We introduce the nested canalyzing depth of a function, which measures the extent to which it retains a nested canalyzing structure. We characterize the structure of functions with a given depth and compute the expected activities and sensitivities of the variables. This analysis quantifies how canalyzation leads to higher stability in Boolean networks. It generalizes the notion of nested canalyzing functions (NCFs), which are precisely the functions with maximum depth. NCFs have been proposed as gene regulatory network models, but their structure is frequently too restrictive and they are extremely sparse. We find that functions become decreasingly sensitive to input perturbations as the canalyzing depth increases, but exhibit rapidly dimi...
Nested canalization (NC) is a property of Boolean functions which has been recently extended to mult...
Discrete models of gene regulatory networks have gained popularity in computational systems biology ...
We generate the critical condition for the phase transition of a Boolean network governed by partial...
We introduce the nested canalyzing depth of a function, which measures the extent to which it retain...
A large influx of experimental data has prompted the development of innovative computational t...
Boolean networks are an important model of gene regulatory networks in systems and computational bio...
Nested canalizing Boolean functions (NCF) play an important role in biologically motivated regulator...
Nested canalizing Boolean functions (NCF) play an important role in biologically motivated regulator...
Boolean networks are a popular modeling framework in computational biology to capture the dynamics o...
Time- and state-discrete dynamical systems are frequently used to model molecular networks. This pap...
Boolean networks are a popular modeling framework in computational biology to capture the dynamics o...
This paper studies the spread of perturbations through networks composed of Boolean functions with s...
Boolean network models have gained popularity in computational systems biology over the last dozen y...
We study regulatory networks of N genes giving rise to a vector expression profile v(t) in which eac...
We determine stability and attractor properties of random Boolean genetic network models with canaly...
Nested canalization (NC) is a property of Boolean functions which has been recently extended to mult...
Discrete models of gene regulatory networks have gained popularity in computational systems biology ...
We generate the critical condition for the phase transition of a Boolean network governed by partial...
We introduce the nested canalyzing depth of a function, which measures the extent to which it retain...
A large influx of experimental data has prompted the development of innovative computational t...
Boolean networks are an important model of gene regulatory networks in systems and computational bio...
Nested canalizing Boolean functions (NCF) play an important role in biologically motivated regulator...
Nested canalizing Boolean functions (NCF) play an important role in biologically motivated regulator...
Boolean networks are a popular modeling framework in computational biology to capture the dynamics o...
Time- and state-discrete dynamical systems are frequently used to model molecular networks. This pap...
Boolean networks are a popular modeling framework in computational biology to capture the dynamics o...
This paper studies the spread of perturbations through networks composed of Boolean functions with s...
Boolean network models have gained popularity in computational systems biology over the last dozen y...
We study regulatory networks of N genes giving rise to a vector expression profile v(t) in which eac...
We determine stability and attractor properties of random Boolean genetic network models with canaly...
Nested canalization (NC) is a property of Boolean functions which has been recently extended to mult...
Discrete models of gene regulatory networks have gained popularity in computational systems biology ...
We generate the critical condition for the phase transition of a Boolean network governed by partial...