Nella Rotundo scite author profile

Driven by applications like organic semiconductors there is an increased interest in numerical simulations based on drift-diffusion models with arbitrary statistical distribution functions. This requires numerical schemes that preserve qualitative properties of the solutions, such as positivity of densities, dissipativity and consistency with thermodynamic equilibrium. An extension of the Scharfetter-Gummel scheme guaranteeing consistency with thermodynamic equilibrium is studied. It is derived by replacing the thermal voltage with an averaged diffusion enhancement for which we provide a new explicit formula. This approach avoids solving the costly local nonlinear equations defining the current for generalized Scharfetter-Gummel schemes.

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Error estimates in weighted Sobolev norms for finite element immersed interface methods

Heltai

Rotundo

2019

Computers & Mathematics with Applications

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When solving elliptic partial differential equations in a region containing immersed interfaces (possibly evolving in time), it is often desirable to approximate the problem using an independent background discretisation, not aligned with the interface itself. Optimal convergence rates are possible if the discretisation scheme is enriched by allowing the discrete solution to have jumps aligned with the surface, at the cost of a higher complexity in the implementation.A much simpler way to reformulate immersed interface problems consists in replacing the interface by a singular force field that produces the desired interface conditions, as done in immersed boundary methods. These methods are known to have inferior convergence properties, depending on the global regularity of the solution across the interface, when compared to enriched methods.In this work we prove that this detrimental effect on the convergence properties of the approximate solution is only a local phenomenon, restricted to a small neighbourhood of the interface. In particular we show that optimal approximations can be constructed in a natural and inexpensive way, simply by reformulating the problem in a distributionally consistent way, and by resorting to weighted norms when computing the global error of the approximation.

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On the Tractability Index of a Class of Partial Differential-Algebraic Equations

Alì

Rotundo

2012

Acta Appl Math

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An existence result for elliptic partial differential–algebraic equations arising in semiconductor modeling

Alì

Rotundo

2010

Nonlinear Analysis: Theory, Methods & Applications

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Nella Rotundo

Drift-Diffusion Models

On thermodynamic consistency of a Scharfetter–Gummel scheme based on a modified thermal voltage for drift-diffusion equations with diffusion enhancement

Error estimates in weighted Sobolev norms for finite element immersed interface methods

On the Tractability Index of a Class of Partial Differential-Algebraic Equations

An existence result for elliptic partial differential–algebraic equations arising in semiconductor modeling

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