Introduction

Laboratory studies (e.g. by Reference UzunerUzuner (1974), Reference Tatinclaux and ChengTatinclaux and Cheng (1978), and more recently by Reference HellmanHellman (1984)) show that the shear strength and deformation behavior of a relatively thick (block size being small compared to layer thickness) layer of floating ice rubble may be described using a Mohr-Coulomb relationship involving a term for apparentcohesion. Additionally, these studies show that shear-rate strongly affects the shear strength of a layer of ice rubble. One explanation for the cohesive behavior of a layer of floating ice rubble, and for the effect of shear-rate on shear strength, is the development of freeze-bonds between adjoining, contacting ice blocks.

Consider two ice blocks, both with side dimensions of unity, brought in contact as illustrated in Figure 1. If the blocks are loaded with a normal force which produces a normal pressureσ, then subsequent to a period t after application of σ, the two blocks would have to be separated at their interface by a shearing force which produces a shear stress T across the bond. In order for the blocks to be separated, T would have to overcome the shear strength of a freeze-bond between the blocks.

Fig. 1. Contact between two ice blocks.

The aim of this study is to determine the dependence of freeze-bond strength t on normal pressure σ, contact time t, fluid — air, pure water, or saline water - surrounding the two ice blocks, and contact area. The range of normal pressures was limited to a maximum value of 4 kPa, averaged over the nominal contact area. This value is within the range of pressures that may develop in layers of ice rubble up to about 9 m thick and in a neutral Rankine state. The temperature of the fluid — air, water - surrounding the blocks was held at 0°C.

Background

It is helpful to the understanding of the ensuing study to outline the nature of ice-rubble strength. Immediately after its formation, a layer of floating ice rubble undergoing deformation behaves similarly to a deformed granular medium. Its shear strength results from the mechanical friction and rolling resistance, and cohesion between ice blocks in contact. For this reason, most attempts (e.g. Reference Keinonen and NymanKeinonen and Nyman, 1978; Reference ProdanovicProdanovic, 1979; Reference HellmanHellman, 1984) to date at formulating shear strength of rubble have expressed it in the form of the Mohr-Coulomb relationship:

where t is the shear strength, c the cohesive intercept, σ the compressive stress normal to the shear plane, and Ø the angle of internal resistance.

As soon as the rubble comes to rest after its formation, adjacent ice blocks may start to freeze to each other at their points of contact, and form a rigid matrix known as consolidated rubble. Because most of the rubble is submerged, the surfaces of the ice blocks are at the melting temperature. Consequently, freezing can seemingly occur with little or no heat transfer. This freezing diffusion of submerged boundaries into each other begins immediately and continues so that, with the passing of time, the freeze-bonds strengthen and the shear strength of the consolidated rubble increases. It is important to note here that temperature distribution through contacting ice blocks likely affects freeze-bonding. For this reason, it may be difficult to extrapolate the results on freeze-bond strength to ice rubble of different temperatures and sizes.

It is evident that any factor which leads to more intimate contact between ice blocks will produce more extensive surface-contact area between ice blocks and increase the shear strength of the layer, as well as, possibly, the freeze-bond between the ice blocks. Therefore, T will be a function of σ, not only for its role of increasing the mechanical friction of the rubble but also because a large σ decreases rubble porosity, η, and increases surface contact area and, thereby, also c. The intrinsic cohesion, c, of a layer of floating ice rubble is a function of contact period, t, compressive pressure σ, as well as shape, roughness, and packing of ice blocks. Additionally, c will be influenced by the temperature and salinity of the water in which the layer of ice rubble floats.

Understanding the nature of freeze-bonding between ice blocks is important for understanding the shear-strength and deformation behavior of a floating layer of ice rubble. Surprisingly little is known about the intrinsic cohesion between blocks of ice, and there have apparently been no investigations on the strength of bond formed between ice block on ice block. A considerable number of studies (e.g. by Reference OksanenOksanen, 1983) have been conducted to determine the strength of ice bonding to other materials.

Reference MerinoMerino (1974), Reference Uzuner and KennedyUzuner and Kennedy (1976), Reference MellorMellor (1980), and others have shown that the vertical component of the internal stresses with a layer of floating ice rubble can be written as

and

in which p is porosity of the layer, ρi and ρ_w are the densities of the ice blocks and water, respectively, h is total thickness of layer of ice rubble, and z is distance below the top surface of ice-rubble layer. Equations (2a) and (2b) express average stress at any level through a layer of floating rubble. Locally, contact stresses may be somewhat higher.

Figure 2 depicts a simplified layer of ice rubble. If the following values are assumed, p = 0,40, ρ_w = 10⁵ kg/m^s, ρi - 0.92 x 10³ kg/m³, then Equation (2a) becomes

Fig. 2. Pressures within layers of floating ice rubble.

and Equation (2b) becomes

The relationship between σ _z and z is indicated in Figure 2. For the present study, the development of freeze-bonds is examined for compressive, or normal, pressures up to about 4 kPa. As is suggested in Figure 2, this range of compressive pressures is commensurate with vertical stress, o _z , acting through ice-rubble layers up to 10m thick. With, regard to lateral pressures acting through a layer of ice ’ rubble, 0-4 kPa is commensurate with passive pressures acting through layers up to (10 m)/K_p thick. The coefficient of Rankine-state passive pressure, Kp, varies from about 3 to 8 for values of angle of internal resistance ranging from 30° to about 50°. The range of normal pressures used for the present study covers much of the range for layers of floating ice rubble commonly encountered in Nature.

The phenomenon of freeze-bonding between ice blocks, or ice particles, is well known and has been investigated by such noted physicists as Reference FaradayMichael Faraday and James Thomson. Most of research effort has been concentrated on investigations of freeze-bonding between suspended particles of ice (e.g. Reference FaradayFaraday, 1859; Reference ThomsonThomson, 1861), especially spheres of ice (e.g. studies by Reference Nakaya and MatsumotoNakaya and Matsumoto, 1954; Reference JensenJensen, 1956; Reference KingeryKingery, 1960; Reference KuroiwaKuroiwa, 1961; Reference Hobbs and MasonHobbs and Mason, 1964).

The mechanism causing ice pieces to be adhesive, and hence the cohesive behavior of a layer of ice rubble, has been the topic of considerable interest and debate. Hobbs (1974) and Reference PounderPounder (1965), among others, provided detailed discussions on freeze-bonding. Reference FaradayFaraday ascribed freeze-bonding to the freezing of a "liquid-like" layer (term used by Hobbs) at the interface of two moist ice pieces.Reference ThomsonThomson attributed freeze-bonding to pressure melting at the contact between two ice pieces.

More recently, the process of sintering, or cold welding, has been used to explain the growth of a freeze-bond between contacting ice pieces, especially for pieces surrounded by air. Reference KingeryKingery (1960) Reference Kuroiwaand Kuroiwa (1961), for example, used this explanation for freeze-bonding.

When two contacting ice pieces are pressed against each other (e.g. as in Fig. 1), pressure melting may also come into play. If the pressure remains on the ice pieces, pressure melting may cause the two ice pieces to seat in closer contact, and the pressure may cause a sandwiched film of water to be squeezed from between the ice pieces. The upshot of the pressure would be the more rapid development of a stronger freeze-bond.

If the two moist ice pieces are surrounded by air, freezing of the water film at the contact may cause the two pieces to become fused to one another. Thereafter, the fusion would grow principally through the action of diffusion through the vapor phase of water, as was proposed by Reference Hobbs and MasonHobbs and Mason (1964).

If a freeze-bond did not form between two ice blocks, static friction would have to be overcome in order to slide them apart. The shear stress to overcome static friction and separate the two blocks can be stated as

where μ_s is the coefficient of static friction, for which a value of about 0.1 is reasonable (Reference HobbsHobbs, 1974), and a is normal pressure. Values of T_f up to about 0.1 x 4 kPa = 400 Pa would be required to separate two blocks under a normal load of 4 kPa.

The strength of the freeze-bond between two smooth ice blocks in water and in air is examined in the discussion that follows.

Experiments

The experiments were conducted in a cold room at the Iowa Institute of Hydraulic Research (IIHR). For all tests, the air temperature in the cold room was held between -1° to +1°C.

Ice blocks of repeatable size and smoothness were produced from mains tap water frozen in smooth aluminum casts. Three sizes of cast were used. The casts were filled with tap water and placed in a freezer box which was maintained at an internal air temperature of -10°C. The base areas of the three sizes of ice blocks were 4.52 x 10^-3m², 9.03 x 10^-2m², and 19.35 x 10^-3 m², such that the relative sizes of the base areas were 1:2:4 (see Fig. 3). Although the base of each block was as smooth and planar as the aluminum mold in which it was cast, the upper surface of each block was rounded due to expansion of the water from which it was formed. The top surface was leveled with a heated iron, using the method suggested by Reference Oksanen and KeinonenOksanen and Keinonen (1982).

Fig. 3. Samples of the test blocks of ice.

For each experiment, the test block of ice was placed on a smooth lower slab of ice 0.71 m long, 0.28 m wide, and 0.05 m thick. The lower slab of ice was prepared in a similar manner as that used to produce the test blocks of ice. It was grown in an aluminum container. The surface in contact with the base of the aluminum container was upward and used during the experiments. The surface which was exposed to air, during the growth of the block, and expanded outwards was leveled using a heated iron. This leveled face was in contact with the base of the glass-sided test tank.

Aluminum frames were constructed to fit over the top of each size of test block of ice, as shown in Figure 4. The frames were fitted with a hook which was located at the center of the front face of each test block. The experimental set-up is illustrated in Figure 4. A light-weight, stainless steel-strand cable was attached to thehook and passed around a pulley, which guided the cable to a load cell rigidly mounted on the traveling cross-head of a Tinius Olsen universal testing machine. When the cross-head of the testing machine was moved upward, the increasing cable tension was transduced by way of the load cell. The output voltage from the load cell was fed to a signal conditioner which was connected to the IIHR HP1000 computer. Most tests were conducted with the cross-head moving at a speed of 0.84 mm/s. A brief series of tests was conducted with the cross-head moving at a speed of 0.44 mm/s.

Fig. 4. The experimental set-up.

The load cell was calibrated periodically throughout the experiments and was used to a precision of ±0.10 N. A typical time history of tension in the cable is shown in Figure 5.

Fig. 5. A typical time history of cable tension.

The program of experiments, which is summarized in Table 1, involved series of experiments to determine the effects on freeze-bonding of the following parameters;

• (i) period of bonding;

• (ii) normal pressure;

• (iii) contact area;

• (iv) fluidinwhichbondingoccurs:air, distilled water, tap water, water from the Iowa River, and 3%, 12.5%, and 25% (by weight) NaCl solutions; and,

• (v) loading rate.

In general, the experimental procedure that was adopted conformed to the procedure specified in the I A H R recommendations on testing methods of ice properties (1980): in accordance with the section on testing for friction coefficient between ice and some material, a test block of ice was seated on and towed over dry and wet surfaces of ice, which were horizontally aligned. The initial peak resistance (see Fig. 5) was taken to be the shear strength of the freeze-bond between the test block of ice and the ice slab beneath. (Analogously, for an ice block on a surface other than ice, the initial peak resistance could be associated with static friction.)

For each test, a normally loaded block of ice was placed on the ice surface and, after a prescribed period, was loaded horizontally, by way of a cable tow, until the freeze-bond sheared. Each test was repeated at least ten times in order to establish one data point.

Presentation and Discussion of Results

The results from the experiments are presented and discussed in terms of the influences on freeze-bonding of the following parameters:

• (i) contact period (for σ = 460 kPa);

• (ii) normal pressure (for a contact period of 10 s);

• (iii) fluid at contact (air, purewater, river water, saline water, all at 0 C); and,

• (iv) contact area.

Preliminary tests were carried out to examine the influence of loading speed on strength of a freeze-bond between the test ice block and the base ice slab. The range of loading speeds was limited to a relatively narrow range; 0.84 mm/s to 0.44 mm/s. For this range, loading speed did not influence the measured strength of the freeze-bond between the ice block and the ice base, as shown in Figure 6

Fig. 6. Influence on freeze-bond strength of the rate of loading rate, for the range of strain-rates tested.

Each datum point given in Figures 7 through 15 is the mean of ten tests at the given test condition.

Fig. 7. Strength of freeze-bond versus period of contact.

Conclusions

Series of laboratory experiments were conducted with the aim of determining the influence on freeze-bonding between ice blocks of pressure normal to the contact plane, period and area of contact, and salinity of the water in which freeze-bonding occurred. Freeze-bonding between ice blocks in air was also investigated. The experiments were conducted with water and air temperatures of approximately 0°C, and normal pressure between ice blocks up to 4 kPa. This range of normal pressures can be associated with average contact pressures between ice blocks in a 10 m thick layer of floating ice rubble under conditions of hydrostatic loading, and in 2-3 m thick layers of floating ice rubble under conditions of passive Rankine-state loading.

The following principal conclusions were arrived at:

• 1. The strength of freeze-bonds between ice blocks in contact is influenced by normal pressure, contact time and area, and salinity of the water in which bonding, or fusion, occurs.

• 2. Stronger freeze-bonds develop between ice blocks in distilled water, tap water, and water from the Iowa River than between ice blocks contacting in air. However, stronger freeze-bonds develop between ice blocks in air than develop between ice blocks in a 12.5 or 25% (by weight) saline solution at 0°C. Freeze-bonds formed in distilled or mains tap water at 0° C are aboutfour times stronger than those formed in air at 0° C.

• 3. For freeze-bonding between ice blocks contacting for less than 1 min in distilled water, strength of freeze-bond,

  

  and for freeze-bonding in saline solution, strength of freeze-bond

  

  For the above equations, F _$ is the force required to shear a freeze-bond; A is contact area (9,03 x 10^-3 m²); T is nominal shear strength of freeze-bond; a is normal pressure acting against A; and C is weight concentration of salt (NaCI) in water.

• 4. The strength of freeze-bonding increases linearly with contact period for ice blocks contacting in distilled water, tap water, or Iowa River water.

• 5. The strength of freeze-bonding does not increase with contact period for ice blocks contacting in saline (NaCI) solutions with salinity in excess of 3% for solution temperature at 0°C.

• 6. The strength of freeze-bonding does not increase with contact period for ice blocks contacting in air at 0°C.

Significance of Results to the Shear-Strength Behavior of a Layer of Floating Ice Rubble

The conclusions enumerated above are of some significance to the shear strength and deformation behavior of a layer of floating ice rubble.

Because stronger freeze-bonds form between ice blocks in water, it is likely that the shear strength of rubble in water will exhibit a more pronounced cohesive character than will ice rubble being sheared in air. Associated with this result, it is likely that the shear-strength behavior of ice rubble in water will exhibit a greater shear-rate effect (decreasing strength with increasing rate) than will the shear-strength behavior of ice rubble in air.

The cohesive component in the shear-strength relationship for floating ice rubble may increase with increasing layer thickness of ice rubble, because normal pressures increase.

Contributing to the scatter of data on the shear-strength behavior of rubble ice is the time between tests, as with increasing contact time, stronger freeeze-bonds may develop.

Extrapolation to full scale of the data presented here is likely complicated by several factors, including the influence of core temperature of ice-rubble pieces. Further research is needed to determine the influences on freeze-bonding of core temperature, which by affecting heat fluxes from contact points likely influences freeze-bond strength, and other factors such as form and roughness of ice rubble.