In the present paper, we study the power output and efficiency of overdamped stochastic thermodynamic engines that are in contact with a heat bath having a temperature that varies periodically with time. This is in contrast to most of the existing literature that considers the Carnot paradigm of alternating contact with heat baths having different fixed temperatures, hot and cold. Specifically, we consider a periodic and bounded but otherwise arbitrary temperature profile and derive explicit bounds on the power and efficiency achievable by a suitable controlling potential that couples the thermodynamic engine to the external world. Standing assumptions in our analysis are bounds on the norm of the gradient of effective potentials -- in the ...
The efficiency of an heat engine is traditionally defined as the ratio of its average output work ov...
We consider the performance of periodically driven stochastic heat engines in the linear response re...
Abstract The Curzon-Ahlborn (CA) efficiency, as the efficiency at the maximum power (EMP) of the end...
This work obtains the efficiency at maximum power for a stochastic heat engine performing Carnot-lik...
Stochastic thermodynamics has revolutionized our understanding of heat engines operating in finite t...
Classical thermodynamics is aimed at quantifying the efficiency of thermodynamic engines by bounding...
In contrast to the classical concept of a Carnot engine that alternates contact between heat baths o...
The context of the present paper is stochastic thermodynamics-an approach to nonequilibrium thermody...
Classical thermodynamics aimed to quantify the efficiency of thermodynamic engines, by bounding the ...
We propose a thermodynamically consistent, analytically tractable model of steady-state active heat ...
We optimize finite-time stochastic heat engines with a periodically scaled Hamiltonian under experim...
We study thermodynamic processes in contact with a heat bath that may have an arbitrary time-varying...
Recent advances in experimental control of colloidal systems have spurred a revolution in the produc...
The Carnot theorem, one expression of the second law of thermodynamics, places a fundamental upper b...
We study the ratio between the variances of work output and heat input, $\eta^{(2)}$, for a class of...
The efficiency of an heat engine is traditionally defined as the ratio of its average output work ov...
We consider the performance of periodically driven stochastic heat engines in the linear response re...
Abstract The Curzon-Ahlborn (CA) efficiency, as the efficiency at the maximum power (EMP) of the end...
This work obtains the efficiency at maximum power for a stochastic heat engine performing Carnot-lik...
Stochastic thermodynamics has revolutionized our understanding of heat engines operating in finite t...
Classical thermodynamics is aimed at quantifying the efficiency of thermodynamic engines by bounding...
In contrast to the classical concept of a Carnot engine that alternates contact between heat baths o...
The context of the present paper is stochastic thermodynamics-an approach to nonequilibrium thermody...
Classical thermodynamics aimed to quantify the efficiency of thermodynamic engines, by bounding the ...
We propose a thermodynamically consistent, analytically tractable model of steady-state active heat ...
We optimize finite-time stochastic heat engines with a periodically scaled Hamiltonian under experim...
We study thermodynamic processes in contact with a heat bath that may have an arbitrary time-varying...
Recent advances in experimental control of colloidal systems have spurred a revolution in the produc...
The Carnot theorem, one expression of the second law of thermodynamics, places a fundamental upper b...
We study the ratio between the variances of work output and heat input, $\eta^{(2)}$, for a class of...
The efficiency of an heat engine is traditionally defined as the ratio of its average output work ov...
We consider the performance of periodically driven stochastic heat engines in the linear response re...
Abstract The Curzon-Ahlborn (CA) efficiency, as the efficiency at the maximum power (EMP) of the end...