In this paper, a program computing spectral sequences is reported. The theoretical al-gorithm supporting this program is based on effective homology and homological pertur-bation techniques. We illustrate the fundamental ideas of this algorithm by means of an example related to the famous Serre spectral sequence
AbstractA new improved "Simple complete proofs of the Serre spectral sequence theorems". I...
We set up the theory for a distributed algorithm for computing persistent homology. For this purpose...
We construct operations in the homology spectral sequence of cosimplicial E-infinity and cosimplicia...
John McCleary insisted in his interesting textbook entitled "User's guide to spectral sequences" on ...
John McCleary insisted in his interesting textbook entitled “User’s guide to spectral sequences ” on...
AbstractJohn McCleary insisted in his interesting textbook entitled “User’s guide to spectral sequen...
Abstract. Spectral sequences are a key theoretical and computational tool in algebraic topology. Thi...
Persistent homology and spectral sequences are two Algebraic Topology tools which are defined by mea...
Effective homology and spectral sequences are two different techniques of Algebraic Topology which c...
Abstract. Using methods developed by W. Singer and J. P. May, we describe a systematic approach to s...
International audienceIn this work, we build a spectral sequence in motivic homotopy that is analogo...
Both spectral sequences and persistent homology are tools in algebraic topology defined from filtrat...
Spectral sequence is a tool used to calculate, via sucessing aproximations, the homologies of a chai...
A spectral sequence that relates the homology of a polyhedron to the homology preshea
This Doctoral thesis is centered on connections between persistent homology and spectral sequences....
AbstractA new improved "Simple complete proofs of the Serre spectral sequence theorems". I...
We set up the theory for a distributed algorithm for computing persistent homology. For this purpose...
We construct operations in the homology spectral sequence of cosimplicial E-infinity and cosimplicia...
John McCleary insisted in his interesting textbook entitled "User's guide to spectral sequences" on ...
John McCleary insisted in his interesting textbook entitled “User’s guide to spectral sequences ” on...
AbstractJohn McCleary insisted in his interesting textbook entitled “User’s guide to spectral sequen...
Abstract. Spectral sequences are a key theoretical and computational tool in algebraic topology. Thi...
Persistent homology and spectral sequences are two Algebraic Topology tools which are defined by mea...
Effective homology and spectral sequences are two different techniques of Algebraic Topology which c...
Abstract. Using methods developed by W. Singer and J. P. May, we describe a systematic approach to s...
International audienceIn this work, we build a spectral sequence in motivic homotopy that is analogo...
Both spectral sequences and persistent homology are tools in algebraic topology defined from filtrat...
Spectral sequence is a tool used to calculate, via sucessing aproximations, the homologies of a chai...
A spectral sequence that relates the homology of a polyhedron to the homology preshea
This Doctoral thesis is centered on connections between persistent homology and spectral sequences....
AbstractA new improved "Simple complete proofs of the Serre spectral sequence theorems". I...
We set up the theory for a distributed algorithm for computing persistent homology. For this purpose...
We construct operations in the homology spectral sequence of cosimplicial E-infinity and cosimplicia...