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\documentclass[12pt]{article} |
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\usepackage[]{graphicx} |
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\maketitle |
\maketitle |
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\begin{abstract} |
\begin{abstract} |
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Some blabla |
As part of ongoing efforts to obtain a best possible synthesis of most |
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available, global-scale, ocean and sea ice data, a dynamic and thermodynamic |
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sea-ice model has been coupled to the Massachusetts Institute of Technology |
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general circulation model (MITgcm). Ice mechanics follow a viscous plastic |
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rheology and the ice momentum equations are solved numerically using either |
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line successive relaxation (LSR) or elastic-viscous-plastic (EVP) dynamic |
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models. Ice thermodynamics are represented using either a zero-heat-capacity |
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formulation or a two-layer formulation that conserves enthalpy. The model |
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includes prognostic variables for snow and for sea-ice salinity. The above |
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sea ice model components were borrowed from current-generation climate models |
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but they were reformulated on an Arakawa C-grid in order to match the MITgcm |
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oceanic grid and they were modified in many ways to permit efficient and |
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accurate automatic differentiation. This paper describes the MITgcm sea ice |
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model; it presents example Arctic and Antarctic results from a realistic, |
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eddy-permitting, global ocean and sea-ice configuration; it compares B-grid |
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and C-grid dynamic solvers in a regional Arctic configuration; and it presents |
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example results from coupled ocean and sea-ice adjoint-model integrations. |
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\end{abstract} |
\end{abstract} |
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\section{Introduction} |
\section{Introduction} |
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\label{sec:intro} |
\label{sec:intro} |
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more blabla |
The availability of an adjoint model as a powerful research |
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tool complementary to an ocean model was a major design |
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\section{Model} |
requirement early on in the development of the MIT general |
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\label{sec:model} |
circulation model (MITgcm) [Marshall et al. 1997a, |
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Marotzke et al. 1999, Adcroft et al. 2002]. It was recognized |
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that the adjoint permitted very efficient computation |
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of gradients of various scalar-valued model diagnostics, |
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norms or, generally, objective functions with respect |
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to external or independent parameters. Such gradients |
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arise in at least two major contexts. If the objective function |
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is the sum of squared model vs. obervation differences |
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weighted by e.g. the inverse error covariances, the gradient |
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of the objective function can be used to optimize this measure |
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of model vs. data misfit in a least-squares sense. One |
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is then solving a problem of statistical state estimation. |
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If the objective function is a key oceanographic quantity |
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such as meridional heat or volume transport, ocean heat |
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content or mean surface temperature index, the gradient |
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provides a complete set of sensitivities of this quantity |
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with respect to all independent variables simultaneously. |
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References to existing sea-ice adjoint models, explaining that they are either |
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for simplified configurations, for ice-only studies, or for short-duration |
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studies to motivate the present work. |
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Traditionally, probably for historical reasons and the ease of |
Traditionally, probably for historical reasons and the ease of |
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treating the Coriolis term, most standard sea-ice models are |
treating the Coriolis term, most standard sea-ice models are |
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discretized on Arakawa-B-grids \citep[e.g.,][]{hibler79, harder99, |
discretized on Arakawa-B-grids \citep[e.g.,][]{hibler79, harder99, |
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kreyscher00, zhang98, hunke97}. From the perspective of coupling a |
kreyscher00, zhang98, hunke97}. From the perspective of coupling a |
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sea ice-model to a C-grid ocean model, the exchange of fluxes of heat |
sea ice-model to a C-grid ocean model, the exchange of fluxes of heat |
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and fresh-water pose no difficulty for a B-grid sea-ice model |
and fresh-water pose no difficulty for a B-grid sea-ice model |
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\citep[e.g.,][]{timmermann02a}. However, surface stress is defined at |
\citep[e.g.,][]{timmermann02a}. However, surface stress is defined at |
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sea-ice model and a C-grid ocean model. While the smoothing implicitly |
sea-ice model and a C-grid ocean model. While the smoothing implicitly |
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associated with this interpolation may mask grid scale noise, it may |
associated with this interpolation may mask grid scale noise, it may |
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in two-way coupling lead to a computational mode as will be shown. By |
in two-way coupling lead to a computational mode as will be shown. By |
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choosing a C-grid for the sea-ice model, we circumvene this difficulty |
choosing a C-grid for the sea-ice model, we circumvent this difficulty |
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altogether and render the stress coupling as consistent as the |
altogether and render the stress coupling as consistent as the |
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buoyancy coupling. |
buoyancy coupling. |
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straits. In the limit of only one grid cell between coasts there is no |
straits. In the limit of only one grid cell between coasts there is no |
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flux allowed for a B-grid (with no-slip lateral boundary counditions), |
flux allowed for a B-grid (with no-slip lateral boundary counditions), |
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whereas the C-grid formulation allows a flux of sea-ice through this |
whereas the C-grid formulation allows a flux of sea-ice through this |
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passage for all types of lateral boundary conditions. We (will) |
passage for all types of lateral boundary conditions. We |
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demonstrate this effect in the Candian archipelago. |
demonstrate this effect in the Candian archipelago. |
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Talk about problems that make the sea-ice-ocean code very sensitive and |
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changes in the code that reduce these sensitivities. |
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This paper describes the MITgcm sea ice |
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model; it presents example Arctic and Antarctic results from a realistic, |
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eddy-permitting, global ocean and sea-ice configuration; it compares B-grid |
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and C-grid dynamic solvers in a regional Arctic configuration; and it presents |
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example results from coupled ocean and sea-ice adjoint-model integrations. |
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\section{Model} |
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\label{sec:model} |
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\subsection{Dynamics} |
\subsection{Dynamics} |
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\label{sec:dynamics} |
\label{sec:dynamics} |
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The momentum equations of the sea-ice model are standard with |
The momentum equation of the sea-ice model is |
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\begin{equation} |
\begin{equation} |
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\label{eq:momseaice} |
\label{eq:momseaice} |
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m \frac{D\vek{u}}{Dt} = -mf\vek{k}\times\vek{u} + \vtau_{air} + |
m \frac{D\vek{u}}{Dt} = -mf\vek{k}\times\vek{u} + \vtau_{air} + |
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\vtau_{ocean} - m \nabla{\phi(0)} + \vek{F}, |
\vtau_{ocean} - m \nabla{\phi(0)} + \vek{F}, |
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\end{equation} |
\end{equation} |
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where $\vek{u} = u\vek{i}+v\vek{j}$ is the ice velocity vectory, $m$ |
where $m=m_{i}+m_{s}$ is the ice and snow mass per unit area; |
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the ice mass per unit area, $f$ the Coriolis parameter, $g$ is the |
$\vek{u}=u\vek{i}+v\vek{j}$ is the ice velocity vector; |
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gravity accelation, $\nabla\phi$ is the gradient (tilt) of the sea |
$\vek{i}$, $\vek{j}$, and $\vek{k}$ are unit vectors in the $x$, $y$, and $z$ |
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surface height potential beneath the ice. $\phi$ is the sum of |
directions, respectively; |
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atmpheric pressure $p_{a}$ and loading due to ice and snow |
$f$ is the Coriolis parameter; |
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$(m_{i}+m_{s})g$. $\vtau_{air}$ and $\vtau_{ocean}$ are the wind and |
$\vtau_{air}$ and $\vtau_{ocean}$ are the wind-ice and ocean-ice stresses, |
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ice-ocean stresses, respectively. $\vek{F}$ is the interaction force |
respectively; |
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and $\vek{i}$, $\vek{j}$, and $\vek{k}$ are the unit vectors in the |
$g$ is the gravity accelation; |
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$x$, $y$, and $z$ directions. Advection of sea-ice momentum is |
$\nabla\phi(0)$ is the gradient (or tilt) of the sea surface height; |
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neglected. The wind and ice-ocean stress terms are given by |
$\phi(0) = g\eta + p_{a}/\rho_{0}$ is the sea surface height potential |
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in response to ocean dynamics ($g\eta$) and to atmospheric pressure |
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loading ($p_{a}/\rho_{0}$, where $\rho_{0}$ is a reference density); |
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and $\vek{F}=\nabla\cdot\sigma$ is the divergence of the internal ice stress |
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tensor $\sigma_{ij}$. |
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When using the rescaled vertical coordinate system, z$^\ast$, of |
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\citet{cam08}, $\phi(0)$ also includes a term due to snow and ice |
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loading, $mg/\rho_{0}$. |
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Advection of sea-ice momentum is neglected. The wind and ice-ocean stress |
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terms are given by |
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\begin{align*} |
\begin{align*} |
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\vtau_{air} =& \rho_{air} |\vek{U}_{air}|R_{air}(\vek{U}_{air}) \\ |
\vtau_{air} = & \rho_{air} C_{air} |\vek{U}_{air} -\vek{u}| |
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\vtau_{ocean} =& \rho_{ocean} |\vek{U}_{ocean}-\vek{u}| |
R_{air} (\vek{U}_{air} -\vek{u}), \\ |
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\vtau_{ocean} = & \rho_{ocean}C_{ocean} |\vek{U}_{ocean}-\vek{u}| |
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R_{ocean}(\vek{U}_{ocean}-\vek{u}), \\ |
R_{ocean}(\vek{U}_{ocean}-\vek{u}), \\ |
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\end{align*} |
\end{align*} |
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where $\vek{U}_{air/ocean}$ are the surface winds of the atmosphere |
where $\vek{U}_{air/ocean}$ are the surface winds of the atmosphere |
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and surface currents of the ocean, respectively. $C_{air/ocean}$ are |
and surface currents of the ocean, respectively; $C_{air/ocean}$ are |
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air and ocean drag coefficients, $\rho_{air/ocean}$ reference |
air and ocean drag coefficients; $\rho_{air/ocean}$ are reference |
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densities, and $R_{air/ocean}$ rotation matrices that act on the |
densities; and $R_{air/ocean}$ are rotation matrices that act on the |
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wind/current vectors. $\vek{F} = \nabla\cdot\sigma$ is the divergence |
wind/current vectors. |
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of the interal stress tensor $\sigma_{ij}$. |
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For an isotropic system the stress tensor $\sigma_{ij}$ ($i,j=1,2$) can |
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For an isotropic system this stress tensor can be related to the ice |
be related to the ice strain rate and strength by a nonlinear |
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strain rate and strength by a nonlinear viscous-plastic (VP) |
viscous-plastic (VP) constitutive law \citep{hibler79, zhang98}: |
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constitutive law \citep{hibler79, zhang98}: |
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\begin{equation} |
\begin{equation} |
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\label{eq:vpequation} |
\label{eq:vpequation} |
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\sigma_{ij}=2\eta(\dot{\epsilon}_{ij},P)\dot{\epsilon}_{ij} |
\sigma_{ij}=2\eta(\dot{\epsilon}_{ij},P)\dot{\epsilon}_{ij} |
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both thickness $h$ and compactness (concentration) $c$: |
both thickness $h$ and compactness (concentration) $c$: |
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\begin{equation} |
\begin{equation} |
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P_{\max} = P^{*}c\,h\,e^{[C^{*}\cdot(1-c)]}, |
P_{\max} = P^{*}c\,h\,e^{[C^{*}\cdot(1-c)]}, |
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\label{icestrength} |
\label{eq:icestrength} |
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\end{equation} |
\end{equation} |
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with the constants $P^{*}$ and $C^{*}$. The nonlinear bulk and shear |
with the constants $P^{*}$ and $C^{*}$. The nonlinear bulk and shear |
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viscosities $\eta$ and $\zeta$ are functions of ice strain rate |
viscosities $\eta$ and $\zeta$ are functions of ice strain rate |
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$\Delta_{\min}=10^{-11}\text{\,s}^{-1}$ (for numerical reasons) and a |
$\Delta_{\min}=10^{-11}\text{\,s}^{-1}$ (for numerical reasons) and a |
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maximum $\zeta_{\max} = P_{\max}/\Delta^*$, where |
maximum $\zeta_{\max} = P_{\max}/\Delta^*$, where |
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$\Delta^*=(5\times10^{12}/2\times10^4)\text{\,s}^{-1}$. For stress |
$\Delta^*=(5\times10^{12}/2\times10^4)\text{\,s}^{-1}$. For stress |
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tensor compuation the replacement pressure $P = 2\,\Delta\zeta$ |
tensor computation the replacement pressure $P = 2\,\Delta\zeta$ |
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\citep{hibler95} is used so that the stress state always lies on the |
\citep{hibler95} is used so that the stress state always lies on the |
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elliptic yield curve by definition. |
elliptic yield curve by definition. |
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is capped to suppress any tensile stress \citep{hibler97, geiger98}: |
is capped to suppress any tensile stress \citep{hibler97, geiger98}: |
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\begin{equation} |
\begin{equation} |
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\label{eq:etatem} |
\label{eq:etatem} |
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\eta = \min(\frac{\zeta}{e^2} |
\eta = \min\left(\frac{\zeta}{e^2}, |
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\frac{\frac{P}{2}-\zeta(\dot{\epsilon}_{11}+\dot{\epsilon}_{22})} |
\frac{\frac{P}{2}-\zeta(\dot{\epsilon}_{11}+\dot{\epsilon}_{22})} |
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{\sqrt{(\dot{\epsilon}_{11}+\dot{\epsilon}_{22})^2 |
{\sqrt{(\dot{\epsilon}_{11}+\dot{\epsilon}_{22})^2 |
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+4\dot{\epsilon}_{12}^2}} |
+4\dot{\epsilon}_{12}^2}}\right). |
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\end{equation} |
\end{equation} |
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In the current implementation, the VP-model is integrated with the |
In the current implementation, the VP-model is integrated with the |
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semi-implicit line successive over relaxation (LSOR)-solver of |
semi-implicit line successive over relaxation (LSOR)-solver of |
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\citet{zhang98}, which allows for long time steps that, in our case, |
\citet{zhang98}, which allows for long time steps that, in our case, |
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is limited by the explicit treatment of the Coriolis term. The |
are limited by the explicit treatment of the Coriolis term. The |
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explicit treatment of the Coriolis term does not represent a severe |
explicit treatment of the Coriolis term does not represent a severe |
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limitation because it restricts the time step to approximately the |
limitation because it restricts the time step to approximately the |
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same length as in the ocean model where the Coriolis term is also |
same length as in the ocean model where the Coriolis term is also |
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treated explicitly. |
treated explicitly. |
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\citet{hunke97}'s introduced an elastic contribution to the strain |
\citet{hunke97}'s introduced an elastic contribution to the strain |
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rate elatic-viscous-plastic in order to regularize |
rate in order to regularize Eq.\refeq{vpequation} in such a way that |
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Eq.\refeq{vpequation} in such a way that the resulting |
the resulting elastic-viscous-plastic (EVP) and VP models are |
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elatic-viscous-plastic (EVP) and VP models are identical at steady |
identical at steady state, |
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state, |
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\begin{equation} |
\begin{equation} |
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\label{eq:evpequation} |
\label{eq:evpequation} |
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\frac{1}{E}\frac{\partial\sigma_{ij}}{\partial{t}} + |
\frac{1}{E}\frac{\partial\sigma_{ij}}{\partial{t}} + |
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\dot{\epsilon}_{11}+\dot{\epsilon}_{22}$, and the horizontal tension |
\dot{\epsilon}_{11}+\dot{\epsilon}_{22}$, and the horizontal tension |
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and shearing strain rates, $D_T = |
and shearing strain rates, $D_T = |
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\dot{\epsilon}_{11}-\dot{\epsilon}_{22}$ and $D_S = |
\dot{\epsilon}_{11}-\dot{\epsilon}_{22}$ and $D_S = |
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2\dot{\epsilon}_{12}$, respectively and using the above abbreviations, |
2\dot{\epsilon}_{12}$, respectively, and using the above abbreviations, |
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the equations can be written as: |
the equations can be written as: |
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\begin{align} |
\begin{align} |
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\label{eq:evpstresstensor1} |
\label{eq:evpstresstensor1} |
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For details of the spatial discretization, the reader is referred to |
For details of the spatial discretization, the reader is referred to |
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\citet{zhang98, zhang03}. Our discretization differs only (but |
\citet{zhang98, zhang03}. Our discretization differs only (but |
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importantly) in the underlying grid, namely the Arakawa C-grid, but is |
importantly) in the underlying grid, namely the Arakawa C-grid, but is |
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otherwise straightforward. The EVP model in particular is discretized |
otherwise straightforward. The EVP model, in particular, is discretized |
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naturally on the C-grid with $\sigma_{1}$ and $\sigma_{2}$ on the |
naturally on the C-grid with $\sigma_{1}$ and $\sigma_{2}$ on the |
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center points and $\sigma_{12}$ on the corner (or vorticity) points of |
center points and $\sigma_{12}$ on the corner (or vorticity) points of |
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the grid. With this choice all derivatives are discretized as central |
the grid. With this choice all derivatives are discretized as central |
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$P$ at vorticity points. |
$P$ at vorticity points. |
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For a general curvilinear grid, one needs in principle to take metric |
For a general curvilinear grid, one needs in principle to take metric |
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terms into account that arise in the transformation a curvilinear grid |
terms into account that arise in the transformation of a curvilinear |
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on the sphere. However, for now we can neglect these metric terms |
grid on the sphere. For now, however, we can neglect these metric |
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because they are very small on the cubed sphere grids used in this |
terms because they are very small on the \ml{[modify following |
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paper; in particular, only near the edges of the cubed sphere grid, we |
section3:] cubed sphere grids used in this paper; in particular, |
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expect them to be non-zero, but these edges are at approximately |
only near the edges of the cubed sphere grid, we expect them to be |
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35\degS\ or 35\degN\ which are never covered by sea-ice in our |
non-zero, but these edges are at approximately 35\degS\ or 35\degN\ |
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simulations. Everywhere else the coordinate system is locally nearly |
which are never covered by sea-ice in our simulations. Everywhere |
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cartesian. However, for last-glacial-maximum or snowball-earth-like |
else the coordinate system is locally nearly cartesian.} However, for |
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simulations the question of metric terms needs to be reconsidered. |
last-glacial-maximum or snowball-earth-like simulations the question |
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Either, one includes these terms as in \citet{zhang03}, or one finds a |
of metric terms needs to be reconsidered. Either, one includes these |
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vector-invariant formulation fo the sea-ice internal stress term that |
terms as in \citet{zhang03}, or one finds a vector-invariant |
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does not require any metric terms, as it is done in the ocean dynamics |
formulation for the sea-ice internal stress term that does not require |
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of the MITgcm \citep{adcroft04:_cubed_sphere}. |
any metric terms, as it is done in the ocean dynamics of the MITgcm |
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\citep{adcroft04:_cubed_sphere}. |
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Lateral boundary conditions are naturally ``no-slip'' for B-grids, as |
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the tangential velocities points lie on the boundary. For C-grids, the |
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lateral boundary condition for tangential velocities is realized via |
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``ghost points'', allowing alternatively no-slip or free-slip |
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conditions. In ocean models free-slip boundary conditions in |
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conjunction with piecewise-constant (``castellated'') coastlines have |
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been shown to reduce in effect to no-slip boundary conditions |
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\citep{adcroft98:_slippery_coast}; for sea-ice models the effects of |
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lateral boundary conditions have not yet been studied. |
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Moving sea ice exerts a stress on the ocean which is the opposite of |
Moving sea ice exerts a stress on the ocean which is the opposite of |
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the stress $\vtau_{ocean}$ in Eq.\refeq{momseaice}. This stess is |
the stress $\vtau_{ocean}$ in Eq.\refeq{momseaice}. This stess is |
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temperature and salinity are different from the oceanic variables. |
temperature and salinity are different from the oceanic variables. |
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Sea ice distributions are characterized by sharp gradients and edges. |
Sea ice distributions are characterized by sharp gradients and edges. |
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For this reason, we employ a positive 3rd-order advection scheme |
For this reason, we employ positive, multidimensional 2nd and 3rd-order |
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\citep{hundsdorfer94} for the thermodynamic variables discussed in the |
advection scheme with flux limiter \citep{roe85, hundsdorfer94} for the |
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next section. |
thermodynamic variables discussed in the next section. |
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\subparagraph{boundary conditions: no-slip, free-slip, half-slip} |
\subparagraph{boundary conditions: no-slip, free-slip, half-slip} |
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addition to ice-thickness and compactness (fractional area) additional |
addition to ice-thickness and compactness (fractional area) additional |
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state variables to be advected by ice velocities, namely enthalphy of |
state variables to be advected by ice velocities, namely enthalphy of |
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the two ice layers and the thickness of the overlying snow layer. |
the two ice layers and the thickness of the overlying snow layer. |
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\ml{[Jean-Michel, your turf: ]Care must be taken in advecting these |
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quantities in order to ensure conservation of enthalphy. Currently |
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this can only be accomplished with a 2nd-order advection scheme with |
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flux limiter \citep{roe85}.} |
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\section{Funnel Experiments} |
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\label{sec:funnel} |
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For a first/detailed comparison between the different variants of the |
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MIT sea ice model an idealized geometry of a periodic channel, |
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1000\,km long and 500\,m wide on a non-rotating plane, with converging |
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walls forming a symmetric funnel and a narrow strait of 40\,km width |
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is used. The horizontal resolution is 5\,km throughout the domain |
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making the narrow strait 8 grid points wide. The ice model is |
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initialized with a complete ice cover of 50\,cm uniform thickness. The |
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ice model is driven by a constant along channel eastward ocean current |
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of 25\,cm/s that does not see the walls in the domain. All other |
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ice-ocean-atmosphere interactions are turned off, in particular there |
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is no feedback of ice dynamics on the ocean current. All thermodynamic |
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processes are turned off so that ice thickness variations are only |
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caused by convergent or divergent ice flow. Ice volume (effective |
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thickness) and concentration are advected with a third-order scheme |
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with a flux limiter \citep{hundsdorfer94} to avoid undershoots. This |
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scheme is unconditionally stable and does not require additional |
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diffusion. The time step used here is 1\,h. |
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\reffig{funnelf0} compares the dynamic fields ice concentration $c$, |
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effective thickness $h_{eff} = h\cdot{c}$, and velocities $(u,v)$ for |
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five different cases at steady state (after 10\,years of integration): |
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\begin{description} |
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\item[B-LSRns:] LSR solver with no-slip boundary conditions on a B-grid, |
|
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\item[C-LSRns:] LSR solver with no-slip boundary conditions on a C-grid, |
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\item[C-LSRfs:] LSR solver with free-slip boundary conditions on a C-grid, |
|
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\item[C-EVPns:] EVP solver with no-slip boundary conditions on a C-grid, |
|
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\item[C-EVPfs:] EVP solver with free-slip boundary conditions on a C-grid, |
|
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\end{description} |
|
|
\ml{[We have not implemented the EVP solver on a B-grid.]} |
|
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\begin{figure*}[htbp] |
|
|
%GET \includegraphics[width=\widefigwidth]{\fpath/all_086280} |
|
|
\caption{Ice concentration, effective thickness [m], and ice |
|
|
velocities [m/s] |
|
|
for 5 different numerical solutions.} |
|
|
\label{fig:funnelf0} |
|
|
\end{figure*} |
|
|
At a first glance, the solutions look similar. This is encouraging as |
|
|
the details of discretization and numerics should not affect the |
|
|
solutions to first order. In all cases the ice-ocean stress pushes the |
|
|
ice cover eastwards, where it converges in the funnel. In the narrow |
|
|
channel the ice moves quickly (nearly free drift) and leaves the |
|
|
channel as narrow band. |
|
|
|
|
|
A close look reveals interesting differences between the B- and C-grid |
|
|
results. The zonal velocity in the narrow channel is nearly the free |
|
|
drift velocity ( = ocean velocity) of 25\,cm/s for the C-grid |
|
|
solutions, regardless of the boundary conditions, while it is just |
|
|
above 20\,cm/s for the B-grid solution. The ice accelerates to |
|
|
25\,cm/s after it exits the channel. Concentrating on the solutions |
|
|
B-LSRns and C-LSRns, the ice volume (effective thickness) along the |
|
|
boundaries in the narrow channel is larger in the B-grid case although |
|
|
the ice concentration is reduces in the C-grid case. The combined |
|
|
effect leads to a larger actual ice thickness at smaller |
|
|
concentrations in the C-grid case. However, since the effective |
|
|
thickness determines the ice strength $P$ in Eq\refeq{icestrength}, |
|
|
the ice strength and thus the bulk and shear viscosities are larger in |
|
|
the B-grid case leading to more horizontal friction. This circumstance |
|
|
might explain why the no-slip boundary conditions in the B-grid case |
|
|
appear to be more effective in reducing the flow within the narrow |
|
|
channel, than in the C-grid case. Further, the viscosities are also |
|
|
sensitive to details of the velocity gradients. Via $\Delta$, these |
|
|
gradients enter the viscosities in the denominator so that large |
|
|
gradients tend to reduce the viscosities. This again favors more flow |
|
|
along the boundaries in the C-grid case: larger velocities |
|
|
(\reffig{funnelf0}) on grid points that are closer to the boundary by |
|
|
a factor $\frac{1}{2}$ than in the B-grid case because of the stagger |
|
|
nature of the C-grid lead numerically to larger tangential gradients |
|
|
across the boundary; these in turn make the viscosities smaller for |
|
|
less tangential friction and allow more tangential flow along the |
|
|
boundaries. |
|
|
|
|
|
The above argument can also be invoked to explain the small |
|
|
differences between the free-slip and no-slip solutions on the C-grid. |
|
|
Because of the non-linearities in the ice viscosities, in particular |
|
|
along the boundaries, the no-slip boundary conditions have only a small |
|
|
impact on the solution. |
|
|
|
|
|
The difference between LSR and EVP solutions is largest in the |
|
|
effective thickness and meridional velocity fields. The EVP velocity |
|
|
fields appears to be a little noisy. This noise has been address by |
|
|
\citet{hunke01}. It can be dealt with by reducing EVP's internal time |
|
|
step (increasing the number of iterations along with the computational |
|
|
cost) or by regularizing the bulk and shear viscosities. We revisit |
|
|
the latter option by reproducing some of the results of |
|
|
\citet{hunke01}, namely the experiment described in her section~4, for |
|
|
our C-grid no-slip cases: in a square domain with a few islands the |
|
|
ice model is initialized with constant ice thickness and linearly |
|
|
increasing ice concentration to the east. The model dynamics are |
|
|
forced with a constant anticyclonic ocean gyre and by variable |
|
|
atmospheric wind whose mean direction is diagnonal to the north-east |
|
|
corner of the domain; ice volume and concentration are held constant |
|
|
(no thermodynamics and no advection by ice velocity). |
|
|
\reffig{hunke01} shows the ice velocity field, its divergence, and the |
|
|
bulk viscosity $\zeta$ for the cases C-LRSns and C-EVPns, and for a |
|
|
C-EVPns case, where \citet{hunke01}'s regularization has been |
|
|
implemented; compare to Fig.\,4 in \citet{hunke01}. The regularization |
|
|
contraint limits ice strength and viscosities as a function of damping |
|
|
time scale, resolution and EVP-time step, effectively allowing the |
|
|
elastic waves to damp out more quickly \citep{hunke01}. |
|
|
\begin{figure*}[htbp] |
|
|
%GET \includegraphics[width=\widefigwidth]{\fpath/hun12days} |
|
|
\caption{Ice flow, divergence and bulk viscosities of three |
|
|
experiments with \citet{hunke01}'s test case: C-LSRns (top), |
|
|
C-EVPns (middle), and C-EVPns with damping described in |
|
|
\citet{hunke01} (bottom).} |
|
|
\label{fig:hunke01} |
|
|
\end{figure*} |
|
|
|
|
|
In the far right (``east'') side of the domain the ice concentration |
|
|
is close to one and the ice should be nearly rigid. The applied wind |
|
|
tends to push ice toward the upper right corner. Because the highly |
|
|
compact ice is confined by the boundary, it resists any further |
|
|
compression and exhibits little motion in the rigid region on the |
|
|
right hand side. The C-LSRns solution (top row) allows high |
|
|
viscosities in the rigid region suppressing nearly all flow. |
|
|
\citet{hunke01}'s regularization for the C-EVPns solution (bottom row) |
|
|
clearly suppresses the noise present in $\nabla\cdot\vek{u}$ and |
|
|
$\log_{10}\zeta$ in the |
|
|
unregularized case (middle row), at the cost of reduced viscosities. |
|
|
These reduced viscosities lead to small but finite ice velocities |
|
|
which in turn can have a strong effect on solutions in the limit of |
|
|
nearly rigid regimes (arching and blocking, not shown). |
|
| 386 |
|
|
| 387 |
\subsection{C-grid} |
\subsection{C-grid} |
| 388 |
\begin{itemize} |
\begin{itemize} |
| 429 |
\subsection{Arctic Domain with Open Boundaries} |
\subsection{Arctic Domain with Open Boundaries} |
| 430 |
\label{sec:arctic} |
\label{sec:arctic} |
| 431 |
|
|
| 432 |
The Arctic domain of integration is illustrated in Fig.~\ref{???}. It |
The Arctic domain of integration is illustrated in Fig.~\ref{fig:arctic1}. It |
| 433 |
is carved out from, and obtains open boundary conditions from, the |
is carved out from, and obtains open boundary conditions from, the |
| 434 |
global cubed-sphere configuration of the Estimating the Circulation |
global cubed-sphere configuration of the Estimating the Circulation |
| 435 |
and Climate of the Ocean, Phase II (ECCO2) project |
and Climate of the Ocean, Phase II (ECCO2) project |
| 436 |
\citet{menemenlis05}. The domain size is 420 by 384 grid boxes |
\citet{menemenlis05}. The domain size is 420 by 384 grid boxes |
| 437 |
horizontally with mean horizontal grid spacing of 18 km. |
horizontally with mean horizontal grid spacing of 18 km. |
| 438 |
|
|
| 439 |
|
\begin{figure} |
| 440 |
|
%\centerline{{\includegraphics*[width=0.44\linewidth]{\fpath/arctic1.eps}}} |
| 441 |
|
\caption{Bathymetry of Arctic Domain.\label{fig:arctic1}} |
| 442 |
|
\end{figure} |
| 443 |
|
|
| 444 |
There are 50 vertical levels ranging in thickness from 10 m near the surface |
There are 50 vertical levels ranging in thickness from 10 m near the surface |
| 445 |
to approximately 450 m at a maximum model depth of 6150 m. Bathymetry is from |
to approximately 450 m at a maximum model depth of 6150 m. Bathymetry is from |
| 446 |
the National Geophysical Data Center (NGDC) 2-minute gridded global relief |
the National Geophysical Data Center (NGDC) 2-minute gridded global relief |
| 749 |
helpful discussions. ML thanks Elizabeth Hunke for multiple explanations. |
helpful discussions. ML thanks Elizabeth Hunke for multiple explanations. |
| 750 |
|
|
| 751 |
\bibliography{bib/journal_abrvs,bib/seaice,bib/genocean,bib/maths,bib/mitgcmuv,bib/fram} |
\bibliography{bib/journal_abrvs,bib/seaice,bib/genocean,bib/maths,bib/mitgcmuv,bib/fram} |
|
%\bibliography{journal_abrvs,seaice,genocean,maths,mixing,mitgcmuv,bib/fram} |
|
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| 753 |
\end{document} |
\end{document} |
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