1. Introduction

When water is frozen in an open container, one sometimes finds a spike of ice projecting upward from the free surface. Figure 1 includes several examples of these on ice cubes grown in ice-cube trays. They have been interpreted correctly as a result of partly confined freezing, with the liquid water being extruded through a hole in the ice at the upper surface because of the 9% expansion that accompanies freezing. The water rises through a central hole in the spike, extending the ice tube by freezing at its tip (Reference DorseyDorsey, 1921; Reference BallyBally, 1933; Reference BlanchardBlanchard, 1951; Reference HallettHallett, 1960).

Fig. 1. Examples of ice cubes, discussed in the text. The ‘spikes’ are seen in (a), (b), (c) and (f); protuberances that did not become spikes in (d), (e) and (h); and an ice cube with an exceptionally flat surface, from water that supercooled to at least –10C before ice initiated, in (g). Side and end views of the same cube are shown in (d1) and (d2). The changes in illumination near the bases of the spikes in (a) and (d), and see also (e) and (h), are an illumination effect and do not indicate any changes in the ice.

An ice spike could be defined as requiring a length-to-diameter ratio greater than some number, but there seems little point in doing that. Here, we emphasize the most striking ice spikes that have parallel or nearly parallel sides, as showing a steady- or nearly steady-state process.

Two experimental investigations aimed directly at understanding ice-cube spikes were completed recently (Reference Hill, Lozowski and SampsonHill and others, 2004; Reference Libbrecht and LuiLibbrecht and Lui, 2004), and these motivated the present study. They confirmed the ‘Bally–Dorsey hypothesis’ (the explanation above) and made other contributions, but failed to investigate why spikes do not always occur: Why do most ice cubes not form spikes? What are the necessary and sufficient conditions for spike formation? Since the expansion is an inexorable consequence of the freezing, what are the other manifestations of that expansion, and what selects between them?

Most basic of all, what are the important physical principles that govern ice-spike formation? This question was the main object of my curiosity, and my initial approach was simply to watch ice spikes forming, looking for what differentiates between forming and not forming spikes under the same external conditions. The investigation grew from that, and progressed to the point of having, I think, a much better appreciation of the principles than I had to start with, or is available in the literature. As will be seen, this is still short of having a specific list of necessary and sufficient conditions for spike formation, but it should be a step toward that, if or when someone pursues it.

2. Initial Experiments

Ice cubes were frozen in a walk-in cold room by putting icecube trays with water in them on a tabletop. The room was controlled at a mean temperature of about –15°C, fluctuating several degrees either way, and there was a wind of several ms^–1. The ice-cube trays had 16 compartments; half were left empty, and the others were filled with deionized water (18 Ωm resistivity) at 22–23°C.

Freezing at the water surface may start in 15–20 minutes, but sometimes not for 1 hour or more. When ice does initiate in these deeply supercooled samples, a fine mesh of ice dendrites grows throughout the volume in about 1 s (Reference PruppacherPruppacher, 1967; Reference Macklin and RyanMacklin and Ryan, 1968). The liquid portion of this slush then freezes from the outside. These ice cubes were never seen to develop spikes, or even any pronounced local bulges on their upper surfaces. The example in Figure 1g has no bulges at all, but that is rare. The usual case has a wide, rounded dome somewhere on the top surface. Not counting these cases, still only 10–20% of the ice cubes grow spikes, so their rarity still requires an explanation.

Most of the ice initiation in the cold room is probably from tiny ice crystals in the air. Because it was desired to avoid deep supercooling in order to increase the frequency of spike formation, a little ice was sawed on the band-saw in the cold room about 15 min after cooling commenced in all subsequent experiments. Done judiciously, this initiated ice early, at several places on the surface in each ice-cube compartment, in a variety of crystal orientations. However, since this is still not a reproducible procedure in terms of the factors important for ice-spike formation, the numerical frequency of formation is still not very meaningful. Most of the subsequent investigation centered on understanding the early crystal textures, observing how they relate to ice-spike formation and explaining the relationship that was found.

The following observations were gained from watching the freezing in these initial experiments. The most common location for spike formation is the last, unfrozen area of the water surface, usually tri-or quadrangular, bounded by three or four crystals. Both Reference HallettHallett (1960) and Reference Hill, Lozowski and SampsonHill and others (2004) comment on this. As this opening closes down, water is squeezed upward, making a very pronounced, rounded bulge above the ice surface. Having shrunk to a diameter of a few millimeters, this bulge sometimes continues growing as a spike to as much as several centimeters in length as seen in Figure 1. Spike growth rates varied from nearly as fast as 1 mm s^–1 to roughly 1 mm min^–1. Growing just as the upper surface is not quite completely frozen, spikes occur very early in the freezing of the ice cubes as a whole, before the expansion has any opportunity to crack the ice, and before any air bubbles form in the liquid: they generally grow 10–40 min after the first ice forms. It took about 4 hours for the ice cubes to freeze solid.

Figure 2 illustrates the water bulging up into open spaces in the ice cover. It was taken with light reflected from the surface, with the water freezing in a circular plastic dish. The camera pointed not quite straight down on the surface, and the illumination was from a circular, diffuse source, arranged so that initially the flat, water surface was fully illuminated by reflection (Fig. 2, t = 2:00 (time in minutes and seconds), upper right panel). The bulges of water above the freezing surface act as convex mirrors, so the light source is imaged as bright spots in the middle of each bulge (Fig. 2, t = 2:00 to t = 5:50): the smaller the bright spot, the greater the curvature of the water surface.

Fig. 2. Four stages in the ice growth across the water surface. Illumination is diffuse light reflected from the surface, and times are indicated in minutes and seconds. Note the water bulging up between the needle crystals at 2:00. At 5:00, two of the bulges (near the left edge) have frozen, and flooding occurred at the upper left between 5:00 and 5:50, lowering the water level in the unfrozen openings. The evenly textured areas are covered with a thin skim of ice with its c axis close to vertical.

The polygonal holes in the ice surface in which these bulges occur are bounded by surface crystals that earlier were needle-like, each with its c axis in the plane normal to the needle axis. Two of them froze over between 2:00 and 5:00, but then between 5:00 and 5:50 water flowed out over the ice at the upper left, and the level of the water surface in the remaining openings sank back down. These flooding events are very common. The surface of the flood then starts to freeze inward from its perimeter, and there often ensues a series of such discrete flooding events, eventually leaving a wide, low, sometimes terraced, plateau of ice above the original ice surface. Figure 2 also shows two areas of rather uniformly textured ice, to the lower left and lower right, which are areas with the c axis not far from vertical. When most of the surface is covered with this kind of ice, flooding usually occurs very early, and spikes rarely form.

The name ‘ice spike’ implies that they are usually quite straight, even when highly tilted, and taper very little over much of their length. Figure 1 also shows projections from the ice surface that taper to fairly sharp points and therefore are not termed spikes. Occasionally, as in Figure 1d1 and d2, a projection looks like a spike from one direction but not from another.

The initial observations summarized above underscore the importance of two factors in ice-spike formation. One is the relationship between the crystal fabrics of the initial ice skim, the highly rounded water bulges above the surface and the eventual spikes. The other is the flooding events, since flooding is evidently the main alternative to spike formation early in the freezing. The crystal fabrics will be discussed first, followed by the formation of the first ice layer on the surface, and then the flooding events. A final discussion then concerns the steady state, and returns to the principles involved in understanding why spikes are rather rare.

3. Crystal Fabrics of the Ice-Cube Spikes

With the exception of brief observations by Reference HallettHallett (1960) the literature contains no information on crystal conformations or orientations in ice spikes. The next step in the present study was to determine these for a number of spikes. The measurements employed a ‘Rigsby stage’ (Reference LangwayLangway, 1958), constructed to accept 5 cm-square glass plates (on which the thin sections of ice were mounted), and fitted with a low-power microscope for viewing. The crystal c-axis orientations were measured optically, between crossed polaroids, using standard procedures (e.g. Reference LangwayLangway, 1958).

The spikes themselves are inconveniently small to section individually, so first they were cast in solid ice. Sections were then made through the ice, parallel to the original upper surface. The spikes were almost always easily recognizable, though their edges often were not precisely defined. Their most characteristic feature is a central line of air bubbles formed when the central conduit freezes solid (see Fig. 1, especially Fig. 1c and f). The central air bubbles nearly always coincide with a grain boundary or a triple junction line along the center of the spike. Often a series of thin sections was prepared through a spike, starting at the upper surface of the built-up ice and ending just below the original flat part of the ice-cube surface. There is always perfect crystal continuity into the body of the ice cube, and no indication of recrystallization altering the crystals within a spike.

Figure 3a–c show the crystal orientations of component crystals of the ice-cube spike shown in Figure 1a, looking down on the horizontal slices. The arrow in Figure 3a represents the projection of the axis of the spike, labeled with its approximate angle from the vertical, the arrow pointing from base to tip. This spike is a tricrystal, with the grain boundary intersection line approximately up the center. The orientation symbol for each crystal is the strike and dip of the basal plane (0001). The longer line traces the intersection of that plane with the plane of the section (the horizontal), and the shorter one normal to it is the direction of its downward tilt. This is measured in degrees from the horizontal, as labeled.

Fig. 3. (a–c) Crystal orientations of the three crystals composing the spike in Figure 1a, at three levels: (a), (b) and (c) correspond to the three arrows, starting at the top, in Figure 1a. The numbers are the inclination of the basal planes from horizontal, and the symbols show the strike and dip of the basal planes, explained in the text. The outlines are the edge of the built-up ice; the notches are vertical saw cuts to provide a registration between successive sections. The spike slants about 20° from the vertical, indicated by the arrow in (a). (d) A schematic cross-section of the growing spike, showing the water core and the ice shell, in the plane of its inclination (the dashed line in (c)) and about normal to the boundary between the two major crystals, whose basal plane orientations are indicated by the parallel lines.

The positions of the three slices in Figure 3 are indicated by arrows on Figure 1a. Figure 3c is the lowest, close to the flat part of the original ice-cube surface. Before the sections were made, the righthand third of the ice cube was cut off. The notches are from two vertical saw cuts, to provide a better spatial registry in case the angle of the spike needed to be determined from the sections.

The lines of intersection of the basal planes with the horizontal are roughly tangential in the spike, as expected if the spike grew from a triangular opening between three surface needles. The new result is the consistent inward dip of the basal planes of ice, downward toward the center of the ice spike. Thus the basal planes diverge upwards or, for highly tilted spikes, outwards along the spike axis. Figure 3d is a schematic cross-section through the center of the spike, as if it were composed only of the two crystals on the right (ignoring the one on the left in Fig. 3a–c), at about the orientation of the dashed line in Figure 3c. The tilt of the ice spike has it growing at an angle that roughly bisects the angle between the two sets of basal planes, as shown in Figure 3d. These two features are general rules for the ice spikes studied: the upward divergence of the basal planes of the component crystals of the spike (whose basal planes are roughly tangential in the spike itself) and their relationship with the tilt of the spike.

Figure 4 contains more ice fabrics, Figure 4a–e being from the ice spikes in Figure 1b and c and the ice projections in Figure 1d, e and h, respectively. The ice spike of Figure 1f is not included since it is a single crystal, with its c axis vertical, underlain by a crystal of the same orientation. Three such spikes, two of which were vertical, were encountered, of the 34 whose crystal orientations were recorded. (The one that was slightly tilted leaned downwind.) All of the ice cubes in Figure 4 were trimmed before sectioning, so as to fit comfortably on the 5 × 5 cm glass slides, and the sections for Figure 4d and e were right at the original ice surface.

Fig. 4. Crystal orientations from ice cubes in Figure 1: (a) is from Figure 1b; (b) from Figure 1c; (c1) and (c2) from Figure 1d1 and 1d2; (d) from Figure 1e; and (e) from Figure 1f. ((c2) is a horizontal section near the base of the spike shown in Figure 1d1 and d2, and (c1) is higher up, above where two of the crystals had terminated at the sides of the ice.)

Figure 4a is a section through the spike in Figure 1b, several millimeters above the ice-cube surface. This one is a bicrystal, tilting only 10° from the vertical, with its two crystals’ basal planes diverging symmetrically upward. Figure 4b (Fig. 1c) is a case of extreme tilt, again roughly bisecting the angle between the basal planes of its two component crystals. Figure 4c contains two levels in the ice protrusion seen in two views in Figure 1d1 and d2. One might call this an ice spike, looking only at the side of the ice cube, but not looking from the end. This one started out as four crystals, with its initial tilt consistent with the asymmetry of the tilts of the basal planes, but ended up as two crystals with the basal planes < 30° apart. The crystal orientations in two other ice projections that did not grow into spikes (Fig. 1e and h) are shown in Figure 4d and e. From comparison with the true spikes given in Figures 3 and 4a and b, it appears that considerable upward divergence of the basal planes is needed to produce the long ice spikes. Shorter, tapering ice projections form when the divergence is not great enough, and no projections of this kind are seen when the basal planes converge upwards.

This is one general result from the fabric studies, less than 20% of which have been illustrated. Others are that the crystal orientations control the spike orientations, and spikes with either two or three crystals are by far the most common, one crystal and four or more crystals being very rare.

4. Freezing at a Free Water Surface: How Many of the Spikes Get Started?

An ice single crystal growing in slightly supercooled water has extremely anisotropic growth rates: very slow parallel to its c axis and much faster parallel to the basal plane (e.g. Reference HobbsHobbs, 1974). At a free water surface, this leads to thin, basal, single-crystal discs floating with their c axes vertical given that they start in that orientation. Starting at some other orientation, they might reorient that way if they were free to do so. In any case, the ice initiation in the present experiments provided a variety of starting orientations that soon were locked in as crystals grew and stuck to each other and to the walls. Initiation by debris from the band-saw provides some free-floating single crystals, and also polycrystals that give rise to several needles radiating from one center, as seen toward the left side of Figure 2.

Reference HallettHallett (1960) has described ice growth at a supercooled water surface as a function of crystal orientation. An ice crystal with its c axis vertical has its fast-growth plane parallel to the surface and spreads quickly and fairly uniformly as a thin layer over the entire surface. A crystal with its c axis horizontal (or at any angle not too near the vertical) grows as a needle normal to the c axis, extending linearly very fast but not covering area nearly as fast. Reference HallettHallett (1960) calls these ‘surface needles’ to distinguish them from snow crystal needles. The interlocking of these surface needles and their slow thickening produces the triangular and more-than-three-sided polygonal ‘holes’ of open water that slowly close in from their sides, producing the water bulges as in Figure 2.

The c axes of most surface needles are not parallel to the surface, so their basal planes usually slant down to one side. Basal dendrites grow down into the water on that side, as seen in Figure 5a, which is very much like Reference HallettHallett’s (1960) figure 3. The water had supercooled to some depth. Reference HallettHallett (1960) observed that the lateral growth at the surface was faster on the side away from these dendrites, perhaps because of the latent heat released by growth of the downward-slanting dendrites.

Fig. 5. (a) A cross-sectional view of how a ‘surface needle’ with a tilted c axis spreads laterally on a water surface (after Reference HallettHallett, 1960, fig. 3). The initial growth is down into the water parallel to the basal plane, and on the surface the lateral growth to the right (B) is faster than that to the left (A). (b) The same situation taking into account the rising of the water level when the freezing is confined and the growing crystal is locked in place so that it cannot float upward. Now the growth along the surface to the right (C) is much faster than that to the left (D), because it is nearly parallel to the basal plane, whereas that to the left is nearly parallel to the c axis.

This slanting growth down into the liquid (illustrated in Hallett’s fig. 1) was seen many times in the present experiments, and may nearly always be associated with spike formation. However, Figure 5a may not be the whole story. Since the surface bulges of water are predecessors of ice-spike formation, it is probably more relevant to draw the water surface as in Figure 5b, with the water being squeezed up above the ice. Figure 5a is appropriate for free-floating ice, whereas Figure 5b applies to ice fixed in place. Now, remembering that the slanting lines in the ice indicate the basal orientation, direction D is optimally oriented for the fastest growth along the actual tilted water surface. Growth there is parallel to the basal plane, while growth in direction C is perpendicular. This effect must produce a strong bias toward the last open-water space being surrounded by surface needles with the basal planes of their component crystals diverging upwards, as is observed in the ice spikes. The interaction of the changing slope of the water surface at the ice–water–air junction with the extreme anisotropy of ice growth rate in the plane of the surface is critical for ice-spike formation, and is discussed further in connection with Figure 9, below.

5. Surface Flooding; The Effective Contact Angle of Water on Ice

Watching ice cubes freeze, one quickly sees that surface flooding is the main alternative to ice-spike formation, so the most fundamental issue is why the flooding occurs in some cases but not others. The water surface commonly becomes elevated above the ice surface during early freezing, and at the tips of growing spikes the slope of the water surface at its contact with ice can be vertical or overhanging, without flooding the ice (demonstrated below). What keeps the water from flowing downhill? The effective contact angle of water on ice must be greater than zero, since if it were zero, there would be no barrier. (‘Effective’ is used here because the system is neither at equilibrium nor strictly pure.)

The onset of flooding is sudden, with a rapid initial outflow that slows quickly, stops, and the surface of the puddle then freezes more slowly back (uphill) from the edge. During the flood the advancing water–ice contact line appears very sharp, but as the surface freezing moves back, there is no visible contact line in reflected light: there is no sharp change in the tilt of the upper surface.

In the process of photography it was found that the flooding is very sensitive to mechanical disturbance: sometimes the slightest vibration or shock starts it. Vibration may be another factor contributing to the rarity of ice spikes. (It is best to move the camera, not the specimen, when photographing ice-spike growth and its precursors.) A simple experiment showed that vibrating the ice-cube trays can prevent spike formation entirely, but a quantitative study of the effects of vibration was not undertaken.

Small additions of salt discourage ice-spike formation by encouraging flooding, probably not by any influence on growth at the tip of the spike caused by build-up of impurities, as was suggested by Reference Libbrecht and LuiLibbrecht and Lui (2004). The effect is illustrated in Figure 6, five panels of which (all but t = 9:29) show stages of the freezing of a 10^–2 molar NaCl solution. The pure sample, t = 9:29, was started at the same time and is included for comparison. Flooding over the ice starts very early with a 10^–2 molar salt solution, and proceeds continuously. In the 2 min interval between Figure 6, 1:31 and 3:29, for instance, the contact line creeps steadily over the ice. In contrast, the pure water in this case flooded a little, once, very early, and then never again. Instead, it grew a thick ice spike, about 1 cm high when photographed, that grew later to >2 cm. Experiments with 10^–3 molar NaCl showed similar behavior to 10^–2 molar, in that, once started, the flooding tended to continue, only a lot more slowly. Before it eventually started, however, much more prominent water bulges developed, and in one case a small ice spike formed. The slow motion of the contact line over the ice in the salty cases might largely be a result of evaporation at the contact line, concentrating salt in the water there and lowering the melting point, perhaps causing the contact line to advance by local melting. However, the explanation of the effect of salt on flooding was not pursued. The flooding that often occurs with pure water, as seen in Figure 2, is less extensive and more discontinuous but can lead to terraced ice hillocks not unlike that seen in Figure 6, t = 29:26.

Fig. 6. Sequence similar to Figure 2, but showing the growth and flooding of the ice from a 10^–2 molar NaCl solution, except for the one at t = 9:29 (minutes and seconds after 0:00), which is from pure water. The flooding from the NaCl solution starts early and proceeds continuously. Gradual flooding prevails with the salt solution, but with pure water there was very limited flooding and an ice spike grew instead.

6. Concluding Discussions

6.1. Principles of ice-spike formation: achieving and maintaining the balance required for steady-state growth

For a spike to have very nearly parallel sides, which the longest do for most of their length in the growth conditions used here, the tip must be essentially identical from one moment to the next. The ice front must move at the same rate as the water front, or else the diameter of the spike will change. A closer look at a single spike illustrates this. Figure 7 is a series of photographs of a growing spike that maintains a constant diameter for about 1 cm. The tip outline over most of its growth is a virtually perfect half-circle, and there is no drainage of water down the sides. The axial growth rate is constant for about 10 min (Fig. 8). Then it slows, probably when the main water supply is cut off by freezing at the base of the spike;the diameter decreases, and the axial growth rate speeds up again as the last of the water within the spike freezes (Reference Hill, Lozowski and SampsonHill and others, 2004). (Note that the camera had to be raised at about 10 min, and the curves before and after that were lined up.)

Fig. 7. Close-up series of a growing spike, with times in minutes and seconds. After 8:49, the camera was moved upward to keep the tip in view: the arrow indicates the location of the bottom of the last three views. The spike was composed of two crystals, with orientations given in the center, oriented such that looking from below on the page is the viewpoint of the photographs.

Fig. 8. Positions of the tip of the spike in Figure 7, taken from the photographs, are plotted as a function of time. The camera was moved just before 600s and the two portions of the graph were lined up.

The motion of the junction line where the phases water, ice and air meet is important when considering ice-spike growth. This line (a point on two-dimensional diagrams) moves because of the freezing of the water. The fact that there is no break in the slope of the surface–air interface of the condensed phases at the water–ice junction shows that the junction follows the water–air interface. This is not necessarily true a priori, but is an observed fact, and it is critically important for the reasoning that follows. The junction always follows the water surface (except of course when water is flooding over the ice), even as the water surface itself is moving;the motion of the junction does not drag the water surface with it.

Thus the junction itself is not visible on photos like those in Figure 7. However, in steady-state growth, when a spike has parallel sides, it must be just where the tip curvature starts, because the water–air interface at the junction has to be parallel to the axis of the spike for the spike diameter to remain constant. The liquid cap then has to be a half-circle in cross-section, neglecting gravity. (This is the case in Figure 7 when the sides are parallel, and Figure 10, below, is a direct demonstration of the location of the junction for a similar spike.) The ‘axial crystal growth rate’ of the ice, which is the rate of movement of the junction in the axial direction, must equal the ‘axial extrusion rate’ of the water, defined as the volume extrusion rate divided by the spike cross-sectional area, if the sides of the spike are to be parallel.

These two axial rates are somewhat independent, inasmuch as the former depends upon the heat economy and the crystal orientations at the tip of the spike, while the latter depends upon the freezing rate of the body of the ice cube and the cross-sectional area of the spike. However, given an approximately constant volume extrusion rate, there probably always exists a size of opening for which the equality can hold, since the axial extrusion rate for a large opening is very slow, and can be as fast as might be needed for a small enough opening. Given that the junction follows the water surface, if there is too much water at the tip the diameter of the spike will increase because the liquid overhangs the side, and the reverse effect is seen if there is too little water at the tip. A constant rate of water extrusion will produce a parallel-sided spike; a changing rate will produce a tapering or expanding spike.

Figure 9 is a two-dimensional sketch of the history of an ice spike. It starts as an opening in the initial ice cover, in which the water surface is essentially flat. As the ice grows the opening closes in and the water bulges upward, as seen in Figure 9a. Further growth constricts the opening more, increasing the axial extrusion rate and increasing the curvature of the water surface (Fig. 9b). If a spike is to form (as in Figs 7 and 9), the axial crystal growth rate must match the axial extrusion rate just when the water–air interface becomes parallel to the spike axis. At first, there is not enough water to give a hemispherical cap, so the diameter of the opening narrows until it is hemispherical, at which point the spike continues to grow with parallel sides.

Fig. 9. (a–c) Schematic of the stages of growth of a vertical ice spike like that in Figure 7. The dendrites projecting down into the water are as in Figure 5, and have been observed directly. In (c) the motion of the ice–water–air junction is indicated, as traveling from A’ to A. There is no horizontal motion of the junction in the steady state.

Figure 10 illustrates the principle of the adjustment of a spike to its steady-state diameter. The growing spike in Figure 10, t = 0:00, had its tip drop of water blown away by a blast of air from a syringe, and in the panel taken 14 s later the water had separated entirely, without wetting the side of the spike. There was immediately a little inward freezing, constricting the opening somewhat. The water then extruded out from that smaller opening, but soon regained about the same diameter it had before, as shown at t = 1:55. Figure 10 also illustrates that the water–ice junction is right where the tip curvature starts;and it also shows that the junction is usually not simply a circle around the spike. The upward arc at the tip at t = 0:14 is the ice edge of the nearer side of the tip. Evidently the grain boundaries occupy significant dips, probably downward cusps, in the junction line that encircles the tip.

Fig. 10. Three stages of a growing spike, times in minutes and seconds. The water drop was blown off the tip with a blast of air from a syringe, between 0:00 and 0:14. The growing spike has regained its previous diameter at 1:55.