AbstractIn previous work, we have introduced the technique of relaxed power series computations. With this technique, it is possible to solve implicit equations almost as quickly as doing the operations which occur in the implicit equation. Here “almost as quickly” means that we need to pay a logarithmic overhead. In this paper, we will show how to reduce this logarithmic factor in the case when the constant ring has sufficiently many 2pth roots of unity
This paper presents a novel technique for manipulating structures which represent infinite power ser...
We propose a new method for generating semidefinite relaxations of optimal power flow problems. The ...
We give a new proof of Fürer's bound for the cost of multiplying n-bit integers in the bit complexit...
AbstractIn previous work, we have introduced the technique of relaxed power series computations. Wit...
In previous work, we have introduced several fast algorithms for relaxed power series multiplication...
In previous work, we have introduced the technique of re-laxed power series computations. With this ...
AbstractAssume that we wish to expand the product h= fg of two formal power series f and g. Classica...
Current implementations of p-adic numbers usually rely on so called zealous algorithms, which comput...
The technique of relaxed power series expansion provides an efficient way to solve equations of the ...
In a previous article, an implementation of lazy p-adic integers with a multiplication of quasi-line...
International audienceWe give an algorithm for computing all roots of polynomials over a univariate ...
International audienceAs was initially shown by Brent, exponentials of truncated power series can be...
This paper presents a novel technique for manipulating structures which represent infinite power ser...
We propose a new method for generating semidefinite relaxations of optimal power flow problems. The ...
We give a new proof of Fürer's bound for the cost of multiplying n-bit integers in the bit complexit...
AbstractIn previous work, we have introduced the technique of relaxed power series computations. Wit...
In previous work, we have introduced several fast algorithms for relaxed power series multiplication...
In previous work, we have introduced the technique of re-laxed power series computations. With this ...
AbstractAssume that we wish to expand the product h= fg of two formal power series f and g. Classica...
Current implementations of p-adic numbers usually rely on so called zealous algorithms, which comput...
The technique of relaxed power series expansion provides an efficient way to solve equations of the ...
In a previous article, an implementation of lazy p-adic integers with a multiplication of quasi-line...
International audienceWe give an algorithm for computing all roots of polynomials over a univariate ...
International audienceAs was initially shown by Brent, exponentials of truncated power series can be...
This paper presents a novel technique for manipulating structures which represent infinite power ser...
We propose a new method for generating semidefinite relaxations of optimal power flow problems. The ...
We give a new proof of Fürer's bound for the cost of multiplying n-bit integers in the bit complexit...
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