We study self-regulating processes modeling biological transportation networks. Firstly, we write the formal $L^2$-gradient flow for the symmetric tensor valued diffusivity $D$ of a broad class of entropy dissipations associated with a purely diffusive model. The introduction of a prescribed electric potential leads to the Fokker-Planck equation, for whose entropy dissipations we also investigate the formal $L^2$-gradient flow. We derive an integral formula for the second variation of the dissipation functional, proving convexity (in dependence of diffusivity tensor) for a quadratic entropy density modeling Joule heating. Finally, we couple in the Poisson equation for the electric potential obtaining the Poisson-Nernst-Planck system. The fo...
A positive rate of entropy production at steady state is a distinctive feature of truly non-equilibr...
A fundamental result in the theory of Brownian motion is the Einstein-Sutherland relation between mo...
I present some results obtained together with D. Benedetto and L. Bertini on a gradient flow formula...
Molecular motors work collectively to transport cargo within cells, with anywhere from one to severa...
We propose a geometric theory of non-equilibrium thermodynamics, namely geometric thermodynamics, us...
We use the distances introduced in a previous joint paper to exhibit the gradient flow structure of ...
Thermal forces drive several nonequilibrium phenomena able to set a fluid in motion without pressure...
Characterization of composite materials, whose properties vary in space over microscopic scales, has...
We propose a gradient flow perspective to the spatially homogeneous Landau equation for soft potenti...
This thesis provides and investigates the rigorous gradient flow viewpoint of the spatially homogene...
Classical gradient systems have a linear relation between rates and driving forces. In generalized g...
We study long-time dynamical behaviors of weakly self-consistent Vlasov-Fokker-Planck equations. We ...
We derive thermodynamically consistent models of reaction-diffusion equations coupled to a heat equa...
We derive thermodynamically consistent models of reaction-diffusion equations coupled to a heat equa...
The nonadditive entropy introduced by Tsallis in 1988 has been used in different fields and generali...
A positive rate of entropy production at steady state is a distinctive feature of truly non-equilibr...
A fundamental result in the theory of Brownian motion is the Einstein-Sutherland relation between mo...
I present some results obtained together with D. Benedetto and L. Bertini on a gradient flow formula...
Molecular motors work collectively to transport cargo within cells, with anywhere from one to severa...
We propose a geometric theory of non-equilibrium thermodynamics, namely geometric thermodynamics, us...
We use the distances introduced in a previous joint paper to exhibit the gradient flow structure of ...
Thermal forces drive several nonequilibrium phenomena able to set a fluid in motion without pressure...
Characterization of composite materials, whose properties vary in space over microscopic scales, has...
We propose a gradient flow perspective to the spatially homogeneous Landau equation for soft potenti...
This thesis provides and investigates the rigorous gradient flow viewpoint of the spatially homogene...
Classical gradient systems have a linear relation between rates and driving forces. In generalized g...
We study long-time dynamical behaviors of weakly self-consistent Vlasov-Fokker-Planck equations. We ...
We derive thermodynamically consistent models of reaction-diffusion equations coupled to a heat equa...
We derive thermodynamically consistent models of reaction-diffusion equations coupled to a heat equa...
The nonadditive entropy introduced by Tsallis in 1988 has been used in different fields and generali...
A positive rate of entropy production at steady state is a distinctive feature of truly non-equilibr...
A fundamental result in the theory of Brownian motion is the Einstein-Sutherland relation between mo...
I present some results obtained together with D. Benedetto and L. Bertini on a gradient flow formula...