Add to ORKGAbstract. We introduce the smoothed analysis of algorithms, which continuously interpolates between the worst-case and average-case analyses of algorithms. In smoothed analysis, we measure the maximum over inputs of the expected performance of an algorithm under small random perturbations of that input. We measure this performance in terms of both the input size and the magnitude of the perturbations. We show that the simplex algorithm has smoothed complexity polynomial in the input size and the standard deviation of Gaussian perturbations
Explaining the excellent practical performance of the simplex method for linear programming has been...
The smoothed analysis of algorithms is concerned with the expected running time of an algor...
The minimum-cost flow problem is a classic problem in combinatorial optimization with various applic...
Smoothed analysis is a new way of analyzing algorithms introduced by Spielman and Teng. Classical me...
Many algorithms perform very well in practice, but have a poor worst-case performance. The reason fo...
Presented as part of the Workshop on Algorithms and Randomness on May 17, 2018 at 2:45 p.m. in the K...
Smoothed analysis combines elements over worst-case and average case analysis. For an instance x the...
Explaining the excellent practical performance of the simplex method for linear programming has been...
Smoothed analysis combines elements over worst-case and average case analysis. For an instance $x$, ...
Smoothed analysis combines elements over worst-case and average case analysis. For an instance $x$, ...
Smoothed analysis combines elements over worst-case and average case analysis. For an instance x, t...
Smoothed analysis combines elements over worst-case and average case analysis. For an instance $x$, ...
The k-means method is one of the most widely used clustering algorithms, drawing its popularity from...
The k-means method is one of the most widely used clustering algorithms, drawing its popularity from...
The simplex method for linear programming is known to be highly efficient in practice, and understan...
Explaining the excellent practical performance of the simplex method for linear programming has been...
The smoothed analysis of algorithms is concerned with the expected running time of an algor...
The minimum-cost flow problem is a classic problem in combinatorial optimization with various applic...
Smoothed analysis is a new way of analyzing algorithms introduced by Spielman and Teng. Classical me...
Many algorithms perform very well in practice, but have a poor worst-case performance. The reason fo...
Presented as part of the Workshop on Algorithms and Randomness on May 17, 2018 at 2:45 p.m. in the K...
Smoothed analysis combines elements over worst-case and average case analysis. For an instance x the...
Explaining the excellent practical performance of the simplex method for linear programming has been...
Smoothed analysis combines elements over worst-case and average case analysis. For an instance $x$, ...
Smoothed analysis combines elements over worst-case and average case analysis. For an instance $x$, ...
Smoothed analysis combines elements over worst-case and average case analysis. For an instance x, t...
Smoothed analysis combines elements over worst-case and average case analysis. For an instance $x$, ...
The k-means method is one of the most widely used clustering algorithms, drawing its popularity from...
The k-means method is one of the most widely used clustering algorithms, drawing its popularity from...
The simplex method for linear programming is known to be highly efficient in practice, and understan...
Explaining the excellent practical performance of the simplex method for linear programming has been...
The smoothed analysis of algorithms is concerned with the expected running time of an algor...
The minimum-cost flow problem is a classic problem in combinatorial optimization with various applic...