The zonally invariant, vertically averaged linearized RSWE in a surface layer of mean uniform thickness H forced by a constant (in time and space) zonal wind stress, τ0, are: 1∂u∂t-f(y)v=τ0ρH,2∂v∂t+f(y)u=-g∂η∂y,3∂η∂t+H∂v∂y=0, where u and v are the vertically averaged velocity components along the x (zonal) and y (meridional) coordinates, respectively, η is the deviation of the fluid height from its mean value H, ρ is the fluid density, and g is the gravitational acceleration (or the reduced gravitational acceleration when the fluid is stratified). As mentioned above, on the mid-latitude β-plane the Coriolis frequency is given by: 4f(y)=f0+βy=2Ωsin⁡ϕ0+cos⁡ϕ0Ry where R and Ω are Earth's mean radius and frequency, respectively (Sect. 12.2; Sect. 3.17 and Chap. 6; Sect. 9.4; and Sect. 2.3].

The study of wave solutions of the zonally invariant (x-independent) linearized RSWE equations (Eq. –) in a meridional domain, y∈[0,L], where L is the domain's meridional extent requires the application of boundary conditions. In both problems, the boundary conditions at the domain's boundaries are the vanishing of the normal velocities, i.e.: 5v(y=0)=0=v(y=L)

In both problems, the fluid is assumed to be initially at rest, i.e.: 6u=0=vatt=0. In the geostrophic adjustment problem, the wind stress, τ0 on the RHS of Eq. () is set to zero and the initial surface height disturbance is given by: 7η=-η0sgn(y-y′), where η0 is the initial disturbance amplitude, sgn(z) is the sign function, and y′ is the initial location of the initial discontinuity (front) in fluid height, i.e.: 8η(t=0)=+η0,for0≤y<y′,-η0,fory′<y,.

In the Ekman adjustment problem, the initial surface height disturbance is set to zero, i.e., η(t=0)=η0=0, in Eqs. () and ().

To reduce the number of free parameters in Eqs. ()–(), we introduce nondimensional variables, which are temporarily denoted with asterisks. Following the standard deformation-radius scaling e.g.,, we define t*=f0t,x*,y*=1Rd(x,y), where Rd=gH/f0 is the radius of deformation. For the dependent variables, η* and (u*, v*), distinct scalings must be chosen for the geostrophic adjustment problem (where τ0=0) and the Ekman adjustment problem (where η0=0). Our choices follow the scaling proposed by Sect. VI. Specifically, the scaling for the geostrophic adjustment problem is: η*=1η0η,u*,v*=Hη01gH(u,v), while for the Ekman adjustment problem the scaling is: η*=ρf0gHτ0η,u*,v*=ρf0Hτ0(u,v).

With these nondimensional variables, Eqs. ()–() become: 9∂u*∂t*-1+by*v*=δi0,10∂v*∂t*+1+by*u*=-∂η*∂y*,11∂η*∂t*+∂v*∂y*=0, where δi0 is the Kronecker delta. The Ekman adjustment problem is defined by i=0 so the non-dimensional wind stress δi0=1, while the geostrophic adjustment problem is defined by i≠0 so δi0=0 (since τ0=0). The differential system that describes both problems contains a single free parameter – the “non-dimensional β”: b=βRdf0=cot⁡ϕ0RdR. The boundary conditions, (Eq. ), and initial condition for η0, Eq. (), must also be scaled. Using the same nondimensional variables straightforwardly yields: vy*=0=0=vy*=L*,L*=L/Rd, for both problems, and: η*t*=0=-sgny*-y′*,y′*=y′/Rd, for the geostrophic adjustment problem only [since for the Ekman adjustment problem η*(t*=0)=0]. Naturally, the boundary conditions add a second model parameter – L*=L/Rd. The formulation above emphasizes that both the geostrophic and Ekman adjustment problems can be expressed within a single nondimensional system Eq. ()–(). While this introduces some additional algebraic complexity, it provides a clear benefit: the two classical problems can be compared within the same mathematical framework, with the distinction encoded only through the Kronecker delta δi0. This unified formulation highlights the structural similarity of the two types of adjustment and allows their respective solutions to be contrasted directly in terms of the same nondimensional parameters (b and L*). Thus, the approach reduces redundancy and clarifies which aspects of the dynamics are problem-specific and which are common to both cases.

From this point, all variables (including L and y′) in the main text are nondimensional, and the asterisks are omitted for clarity.

Following the derivation of Sect. 10.9 on the f-plane, a single equation for v is derived here on the β-plane by subtracting (1+by) times Eq. () and the y derivative of Eq. () from the time derivative of Eq. (). This straightforward calculation yields: 12∂2v∂t2-∂2v∂y2+(1+by)2v=-δi0(1+by).

In the Ekman adjustment problem (δi0=1), Eq. () can be solved by dividing v into a time-independent component, v‾, that solves the inhomogeneous part of Eq. (), i.e.: 13d2v‾dy2-(1+by)2v‾=(1+by), and a time-dependent component, v′, that solves the homogeneous part of Eq. (): 14∂2v′∂t2-∂2v′∂y2+(1+by)2v′=0.

In the geostrophic adjustment problem (δi0=0), the RHS of Eq. () vanishes identically. In addition, Eq. () with ∂∂t=0 leads to v‾=0, indicating that v consists solely of a time-dependent component, i.e., v=v′.

These considerations imply that in both problems, the time-dependent component, v′, is determined by Eq. (). As is common in linear initial-value problems, the general solution can be expressed as a superposition of the eigenfunctions of Eq. (). This guarantees that any admissible initial condition can be represented consistently within the eigenfunction basis, and it highlights the role of the eigenvalue problem in determining both the temporal evolution and the spatial structure of the solution. While this observation is standard, we include it here explicitly to clarify the connection between the initial-value formulation and the spectral solutions of Eq. ().

We now substitute v′=v^(y)e-iωt (where ω is the frequency of the wave) into Eq. () and neglect the second-order coefficient b2y2. The latter is justified since, in the β-plane approximation, f(y) is expanded to first order only in y so mathematical consistency mandates that terms of order y2 should be neglected throughout. The neglect of O(y2) terms in the wave solutions on the β-plane was previously justified by comparing the analytic expressions with numerical solutions . The above changes in Eq. () yield the Schrödinger eigenvalue equation for v^: 15d2v^dy2+(E-2by)v^=0 where 16E=ω2-1 is the eigenvalue.

Note that the only dispersion relation derived from Eq. () is that of the super-inertial Poincaré waves: 17ω2=1+E. This restriction to Poincaré waves results from the assumption ∂/∂x=0 in system (Eqs. –) that eliminates Rossby waves for zero wavenumber in the x-direction. An explicit expression for ω (the dispersion relation) follows the solution of the eigenvalue equation (Eq. ), which determines both v^ – the eigenfunction and E – the associated eigenvalue. Trapped waves are described by solutions of the complete equation, while harmonic waves are described by solutions of an approximate equation derived by setting 2by=0 in Eq. (). Although both harmonic and trapped wave solutions of Eq. () are well known, a brief derivation is included in Appendix  for completeness of the presentation. A detailed discussion on harmonic and trapped Rossby waves can be found in , , , and .

As mentioned in Sect. , in the geostrophic adjustment problem, the solution of v contains only a time-dependent component, i.e., v=v′. Accordingly, Eq. () implies that v′(t=0)=0=v(t=0). The solution for v′ that satisfies the initial condition (Eq. ) is: 18v′=∑n=0∞an*v^n*(y)sin⁡ωnt where: v^n*(y)=2Lsin⁡π(n+1)Ly,ωn2=1+π(n+1)L2 (Eqs.  and ) for harmonic waves, and: v^n*(y)=22/32b1/3Ai′ξn2-1/2Ai(2b)1/3y+ξn,ωn2=1-ξn(2b)2/3 (Eqs.  and ) for trapped waves. In this equation Ai is the Airy function that decays to 0 at +∞ and ξn is the nth zero of this function (which is oscillatory for negative argument). To calculate the coefficients an*, an initial condition for ∂v′∂t must be derived. Substituting the initial conditions u=0 (Eq. ) and η=-sgn(y-y′) (Eq. ) into Eq. () gives: 19∂v′(t=0)∂t=2δ(y-y′), where δ(z) denotes the Dirac delta function [not to be confused with the Kronecker delta δi0 on the RHS of Eq. ()]. The substitution of Eq. () in Eq. () yields: 20∑n=0∞ωnan*v^n*(y)=2δ(y-y′), where, according to Sturm–Liouville theory, an* is given by: 21an*=2ωn∫0Lv^n*(y)⋅δ(y-y′)dy. Substituting the definitions of v^n*(y), Eqs. () and (), in Eq. () and solving the integral yields: 22an*=2ωn2Lsin⁡π(n+1)Ly′, for harmonic waves and: 23an*=2ωn22/32b1/3Ai′ξn2-1/2Ai(2b)1/3y′+ξn for trapped waves.

It should be noted that although v in the geostrophic adjustment problem consists only of a time-dependent component, η and u contain both time-independent and time-dependent components. The time-independent and time-dependent components of η and u are derived in Sect. .

In the Ekman adjustment problem the decomposition in Sect.  of v=v‾+v′ implies that v‾≠0 so the initial condition (Eq. ) yields: 24v′(t=0)=-v‾. Following the approach outlined in Sect. , the solution for v′ that satisfies condition (Eq. ) can be expressed as: 25v′=∑n=0∞an*v^n*(y)cos⁡ωnt where v^n*(y) is given by Eqs. () and () and ωn is given by Eqs. () and (). The application of condition (Eq. ) then implies that an* is given by: 26an*=-∫0Lv^n*(y)⋅v‾dy. As mentioned in Sect. , v‾ is determined by the solution of Eq. () subject to the boundary conditions (Eq. ). In contrast to the integral in Eq. (), the integral in Eq. () cannot be solved analytically since no analytical solution for v‾ has been found. However, v‾ can be found numerically by employing a boundary value problem (BVP) numerical solver to solve Eq. (). Subsequently, the integral in Eq. () can be calculated numerically to find an*.

The solutions for η and u in the Ekman adjustment problem are provided in Sect. .

The results in this section are presented in four figures, structured as follows. For each problem (the geostrophic adjustment and the Ekman adjustment) we display the solution of v′(y,t)=v(y,t)-v‾(y) for narrow (L=4) and wide (L=60) channels derived by subtracting the time-independent analytic solutions from the simulations. Each figure compares the simulated v′(y,t) (depicted by black lines) with the analytical solutions of v′ derived for harmonic (red lines) and trapped (blue lines) waves. The figures show snapshots of v′ at intervals of 6 time units. Although each of the 4 cases (2 problems and 2 channel widths) exhibits different leading frequencies, we chose to maintain intervals of 6 time units in all 4 figures so the results are presented in a uniform style of display.

Before presenting the results, it is worth noting that in fixed time snapshots, the differences between simulations and analytical solutions, as well as the differences between the two analytical solutions, can result from two reasons: The first is the disparities between the spatial structures (i.e. the eigenfunctions) of the harmonic, trapped, and simulated waves and the second is differences between the frequencies (i.e. the eigenvalues) of the harmonic, trapped, and simulated waves (since the difference might be smaller/larger at an earlier/later time). Both contributing factors should be considered in explanations of the differences between different cases.

Figure  shows v′ in the geostrophic adjustment problem for L=4. Note that the time in this figure, as well as in all other figures, is the nondimensional time that equals the dimensional time multiplied by f0. The agreement between the harmonic wave solutions (red lines) and the numerical results (black lines) is acceptable up to t⪅40 while the trapped wave solutions (blue lines) are entirely irrelevant to the numerical results. Beyond t=40 the simulated waves deviate appreciably from the anticipated structure of harmonic waves. The discrepancy between the two is particularly noticeable in the center of the channel at t=42 and t=54. We hypothesize that this appreciable difference between the harmonic wave structures and the numerically simulated waves is due to a slight difference between the harmonic and numerical frequencies rather than differences in the harmonic and numerical meridional wave structures. In addition to the discrepancy between the harmonic and the numerical frequencies, we also observe a difference in the amplitudes of harmonic and simulated waves at the wave-fronts. The wave-fronts of harmonic waves are larger and sharper compared to those obtained from the simulations, which is particularly noticeable near the domain boundaries at t=18, 30, 42, and 54, and at the center of the domain at t=48. This difference between the theory and the simulations is likely due to the dissipation applied in the MITgcm that reduces the energy contained in the short wave limit. At lower resolutions of both y and t the gap between the theory and simulation at y=2 evident at t=48 occurs earlier and the gap at t=48 is larger by a factor of about 2.

Figure  shows v′ in the geostrophic adjustment problem for L=60. The harmonic wave solutions (red lines) differ substantially from the numerical results (black lines), except near the wave-fronts. In contrast, there is a very good agreement between the trapped wave theory (blue lines) and the numerical results up to t=30. This agreement reaffirms the neglect of the y2 terms in the derivation of the eigenvalue equation Eq. (). At t=30, the wave-fronts reach the domain boundaries and are reflected towards the center of the domain. This reflection is observed in the numerical results and the harmonic wave solutions. However, in the trapped wave solutions, the waves are reflected only from the southern wall (at y=0). Consequently, a discrepancy between the trapped wave structure and that of the numerical results develops near the northern wall and propagates southward at the speed of the wave-fronts that equals 1 in non-dimensional units (i.e. gH in dimensional units, since Rdf0=gH). This is evident, for example, at t=48, at which time the northern wave-front, that had reached the northern wall at t=30, is located at y=42=60-18. Thus, the trapped wave theory yields incorrect results between y=42 and y=60. Regardless of the reflection, a small, yet, noticeable difference can be observed between the trapped wave theory and the numerical results, particularly for t≥24 and near the center of the domain. We hypothesize that this difference arises from a slight difference between the trapped frequencies and the numerical frequencies.

Figure  shows v′ in the Ekman adjustment problem for L=4. As in the geostrophic adjustment problem (Fig. ), the agreement between the harmonic waves (red lines) and the simulations (black lines) is good, though, as in Fig. , a discrepancy is evident between the harmonic and numerical frequencies. In this case, the discrepancy is particularly noticeable at t=36 and t=48. As expected, the trapped wave structure (blue lines) is irrelevant to the simulations at L=4.

Figure  shows v′ in the Ekman adjustment problem for L=60. As in the geostrophic adjustment problem (Fig. ), the harmonic wave solutions (red lines) differ substantially from the numerical results (black lines). For t≤18, the discrepancy between the harmonic wave theory and the numerical results is more significant in the northern side of the domain than in its southern side. This may be related to the fact that the term -2by, which is ignored in the harmonic wave theory, increases linearly with y. The trapped wave theory (blue lines) matches the numerical results only for small t. As in the geostrophic adjustment problem, the mismatch between the theory and the simulations develops at the northern wall and spreads southwards. However, in the Ekman adjustment problem, this southward spread begins at t=0. Consequently, in the Ekman adjustment problem, the trapped wave theory provides reasonable results for shorter times compared to the geostrophic adjustment problem. For example, in the Ekman adjustment problem the trapped wave theory yields reasonable results at t=48 only for y<20 while in the geostrophic adjustment problem, it yields reasonable results for y<30.

The visual comparisons in Figs. – are useful but inherently qualitative. To complement them with a more systematic and reproducible metric, we introduce a quantitative diagnostic error measure, ϵ(t), defined as the spatially averaged absolute difference between the theoretical and numerical v′(y,t) fields: 27ϵ(t)=1600∑m=0600|vtheory′t,y=mL600-vnumerical′t,y=mL600|. Here vtheory′ is evaluated either from the harmonic or the trapped wave solutions, and vnumerical′ from the MITgcm simulations. The purpose of ϵ(t) is not to introduce a new physical quantity, but to provide a simple and compact diagnostic that quantifies the agreement across different theories, problems, and channel widths.

Figure  shows the time dependence of ϵ(t). In all cases, ϵ(t) exhibits relatively fast oscillations. These arise because even a small frequency mismatch between theoretical and numerical solutions can lead to alternating phases of agreement and disagreement. To highlight the longer-term behavior, we applied a third-order low-pass Butterworth filter with a cutoff frequency of 0.05 (corresponding to 5×10-6 s⁻¹ in dimensional units). The filtered quantity, ϵLP(t), is shown as solid curves in Fig. . This filtering suppresses high-frequency variations while retaining the overall growth or decay trends.

For L=4, the harmonic wave solutions are closer to the numerical solutions than the trapped wave solutions. In both the geostrophic adjustment problem (upper-left panel) and the Ekman adjustment problem (upper-right panel), ϵLP(t) shows similar magnitudes and trends. In the harmonic wave theory (red lines), ϵLP(t) increases linearly with time, while in the trapped wave theory (blue lines), it exhibits low-frequency oscillations that pass the low-pass filter.

For L=60, the trapped wave solutions are closer to the numerical solutions compared to the harmonic wave solutions. In both the geostrophic adjustment (lower-left panel) and the Ekman adjustment (lower-right panel) problems, ϵLP(t) shows similar trends. In the trapped wave theory (blue lines), ϵLP(t) increases linearly with time, while in the harmonic wave theory (red lines), it exhibits low-frequency oscillations. However, ϵLP(t) is approximately five times larger in the Ekman adjustment problem compared to the geostrophic adjustment problem in both harmonic- and trapped-wave theories.

In the last analysis of error employed here, ϵ(t) is computed for values of L that vary between L=4 to L=60 with intervals of 4 in the two problems and the two wave theories. The resulting low-pass filtered ϵ, ϵLP, are shown in Fig.  as a function of t and L. Clearly, the changes in ϵLP with t and L do not follow a uniform pattern. It is worth noting that the maximal error occurs in the harmonic wave solution for the Ekman adjustment problem (upper right panel). The variation of ϵLP in the trapped wave solution of the geostrophic adjustment problem (lower left panel) is monotonic in both t and L. In the Ekman adjustment problem the best agreement between the simulations and the trapped wave theory occurs near L=30. These results are further discussed in Sect. . We emphasize that ϵ(t) and its filtered counterpart are employed here strictly as diagnostic tools. Their purpose is to provide an objective and reproducible way of summarizing the complex spatio-temporal differences between theories and simulations, rather than to serve as physical novel quantities. Nevertheless, the systematic trends they reveal, such as the crossover between harmonic and trapped dominance with increasing L and the gradual increase in mismatch with time, help clarify the regimes of validity of each theory and the mechanisms by which they depart from the numerical solutions.