Add to ORKGWe describe a graph parametrization of rational quadratic differen- tials with presence of a simple pole, whose critical trajectories form a network depending on parameters focusing on the network topological jumps. Obtained bifurcation diagrams are associated with the Stasheff polytopes.acceptedVersio
Abstract. A class of neuralmodels isintroduced inwhichthe topology of the neural network has been ge...
We uncover the very rich graph topology of generic bounded non-Hermitian spectra, distinct from the ...
There is a wealth of applied problems that can be posed as a dynamical system defined on a network w...
We describe a graph parametrization of rational quadratic differen- tials with presence of a simple p...
Dynamical networks are powerful tools for modeling a broad range of complex systems, including finan...
Dynamical networks are powerful tools for modeling a broad range of complex systems, including finan...
Abstract We define “BPS graphs” on punctured Riemann surfaces associated with A N −1 theories of cla...
Abstract: We introduce new geometric objects called spectral networks. Spectral net-works are networ...
We study a geometric description of BPS states in supersymmetric theories with eight supercharges in...
Complex real-world phenomena across a wide range of scales, from aviation and Internet traffic to si...
Complex real-world phenomena across a wide range of scales, from aviation and Internet traffic to si...
We study Turing bifurcations on one-dimensional random ring networks where the probability of a conn...
In this thesis we study a number of geometric structures arising in the study of four-dimensional su...
In the context of complex quadratic networks (CQNs) introduced previously, we study escape radius an...
A computational technique is introduced to reveal the complex intrinsic structure of homoclinic and ...
Abstract. A class of neuralmodels isintroduced inwhichthe topology of the neural network has been ge...
We uncover the very rich graph topology of generic bounded non-Hermitian spectra, distinct from the ...
There is a wealth of applied problems that can be posed as a dynamical system defined on a network w...
We describe a graph parametrization of rational quadratic differen- tials with presence of a simple p...
Dynamical networks are powerful tools for modeling a broad range of complex systems, including finan...
Dynamical networks are powerful tools for modeling a broad range of complex systems, including finan...
Abstract We define “BPS graphs” on punctured Riemann surfaces associated with A N −1 theories of cla...
Abstract: We introduce new geometric objects called spectral networks. Spectral net-works are networ...
We study a geometric description of BPS states in supersymmetric theories with eight supercharges in...
Complex real-world phenomena across a wide range of scales, from aviation and Internet traffic to si...
Complex real-world phenomena across a wide range of scales, from aviation and Internet traffic to si...
We study Turing bifurcations on one-dimensional random ring networks where the probability of a conn...
In this thesis we study a number of geometric structures arising in the study of four-dimensional su...
In the context of complex quadratic networks (CQNs) introduced previously, we study escape radius an...
A computational technique is introduced to reveal the complex intrinsic structure of homoclinic and ...
Abstract. A class of neuralmodels isintroduced inwhichthe topology of the neural network has been ge...
We uncover the very rich graph topology of generic bounded non-Hermitian spectra, distinct from the ...
There is a wealth of applied problems that can be posed as a dynamical system defined on a network w...