Observed motions

Two sources of observed motions are used in this research. Ice motions are derived from daily composite SSM/I 85 GHz imagery obtained from the U.S. National Snow and Ice Data Center (NSIDG) using a cross-correlation method (Reference Emery, Fowler, Hawkins and PrellerEmery and others, 1991). This method tracks a feature on a consistent grid over two succeeding images. The image resolution is 12.5 km, which limits the ability to detect small motions on daily time-scales and results in a relatively "noisy" motion field. Oversamphng and filtering methods were employed to improve the effective resolution. The final SSM/I motions are produced on a 60 km resolution grid. When compared to buoy observations, the daily rms motion error for the Arctic is on average 5−6 cm s⁻¹, with a bias of <0.5 cms⁻¹ (Reference Meier, Maslanik and FowlerMeier and others, 2000). (Similar comparisons for the Southern Ocean (Reference Heil, Fowler, Maslanik, Emery and AllisonHeil and others, 2001) indicate larger biases in the Antarctic.)

Buoy motions are computed from daily buoy-location data obtained from the International Arctic Buoy Program (IABP). The rms motion error is dependent on the location error (±350 m) and is approximately 0.5 cm s–1 for daily motions (Reference Colony and RigorColony and Rigor, 1993).

Model motions

The model used in this research is a two-category sea-ice model with three ice classes based on age, an approximation of multiple thickness levels used in energy-budget calculations (Reference Walsh and ZwallyWalsh and Zwally, 1990), a detailed surface albedo treatment (Reference Ebert and CurryEbert and Curry, 1993) and a viscous-plastic ice rheology. The model is forced with daily fields of pressure, temperature, downwelling longwave and shortwave radiation, and geostrophic winds from the U.S. National Centers for Environmental Prediction (NCEP) re-analysis fields (Reference KalnayKalnay and others, 1996). The model is centered at the North Pole and has 80 km gridcells (Reference Maslanik and DunnMaslanik and Dunn, 1997). Ice motions are calculated at 8h time-steps and output daily.

Assimilation method

An optimal-interpolation assimilation method is employed to combine the observed and modeled ice motions using a weighted linear combination described by Equation (1):

(1)

Here, u is the assimilated parameter (in this case the u component of velocity), k is the model gridpoint, and j is one of n observations in the neighborhood of the κth model gridpoint. The weights, a_kj, are calculated from model and observation error covariances to minimize the estimate error. The Kalman filter method used in previous sea-ice assimilation studies (Reference Thomas and RothrockThomas and Rothrock, 1993) is a generalized optimal-interpolation method where the error covariances are allowed to evolve with the model state. The simplification of using constant error covariances limits the effectiveness of the assimilation, but reduces the computational burden considerably and makes the use of detailed ice models practical.

The method described here is implemented with seasonally and regionally prescribed error covariances to improve the assimilation’s effectiveness. It could have been implemented using daily error covariances for these synoptic, hindcast case-studies. However, the scheme was designed to be flexible for applications to longer time series and possible forecast studies (where the daily error covariances would not be known). Therefore, the methodology was not changed from its original form. Buoy observations are assimilated with their own, seasonally and regionally invariant, error covariances that reflect the more accurate error characteristics of the buoys. For more details on the assimilation methodology, see Reference Meier, Maslanik and FowlerMeier and others (2000).

Beaufort Sea, November 1992

A previous research study on applications of combining multiple forms of data for study of the Arctic considered variability in sea-ice concentration as a function of ice transport in the Beaufort Sea in November 1992 using SSM/I and AVHRR imagery (W.N. Meier and others, 1997, http://earthinteractions.org). On 19 November, AVHRR-denved ice motions combined with SSM/I-derived ice concentrations show a strong convergence event along the Canadian coast due to northerly winds arising from low pressure in the eastern Beaufort Sea (Fig. 1). Sea ice is advected toward the coast on the 19th, causing an increase in ice concentration. By the 20th, the coastal zone appears to be filled with ice, such that the southward drift into the Mackenzie River delta is deflected eastward and westward.

Fig. 1. AVHRR-derived ice motion and percentage change in ssm/iice concentration from previous day for (a) 19 november 1992, and (b) 20 november 1992 the dotted line denotes a line of convergence where ice motion suddenly decreases. adapted from w.n. meier and others (1997, http://earthinteractions.org).

Here, we revisit that study using the assimilation methodology, comparing ice motions from the stand-alone model simulation with motions from the assimilation mode of the model. On 19 November, the stand-alone model shows some convergent motion along the Canadian coast (Fig. 2). However, there is a clear eastward component of the flow. This is because the NCEP pressure field indicates that the low pressure is substantially north of the coast. By 20 November, the model shows the convergent flow being retarded and more of the flow being deflected to the east and west. The assimilation case shows more southerly, convergent motion on the 19th than the standard model, with motion due south towards the coast and little eastward or western deflection of ice (Fig. 3). The assimilated motions indicate that the center of the pressure system is on the eastern Alaskan coast. By the 20th, the assimilated motions show the flow being deflected eastward. Thus, the assimilated motions yield better agreement with the higher-resolution AVHRR motions and the changes in the SSM/ I ice concentrations. This is mostly due to the correction of errors in the NCEP atmospheric forcings by the assimilated motions, although errors in ocean currents and the model ice dynamics are also likely to be affected. The qualitative improvement shown by the assimilated motions (from SSM/I, buoys and model) here in comparison with the AVHRR motions recapitulates previous statistical analyses between SSM/I-model assimilated motions with buoy-observed motions (Reference Meier, Maslanik and FowlerMeier and others, 2000).

Fig. 2. Model ice motion in the beaufort sea on (a) 19 november 1992 and (b) 20 november 1992

Fig. 3. Assimilated ice motion in the beaufort sea on (a) 19 november 1992 and (b) 20 november 1992

Another interesting aspect of the flow occurs just north of the Bering Strait. While the model shows westward motion in the region on the 19th, the assimilation case indicates a strong northward flow. This is the result of the apparent misplacement of high pressure in the western Beaufort by the NCEP forcings. By the 20th, both the assimilation and the model indicate southwestward flow near the Bering Strait.

Because the model is driven by NCEP pressure fields, the model’s simulated ice advection does not produce as much convergence on 19 November as the assimilation case (Fig. 4). Since such convergence of the ice pack is a threat to navigation, coastal operations and military submarine activities, accurate simulation of such events is of particular interest.

Fig. 4. Ice convergence in the beaufort sea on 19 november 1992for (a) model and (b) assimilation. contour levels have units of 106 s–1.

Barents Sea/Fram Strait, March 1993

Ice export through Fram Strait is an important component of the Arctic sea-ice mass balance since most ice advection out of the Arctic occurs through Fram Strait. Ice that forms in the marginal ice zones in the coastal seas tends to be circulated into the central Arctic, growing and aging as it moves (Reference Colony and ThorndikeColony and Thorndike, 1984). Eventually, ice that does not melt during the Arctic summers is advected out of the Arctic, primarily through Fram Strait. After passing through Fram Strait, the ice enters the Greenland, Iceland and Norwegian (GIN) Seas where it meets warmer water from the North Atlantic and melts.

The Barents Sea is one such coastal region where a great deal of ice production occurs. Ice produced in the Barents may be advected northward into the central Arctic or westward into the GIN seas, depending on conditions. It is an important region in setting up the Arctic halocline, a layer of cold, saline stratified water that insulates the mixed layer and the overlying sea ice from the warm, saline Atlantic water mass (Reference Aagaard, Coachman and CarmackAagaard and others, 1981). Changes in this region have been observed in the 1990s that suggest that the character of the formation and evolution of the halocline may be changing (Reference Steele and BoydSteele and Boyd, 1998). This could result in or be the result of changes in sea-ice cover, heat fluxes in the Arctic, and ocean circulation. In addition, the region encompasses important shipping routes and fishing sites. Knowledge of the drift of ice and the character of the ice (thin first-year vs thick multi-year) is important for route planning.

Here, we investigate ice motion in this region on 18 March 1993. A large discrepancy exists between the model and observed pattern of ice motion. SSM/I indicates typical ice motion in the region, with export of ice from the northern coast of Greenland through Fram Strait (Fig. 5a). This would primarily be thick, multi-year ice with low salinity. Thinner ice formed in the Barents Sea is shown to advect northward into the pack-ice region.

Fig. 5. Ice motion in the fram strait/barents sea region on 18 march 1993for (a) ssm/i, (b) model and (c) assimilation.

On the other hand, the model shows little export through Fram Strait (Fig. 5b). Flow is primarily westward from the Barents Sea and from the west coast of Svalbard. Thus, compared to the observed motions, much thinner and more saline ice is being advected into the GIN seas.

Through optimal-interpolation assimilation, the buoy and SSM/I observations constrain the model closer to observations (Fig. 5c). The assimilation case shows substantial outflow of ice from North Greenland through Fram Strait. The westward motion out of the Barents Sea is diminished, and northward motion is apparent, in agreement with the observations.

Because of increased outflow from the central Arctic, assimilation yields greater ice export through Fram Strait. The model yields an export of 0.10 Sv on 18 March, while assimilation yields over twice as much export, 0.21 Sv.

Though this is only a 1 day case-study, it illuminates the ability of assimilation to use improved ice-motion fields to study synoptic-scale motion patterns. These synoptic events could have seasonal consequences for the character of the ice cover in the region. A previous study indicates that the model consistently underestimates ice export through Fram Strait compared to the assimilated case over the course of several years (Reference Meier, Maslanik and FowlerMeier and others, 2000). Models are commonly used to study ice export through Fram Strait (e.g. Reference Harder, Lemke and HilmerHarder and others, 1998) and halocline and deep-water formation (e.g. Reference Goosse and FichefetGoosse and Fichefet, 1999). Assimilation indicates that use of observations may help to remove model biases and errors in forcings, constraining them closer to physical reality and yielding better insights into important ice-formation and melt processes in the region.