as well as with respect to the random noise, thus yielding stronger lower bounds. It also applies to many more functions than do previous results. The method yields a simple proof of the result (previously established by Reischuk and Schmeltz) that almost all Boolean functions of n arguments require $\Me(n \log n)$ queries, and strengthens this bound from the worst-case over inputs to the average over inputs. The method also yields bounds for specific Boolean functions in terms of their spe...
We prove that for any decision tree calculating a boolean function f : {-1,1}^n \to : {-1,1}Var [f]{...
We show that a noisy parallel decision tree making O(n) queries needs Ω(log ∗ n) rounds to compute O...
AbstractIt is well known that probabilistic boolean decision trees cannot be much more powerful than...
We present a new method for deriving lower bounds to the expected number of queries made by noisy de...
We present a new method for deriving lower bounds to the expected number of queries made by noisy de...
AbstractAssume we want to show that (a) the cost of any randomized decision tree computing a given B...
We investigate the randomized decision tree complexity of a specific class of read-once threshold fu...
Assume we want to show that (a) the cost of any randomized decision tree computing a given Boolean f...
We study noisy computation in randomly generated k-ary Boolean formulas. We establish bounds on the ...
Abstract: In this work we prove lower bounds on the randomized decision tree complexity of several r...
A classic result of Nisan [SICOMP '91] states that the deterministic decision tree∗depth∗complexity ...
In this note we prove that a monotone boolean function computable by a decision tree of size s has a...
In this paper we generate upper and lower bounds for the sensitivity to noise of a Boolean function ...
Abstract. We study impurity-based decision tree algorithms such as CART, C4.5, etc., so as to better...
We give an algorithm that learns any monotone Boolean function f: {−1, 1}n → {−1, 1} to any constant...
We prove that for any decision tree calculating a boolean function f : {-1,1}^n \to : {-1,1}Var [f]{...
We show that a noisy parallel decision tree making O(n) queries needs Ω(log ∗ n) rounds to compute O...
AbstractIt is well known that probabilistic boolean decision trees cannot be much more powerful than...
We present a new method for deriving lower bounds to the expected number of queries made by noisy de...
We present a new method for deriving lower bounds to the expected number of queries made by noisy de...
AbstractAssume we want to show that (a) the cost of any randomized decision tree computing a given B...
We investigate the randomized decision tree complexity of a specific class of read-once threshold fu...
Assume we want to show that (a) the cost of any randomized decision tree computing a given Boolean f...
We study noisy computation in randomly generated k-ary Boolean formulas. We establish bounds on the ...
Abstract: In this work we prove lower bounds on the randomized decision tree complexity of several r...
A classic result of Nisan [SICOMP '91] states that the deterministic decision tree∗depth∗complexity ...
In this note we prove that a monotone boolean function computable by a decision tree of size s has a...
In this paper we generate upper and lower bounds for the sensitivity to noise of a Boolean function ...
Abstract. We study impurity-based decision tree algorithms such as CART, C4.5, etc., so as to better...
We give an algorithm that learns any monotone Boolean function f: {−1, 1}n → {−1, 1} to any constant...
We prove that for any decision tree calculating a boolean function f : {-1,1}^n \to : {-1,1}Var [f]{...
We show that a noisy parallel decision tree making O(n) queries needs Ω(log ∗ n) rounds to compute O...
AbstractIt is well known that probabilistic boolean decision trees cannot be much more powerful than...