2.1 Semi-analytic model

We derive a semi-analytic model for the flow rate through a sash window, given a particular window geometry ($\alpha$ and $\beta$) and temperature difference. The flow velocity is given by (2.2), and the ventilation rate is equal to the flow velocity integrated over the area above or below the neutral pressure height

(2.3)\begin{equation} Q = \int_{\hat{z}_n}^1 H W C_d v(\hat{z}) \,\mathop{}\!\mathrm{d} \hat{z} = \int_{0}^{\hat{z}_n} H W C_d v(\hat{z}) \,\mathop{}\!\mathrm{d} \hat{z}, \end{equation}

with $C_d$ the discharge coefficient accounting for streamline contraction and friction at the opening. We will discuss the value of $C_d$ in § 3. By equating the two expressions in (2.3), we can calculate $\hat {z}_n$ and therefore $Q$.

For bidirectional flow at the lower window ($0 < \hat {z}_n < \beta$), integrating only over the open areas of the window

(2.4)\begin{align} Q & = \sqrt{2g'H}C_d \int_{\hat{z}_n}^\beta W H ( \hat{z} - \hat{z}_n )^{1/2} \,\mathop{}\!\mathrm{d} \hat{z} + \sqrt{2g'H}C_d \int_{\beta + \alpha}^1 W H ( \hat{z} - \hat{z}_n )^{1/2} \,\mathop{}\!\mathrm{d} \hat{z}\nonumber\\ & = \sqrt{2g'H}C_d \int_{0}^{\hat{z}_n} W H ( \hat{z}_n - \hat{z} )^{1/2} \,\mathop{}\!\mathrm{d} \hat{z}. \end{align}

Here, the outflow through the upper part of the window is split between the upper window and the upper part of the lower window. For unidirectional flow at both windows ($\beta \leq \hat {z}_n \leq \beta + \alpha$), the ventilation rate is given by

(2.5)\begin{equation} Q = \sqrt{2g'H}C_d\int_{\beta + \alpha}^1 W H ( \hat{z} - \hat{z}_n )^{1/2} \,\mathop{}\!\mathrm{d} \hat{z} = \sqrt{2g'H}C_d\int_{0}^{\beta} W H ( \hat{z}_n - \hat{z} )^{1/2} \,\mathop{}\!\mathrm{d} \hat{z}. \end{equation}

When there is bidirectional flow at the upper window ($\beta + \alpha < \hat {z}_n < 1$), the ventilation is given by

(2.6)\begin{align} Q& = \sqrt{2g'H}C_d\int_{0}^{\beta} W H ( \hat{z}_n - \hat{z} )^{1/2} \,\mathop{}\!\mathrm{d} \hat{z} + \sqrt{2g'H}C_d\int_{\beta + \alpha}^{\hat{z}_n} W H (\hat{z}_n - \hat{z})^{1/2} \,\mathop{}\!\mathrm{d} \hat{z}\nonumber\\ & = \sqrt{2g'H}C_d\int_{\hat{z}_n}^1 W H ( \hat{z} - \hat{z}_n )^{1/2} \,\mathop{}\!\mathrm{d} \hat{z}. \end{align}

The height of the lower window at which the transition occurs from a uni- to a bidirectional flow at the upper window is denoted by $\beta _{crit}$. To determine, for a given geometry $(\alpha, \beta )$, which flow regime occurs we solve (2.6) numerically for $\hat {z}_n = \alpha + \beta _{crit}$. After simplification this amounts to solving

(2.7)\begin{equation} (1-\alpha-\beta_{crit})^{3/2} + \alpha^{3/2} - (\alpha + \beta_{crit} )^{3/2} = 0, \end{equation}

for $\beta _{crit}$. For a given geometry $(\alpha, \beta )$, comparing $\beta$ with the obtained value for $\beta _{crit}$ will determine which of (2.4), (2.5) or (2.6) to consider. After determining the flow regime, the associated volume conservation equation can be solved for $\hat {z}_n$ and $Q$.

Figure 4 depicts the variation of the normalised flow rate $Q/Q_0$ versus the height of the lower opening normalised by the open area, $\beta /(1-\alpha )$, for different $\alpha$. For a given height $\alpha$ of the closed panel, $1-\alpha$ corresponds to the maximum value for $\beta$. The ventilation rate $Q$ is normalised by $Q_0$, the flow rate through an open rectangular window of dimension $W \times H$. In this case, due to conservation of mass, the neutral pressure level is at the mid-height of the window, $\hat {z}_n = 1/2$. Similarly to Reference Brown and SolvasonBrown and Solvason (Reference Brown and Solvason1962), we obtain the ventilation rate $Q_0 = \frac {1}{3}WHC_d\sqrt {g'H}$ by integrating (2.3) over half the window. For a given $\alpha$, small values of $\beta$ (dashed lines) lead to a bidirectional flow at the upper window. Enlarging the height of the lower window will result in a unidirectional flow through both openings (solid lines). Increasing $\beta$ further will cause the transition from uni- to bidirectional flow at the lower window (dotted lines). Due to the symmetry of the sash window, the variation of the flow rate with $\beta /(1-\alpha )$ is symmetric. Moreover, when $\alpha$ increases, the flow rate through the sash window decreases and the range of $\beta /(1-\alpha )$ corresponding to the unidirectional flow regime increases.

Figure 4. The variation of the ventilation rate predicted by the semi-analytic model with the height of the lower opening normalised by the open area, $\beta /(1-\alpha )$: bidirectional flow regime at the upper window (thick dashed line), unidirectional flow regime (thick solid line), bidirectional flow regime at the lower window (thick dotted line). The flow rates predicted by the analytic model for the transition from one flow regime to another are plotted ($\diamondsuit$).

In many circumstances a user may wish to maximise the flow rate. From figure 4 we can see that the flow is maximised when the height of the upper and lower windows are the same, i.e. $\beta = {(1-\alpha )}/{2}$, with the neutral level located at the middle of the sash window, i.e. $\hat {z}_n = \beta +{\alpha }/{2}$. The maximum flow rate $Q_{max}$ can be expressed as a function of the geometry of the sash window using (2.5),

(2.8)\begin{equation} Q_{max}(\alpha) = Q_0 \times (1 - \alpha^{3/2}), \end{equation}

i.e. a sash window will have a maximum ventilation rate reduced by a factor of $1 - \alpha ^{3/2}$ compared with a rectangular window of the same height and width. Looking at the pressure profiles in figure 2 the ventilation rate is thus maximised when the effective pressure difference is maximised by maximising the distance between the openings and the neutral level. For $\alpha = 0.5$, the flow rate through a sash window is 65 % of the flow rate if half the window were not filled with a sash.

The minimum flow rate, $Q_{min}$, is obtained when one of the openings is closed (figure 4). When the upper opening is closed, (2.4) gives

(2.9)\begin{equation} Q_{min}(\alpha) = Q_0 \times (1 - \alpha)^{3/2}. \end{equation}

Figure 5 depicts the variation with $\alpha$ of the ratio of maximum to minimum flow rate obtained from (2.8) and (2.9). The ratio increases with $\alpha$, i.e. the difference between the maximum and minimum flow rate for a sash window increases with the size of the closed panel. For $\alpha = 0.5$ the maximum ventilation rate is less than twice the minimum one, while for $\alpha = 0.8$ the maximum flow rate is around three times larger than the minimum flow rate.

Figure 5. Variation with $\alpha$ of the ratio of maximum to minimum ventilation rate for a sash window with constant temperature difference ($Q_{max} / Q_{min}$) and the ratio of the temperature difference for a fully open window and sash window with a constant heat source $(\widetilde {\Delta T} / \Delta T )|_{max}$.

2.2 Constant internal heat source: summertime ventilation

During summertime a primary reason for ventilation is to provide cooling. Internal heat is produced by solar gains, occupants and appliances. While the strength of these heat sources can vary with time, for the sake of simplicity we consider the case of a room containing a heat source of constant strength $W_h$ at floor level. Similarly to Reference Fitzgerald and WoodsFitzgerald and Woods (Reference Fitzgerald and Woods2007) and Reference Livermore and WoodsLivermore and Woods (Reference Livermore and Woods2007), assuming that the radiant heat losses are minimised and the room is well insulated, the heat supplied at the floor matches that lost through ventilation,

(2.10)\begin{equation} W_h = \Delta T c_p \rho Q = \widetilde{\Delta T} c_p \rho \tilde{Q}, \end{equation}

where $c_p$ is the specific heat capacity of air and $\tilde {Q}$ and $\widetilde {\Delta T}$ are the ventilation rate and outdoor–indoor temperature difference for the equivalent fully open window of area $W \times H(1-\alpha )$. The ventilation rate through this opening is $\tilde {Q}^{3/2} = Q_{min} Q^{1/2}$, where (2.10) has been used to substitute for $\widetilde {\Delta T}$. With some rearranging we find the ratio $Q/\tilde {Q} = (Q/Q_{min})^{2/3}$. This is equivalent to $\widetilde {\Delta T}/\Delta T = (Q/Q_{min})^{2/3}$. We can interpret this as the cooling potential of a sash window (which maintains the room at $\Delta T$ higher than the outdoor temperature) compared with the cooling potential of a single opening of the same open area (which has a temperature difference of $\widetilde {\Delta T}$ with outdoors, $\widetilde {\Delta T} > \Delta T$). The maximum value of this temperature ratio is

(2.11)\begin{equation} \left.\frac{\widetilde{\Delta T}}{\Delta T}\right|_{max} = \frac{(1-\alpha^{3/2})^{2/3}}{(1-\alpha)}. \end{equation}

This function is plotted against $\alpha$ in figure 5 and indicates the factor by which the temperature difference with outside can be reduced if the room is ventilated using a sash window with two openings rather than a single opening of the same total opening height. For $\alpha = 0.5$, the indoor–outdoor temperature difference for a fully open window is approximately $50\,\%$ larger than that maintained by a sash window with upper and lower openings of the same height, while for $\alpha = 0.9$ the temperature difference more than doubles.

2.3 Analytic model

As an alternative to the model presented in § 2.1, we derive a model to predict the flow rate through a sash window analytically. This analytic model takes for input $\alpha$, the height of the closed panel, and $\hat {z}_n$, the position of the neutral layer as a function of the sash window geometry. The flow regime is directly given by the expression of $\hat {z}_n$ and thus the volume conservation equation is not solved numerically and the height of the openings of the sash windows are functions of the initial parameters. This analysis also reveals an analytic alternative to (2.7) for calculating $\beta _{crit}$.

For the bidirectional flow regime at the upper open panel when the neutral level is located at the upper opening, (2.6) simplifies to

(2.12)\begin{equation} \hat{z}_n^{3/2} - (\hat{z}_n - \beta)^{3/2} + (\hat{z}_n - \alpha -\beta)^{3/2} - (1 -\hat{z}_n)^{3/2} = 0. \end{equation}

Writing $\hat {z}_n = \alpha +\beta + \delta$, where $\delta \in [0,\frac {1}{2}(1-\alpha -\beta )]$ denotes the distance between the bottom of the upper window and the position of the neutral level, we have

(2.13)\begin{equation} (\alpha + \beta + \delta)^{3/2} - (\alpha + \delta)^{3/2} - (1 - \beta - \alpha - \delta)^{3/2} + \delta^{3/2} = 0. \end{equation}

Assuming that $\beta + \delta \ll 1 - \alpha$ and $\beta + \delta \ll \alpha$, the Taylor expansion of (2.13) results in the following expression for $\beta$:

(2.14)\begin{equation} \beta \approx \frac{2}{3} \times \frac{(1 - \alpha)^{3/2} + (\alpha + \delta)^{3/2} - \alpha^{3/2} - \delta^{3/2}}{\alpha^{1/2} + (1-\alpha)^{1/2}} - \delta. \end{equation}

Thus, by assuming a relative position for the neutral level, the height of the upper and lower openings are expressed as functions of $\alpha$ and $\delta$. For $\delta = 0$, the flow transitions from uni- to bidirectional at the upper window. The associated height for the lower opening $\beta _{crit}^*$ is

(2.15)\begin{equation} \beta_{crit}^ * \approx \frac{2}{3} \times \frac{(1 - \alpha)^{3/2}}{\alpha^{1/2} + (1-\alpha)^{1/2}}. \end{equation}

Due to the symmetry of the problem, a similar approach can be conducted for the bidirectional flow regime at the lower window. The role played by the heights of the two openings for this regime will be inverted compared with the bidirectional flow regime at the upper window, with the critical $\beta$ equal to $1-\alpha -\beta _{crit}^*$.

In figure 4 the critical height and flow rate predicted by the analytic model for the transition from one regime to another is plotted (diamonds). At the transition from one regime to another, the two models show a good agreement for the critical height and the flow rate. Indeed the relative difference for the flow rate is less than $2.5\,\%$.

The evolution, with $\alpha$, of $\beta / (1-\beta -\alpha )$ at the transition from uni- to bidirectional flow at the upper window is depicted in figure 6 and used to compare the two models. Using the analytical values $\beta _{crit}^*$ as well as those predicted by the semi-analytic model, $\beta _{crit}$, the ratio corresponds to the ratio of the height of the lower opening to the upper one. For the semi-analytic model the transition from one flow regime to another is obtained by solving (2.7) numerically. The difference between the two models is less than $1.2\,\%$, supporting the assumptions made in the analytic model for the Taylor expansion.

Figure 6. Ratio of upper and lower opening heights $\beta _{crit} / (1-\alpha -\beta _{crit})$ with $\alpha$ for the transition from the uni- to the bidirectional flow regime at the upper window. The values, $\beta _{crit}$ (solid line), obtained from the semi-analytic model are compared with the analytical ones, $\beta _{crit}^*$ (dashed line).

Furthermore, it is interesting to observe that the transition from uni- to bidirectional flow occurs at a smaller ratio of lower and upper openings as the total opening area decreases. For $\alpha =0.5$, the transition from a unidirectional to a bidirectional flow regime at the upper window regime occurs when the lower window area is half of the upper window. For $\alpha = 0.85$, transition occurs at a ratio of $0.25$.

3.1 Determination of $\Delta t$

The runtime $\Delta t$ of each experiment was between $15$ and $30$ s depending on the geometry considered for the sash window. For each experiment, $\Delta t$ was chosen to limit the error in the measured flow rate. During the experiment the dense water flows through the sash window and creates a dense layer at the bottom of the compartment with the initially light fluid. Similarly, the light fluid flows through the sash window and accumulates at the top of the compartment with the initially dense liquid. Since the sash window is nearer the bottom of the tank than the free surface, the bottom dense fluid layer is the first to interact with the sash window. The maximum runtime $\Delta t$ was determined for each sash window geometry to limit the interaction of this dense layer with the flow through the sash window, i.e. to limit the change of the effective density difference across the lower opening during the experiments. To determine the density profile next to the window, an initial set of experiments was run for each case, varying the runtime. For each of these experiments, the density profile alongside the window was measured $2$ minutes after the barrier was closed, when the flow had stabilised. A longer $\Delta t$ is desired as it reduces the error in the measured flow rate. Therefore the runtime was maximised while keeping the change in density difference at the base of the window less than $10\,\%$.

3.2 Experimental flow rate

To measure the flow rate, $Q_{exp}$ through the sash window using the initial ($\rho _{i,0}$ and $\rho _{e,0}$) and the final ($\rho _{i,1}$ and $\rho _{e,1}$) densities in each compartment we assumed that the flow rates were constant and equal during the runtime $\Delta t$. In this case,

(3.1)\begin{equation} Q_{exp} = \frac{1}{2} \left( \frac{V_{i}}{\Delta t}\times \frac{\rho_{i,1} - \rho_{i,0}}{\rho_{e,0} - \rho_{i,0}} + \frac{V_{e}}{\Delta t}\times\frac{\rho_{e,1} - \rho_{e,0}}{\rho_{i,0} - \rho_{e,0}} \right), \end{equation}

where $V_i$ and $V_e$ are the volume in each compartment at the beginning of the experiment. For each sash window geometry considered, at least four experiments were conducted and we calculated the mean flow rate $\bar {Q}$. The error in the flow rate shown as error bars in the figures 10(a) and 10(b) calculated for each geometry takes into account the measurement errors related to the runtime, the densities and the volume of liquid in each compartment.