The model

We used an implicit finite difference model that calculates changes in temperature in the crust due to conduction. The model solves the heat equation:

(1)$${{\partial T} \over {\partial t}} = {\partial \over {\partial z}}\left( {\kappa {{\partial T} \over {\partial z}}} \right) + {A \over {\rho C}}$$

where T is temperature (°C), t is time (s), κ is thermal diffusivity (m² s^–1), A is heat production (W m^–3), ρ is density (kg m^–3) and C is specific heat (J °C^–1 kg^–1).

Here the thermal properties are regarded as bulk properties of the crust, i.e. of rock matrix and pore fluids together. Boundary conditions are a prescribed temperature that can change with time at the surface and a constant temperature at the base of the model (base lithosphere). The start condition of the model is a steady-state geotherm resulting from the initial boundary conditions. Starting from this steady-state situation we change the surface temperature to observe the effects on the geotherm in depth and time.

Comparison with analytical solutions: the influence of Milankovitch cycles

The magnitude, duration and penetration depth of the effect of changes in the surface temperature depend on its amplitude and especially the wavelength of the temperature variations. The analytical solution for a sinusoidal variation in surface temperature, for the case without spatial variations in the thermal conductivity and in the absence of heat production, is (e.g. Furbish, Reference Furbish1997):

(2)$$T\left( {z,t,\lambda } \right) = {T_a}{\rm{exp}}\left( { - z\sqrt {{\pi \over {\kappa \cdot \lambda }}} } \,\right){\rm{sin}}\left( {{{2\pi } \over \lambda } \cdot t - z\sqrt {{\pi \over {\kappa \cdot \lambda }}} } \,\right)$$

where T is temperature (°C), t is time (s), z is depth (m), λ is the period of the temperature signal (s), T _a is the amplitude of the temperature change at the surface (°C) and κ is thermal diffusivity (m²s^–1).

Using this equation we can compare the effects of the three major climatic (Milankovitch) cycles, with periods of 23, 42 and 100 kyr (e.g. Hays et al., Reference Hays, Imbrie and Shackleton1976). The equation shows that:

1. (a) The decrease in the amplitude of the temperature variation with depth is larger when the frequency of the temperature cycle is higher: in that case the temperature at depth has less time to adapt to the changes. As can be calculated from eqn 2, when assuming a thermal diffusivity κ of 10^–6 m²s^–1, the amplitude reduces by 63% every kilometre for the 100 kyr cycle, whereas for the 42 kyr cycle the amplitude reduction is 79% per kilometre and for the 23 kyr cycle it is 88% per kilometre.

2. (b) There is a phase change between the variation in surface temperature and the variations at depth. For the 100 kyr cycle, the response has a delay of 15.9 kyr per kilometre extra depth. At a depth of 3.1 km, the oscillation has thus been reversed, implying that a minimum surface temperature coincides with a maximum temperature at a depth of 3.1 km and vice versa. For the 42 kyr cycle, the delay of the response is 10.3 kyr per kilometre extra depth and the reversal is at a depth of 2 km, and for the 23 kyr cycle, the phase delay is 7.6 kyr km^–1 and the reversal occurs already at a depth of 1.5 km.

These findings are in accordance with the numerical solutions for these cyclic surface temperature changes, which are depicted for the 23 kyr and 42 kyr period in Fig. 1. In addition, Fig. 2 shows both the modelling result and the analytical solution in one graph for a surface temperature signal with a scaled amplitude of 1, a thermal diffusivity κ of 10^–6 m²s^–1 and a period of 100 kyr.

Fig. 1. The relative response to cyclic surface temperature variations (a) with a period of 23 kyr and (b) with a period of 42 kyr. The amplitudes of the cycles are scaled to 1.

Fig. 2. The relative response to cyclic surface temperature variations with a period of 100 kyr and an amplitude scaled to 1, calculated both analytically and numerically.

Ultimately, the combination of the reduction in amplitude and the delay of the phase of the oscillation with depth results in variations in the thermal gradient (Fig. 3). The figure shows that the shallow thermal gradient is reduced when the surface temperature is increasing, and rises when the surface temperature is decreasing. When the surface temperature is at its minimum, the shallow gradient is at its maximum, and vice versa. Moreover, as demonstrated by Fig. 3, the geotherm does not reach its steady-state configuration at any moment during the oscillations, indicating that a transient temperature field is not an exception but the rule.

Fig. 3. The downward propagation of changes in surface temperature, with a dimensionless (scaled) amplitude of 1 and periods of 100 kyr (upper panels), 42 kyr (central panels) and 23 kyr (lower panels), separated in phases of increasing surface temperature (left panels) and decreasing surface temperatures (right panels). Dark blue, red, green, purple and light blue curves represent successive moments, with time steps of 10 kyr (for the 100 kyr cyle), 4.2 kyr (for the 42 kyr cycle) or 2.3 kyr (for the 23 kyr cycle).

In reality, Milankovich cycles act simultaneously, causing the thermal phases to offset or amplify each other. Furthermore, other processes also have an influence on the climate, therefore, in order to investigate the effect of the climate on the subsurface temperature in the Netherlands, we used climate reconstructions which were available for up to 130 kya, and we tested the effect of several end member scenarios for the surface temperature history before 130 kya.

The thermal state of the Netherlands: variations with depth

The average geothermal gradient in the Netherlands at the depth interval from 0.5 to 3 km is between 31 and 33°C km^–1 (Ramaekers, Reference Ramaeckers, Hurtig, Cermak, Haenel and Zui1991). Regional values have been established, for example for the Roer Valley Graben, where the temperatures at depths of 2500 m below the surface range around an average of 98°C, implying an average geothermal gradient of 35°C km^–1 up to this depth (Luijendijk et al., Reference Luijendijk, ter Voorde, van Balen, Verweij and Simmelink2011, Fig. 4), and for the West Netherlands Basin, where numerical modelling based on well data resulted in average geothermal gradients of 30± 2°C km^–1 in the upper 5 km of this region (van Balen et al., Reference van Balen, van Bergen, de Leeuw, Pagnier, Simmelink, van Wees and Verweij2000). The most recent analysis of the temperature of the entire onshore Dutch underground, based on a dataset of 1241 measurements in 437 wells, yielded an average thermal gradient of 31.3°C km^–1 (Bonté et al. Reference Bonté, Van Wees and Verweij2012, Fig. 5), combined with a surface temperature of 10°C (Bonté et al., Reference Bonté, Van Wees and Verweij2012; see also van Dalfsen, Reference van Dalfsen1983). Interestingly, a much lower geothermal gradient is documented in the shallow (<200 m depth) subsurface in the central part of the Netherlands (Kooi, Reference Kooi2008), in the southeastern part of the Netherlands (Bense & Kooi, Reference Bense and Kooi2004), and in the Dutch and German parts of the Lower Rhine Embayment (Karg et al., Reference Karg, Bücker and Schellschmidt2004).

Fig. 4. Compilation of temperature data and their uncertainty range in the Roer Valley Graben Area, after Luijendijk et al. (Reference Luijendijk, ter Voorde, van Balen, Verweij and Simmelink2011).

Fig. 5. Average geotherm in the Netherlands based on compilation of available borehole data, corrected for thermal perturbations by drilling (adopted from Bonté et al, Reference Bonté, Van Wees and Verweij2012). (a) Temperature as a function of depth. (b) Location of the used drillholes.

Kooi (Reference Kooi2008) compared repeated borehole temperature measurements in the central parts of the Netherlands that were recorded some three decades apart. He found gradients around 20°C km^–1 to depths of about 200 m in measurements from the late 1970s. Similar gradients to depths of 400 m are common throughout the Netherlands (van Dalfsen, Reference van Dalfsen1981). In 2006, i.e. 30 years later, warming and reduced or even negative temperature gradients were observed at depths shallower than 70 m, whereas temperatures and gradients were found to be unaltered at depths larger than 70 m. The shallow subsurface warming was found to be consistent with documented increased surface air temperatures in the Netherlands since about 1980. This climate warming is too recent to have influenced temperatures at depths in excess of 70 m, explaining the relatively stable gradients of around 20°C km^–1.

Below, we investigate whether the relatively low gradient of 20°C km^–1 in the depth interval of 70 to 400 m, when compared to the interval from 0.5 to 3 km, can be explained by the temperature increase at the surface in the more distant past.

Input of the model

The existence of thick sediment layers in the Netherlands has a pronounced influence on its subsurface temperature structure (Bonté et al., Reference Bonté, Van Wees and Verweij2012): sediments act as an insulating layer for the crust. The sediment layering shows large spatial variations in the Netherlands, mostly due to structures and different subsidence rates. Since we use an average geotherm to constrain our models, and since our aim is to isolate the influence of the surface temperature variations from other effects, we choose to ignore this sediment blanketing effect. As shown by Bonté et al. (Reference Bonté, Van Wees and Verweij2012), this entails that the temperatures as observed in boreholes in the upper few kilometres of the subsurface can only be explained by combining an extremely low value for the thickness of the lithosphere with an unrealistic high value for the heat production in the upper crust.

The average thickness of the lithosphere beneath the Netherlands is hard to estimate due to uncertainties in composition and temperature at larger depths. Values in the literature vary from 90 km (Cloetingh et al., Reference Cloetingh, van Wees, Ziegler, Lenkey, Beekman, Tesauro, Förster, Norden, Kaban, Hardebol, Bonté, Genter, Guillou-Frottier, Ter Voorde, Sokoutis, Willingshofer, Cornu and Worum2010) to more than 150 km (Goes et al., Reference Goes, Govers and Vacher2000). In order to obtain present-day values for the geothermal gradient that are comparable with those measured in the Netherlands, we had to adopt a rather thin lithosphere of 90 km and a heat production of 3.6 μW/m³ in the upper 10 km of the crust. The resulting steady-state geotherm is shown in Fig. 6. Its gradient decreases with depth due to the effect of the heat production, from 32.2°C km^–1 at the surface, via 28.7°C km^–1 at a depth of 3 km, to 22.1°C km^–1 at a depth of 8 km.

Fig. 6. Temperature with depth at the start of the modelling (i.e. 130 kya).

Starting from this geotherm, we have applied the surface temperature proposed by Luijendijk et al. (2011, see Fig. 7), to represent the thermal evolution in the Netherlands during the past 130 kyr. This surface temperature history was estimated from climate proxy data such as pollen, fossil beetles (Coleoptera), plant macroremains and periglacial indicators in northwest and central Europe (Zagwijn, Reference Zagwijn1996; Huijzer & Vandenberghe, Reference Huijzer and Vandenberghe1998; Caspers & Freund, Reference Caspers and Freund2001), and in the northeastern part of the Netherlands (van Gijssel, Reference van Gijssel1995).

Fig. 7. Surface temperature history used for the simulation of temperature–depth profiles by Luijendijk et al. (Reference Luijendijk, ter Voorde, van Balen, Verweij and Simmelink2011). Based on climate proxy data published by Caspers & Freund (Reference Caspers and Freund2001), Reference van GijsselVan Gijssel (1995), Huijzer & Vandenberghe (Reference Huijzer and Vandenberghe1998), and Zagwijn (Reference Zagwijn1996).