Recently there have been several attempts to provide a whole set of generators of the ideal of the algebraic variety associated to a phylogenetic tree evolving under an algebraic model. These algebraic varieties have been proven to be useful in phylogenetics. In this paper we prove that, for phylogenetic reconstruction purposes, it is enough to consider generators coming from the edges of the tree, the so-called edge invariants. This is the algebraic analogous to Buneman's Splits Equivalence Theorem. The interest of this result relies on its potential applications in phylogenetics for the widely used evolutionary models such as Jukes-Cantor, Kimura 2 and 3 parameters, and General Markov models
Phylogenetics is the study of the evolutionary relationships of a group of species, and it is usuall...
AbstractThe method of invariants is an important approach in biology for determining phylogenetic in...
Modelling the substitution of nucleotides along a phylogenetic tree is usually done by a hidden Mark...
Recently there have been several attempts to provide a whole set of generators of the ideal of the a...
AbstractRecently there have been several attempts to provide a whole set of generators of the ideal ...
AbstractThe general Markov model of the evolution of biological sequences along a tree leads to a pa...
A new approach to phylogenetic reconstruction has been emerging in the last years. Given an evoluti...
Abstract: The probabilistic models used in the inference of phylogenetic trees from molecular data a...
In this expository work we describe the main aspects of the so-called Phylogenetic Algebraic Geometr...
The general Markov model of the evolution of biological sequences along a tree leads to a parameteri...
We present a combinatorial approach for calculating the phylogenetic invariants for an evolutionary ...
Abstract. Phylogenetic algebraic geometry is concerned with certain complex projec-tive algebraic va...
Mathematical models for describing biological systems are becoming more and more important nowadays....
Motivated by phylogenetics, our aim is to obtain a system of equations that de ne a phylogenetic var...
An attempt to use phylogenetic invariants for tree reconstruction was made at the end of the 80s an...
Phylogenetics is the study of the evolutionary relationships of a group of species, and it is usuall...
AbstractThe method of invariants is an important approach in biology for determining phylogenetic in...
Modelling the substitution of nucleotides along a phylogenetic tree is usually done by a hidden Mark...
Recently there have been several attempts to provide a whole set of generators of the ideal of the a...
AbstractRecently there have been several attempts to provide a whole set of generators of the ideal ...
AbstractThe general Markov model of the evolution of biological sequences along a tree leads to a pa...
A new approach to phylogenetic reconstruction has been emerging in the last years. Given an evoluti...
Abstract: The probabilistic models used in the inference of phylogenetic trees from molecular data a...
In this expository work we describe the main aspects of the so-called Phylogenetic Algebraic Geometr...
The general Markov model of the evolution of biological sequences along a tree leads to a parameteri...
We present a combinatorial approach for calculating the phylogenetic invariants for an evolutionary ...
Abstract. Phylogenetic algebraic geometry is concerned with certain complex projec-tive algebraic va...
Mathematical models for describing biological systems are becoming more and more important nowadays....
Motivated by phylogenetics, our aim is to obtain a system of equations that de ne a phylogenetic var...
An attempt to use phylogenetic invariants for tree reconstruction was made at the end of the 80s an...
Phylogenetics is the study of the evolutionary relationships of a group of species, and it is usuall...
AbstractThe method of invariants is an important approach in biology for determining phylogenetic in...
Modelling the substitution of nucleotides along a phylogenetic tree is usually done by a hidden Mark...