Forest Ecology. Dan Binkley
would be to another in the medium group with 3950 mm yr−1 site. Another version of the analysis could be done with all the data from each site allowed to influence the trend, and then a full three‐dimensional pattern can be developed. The second graph in Figure B has two horizontal axes. The temperature axis increases to the right, and “backward” into the 3D space. The precipitation axis goes the other way, increasing to the left and also going backward into the space. This graph shows how any given level of temperature, and any level of precipitation, connect to give an estimate of the expected rate of stem growth. Keeping all the information on precipitation included (rather than lumping into three groups) increases the variation accounted for to 34%. A key difference is that this full‐information analysis shows that growth continues to increase at high temperatures if the precipitation is high, but levels off (with no decline) on drier sites. This might seem like a small improvement in the pattern, but the improvement does warrant very high confidence.
It can be challenging to read the values for stem growth on the 3D graph, compared with straightforward 2D graphs. The grid lines give some help for visualizing how the overall trend changes, and the use of colors helps peg a value to any given point on the surface. Overall, 3D graphs can be very useful for illustrating overall trends, but 2D graphs might be more useful when the precise values of variables need to be identified.
Why do temperature and precipitation relate to only about one‐third of all the variation in stem growth among tropical forests? Two points are important. This analysis used only annual averages, and two sites with similar annual average might differ in important seasonal ways. A given amount of rain spread evenly across 12 months might have very different effects on growth than if all the rain fell during a 4‐month rainy season (with no rain for 8 months). The second point is that stem growth depends on a wide range of ecological factors, including soil nutrient supplies, and the genotypes of trees present. Attempts to explain forest growth often go beyond the ability of graphs to capture the relationship, using simulation models and other tools that have a chance to capture variations in growth patterns that go beyond two or three dimensions (Chapter 7).
The Most Important Points to Understand from Figures B and C Are Not About Precipitation or Temperature
The most important point is one that is not found in the graph, but applies to this graph and most others in this book. Graphs plot the values for a variable (such as forest growth) based on another variable (such as precipitation). Even when the association between the two variables is very strong, it's fundamentally important to recognize that evidence of an association is not evidence of a cause‐and‐effect relationship. The forests that provided the data for Figure B had very different species composition, different soils, different ages, and different local histories of events. Some of these may happen to vary with precipitation, and might be the actual drivers of the trends that relate to precipitation. Similarly, if forest growth tended to decline in the warmest sites, that might result from increased activities of insects (or monkeys) rather than a direct effect of temperature.
Identification of driving causes behind patterns requires other sorts of evidence, especially evidence from experiments. If the addition (or removal) of water changed growth as much as was expected from the geographic gradient, then increased confidence would be warranted in water influencing growth across many locations. If plantations of a single species also declined in growth at high temperatures, then the trend in Figure B may be less influenced by changes in tree species across sites.
This fundamental idea is summarized in the aphorism, “Correlation does not equal causation.” All scientists know this, but placing science into sentences can be challenging for both thinking processes and writing processes. It's easy to find examples where scientists forgot this basic point (perhaps even a few places in this book?).
Confidence Bands Around Trends Come in Two Types
Most of this book's graphs have shaded bands around the trend lines, and these represent the 95% confidence interval around the trend. A narrow band means the value on the Y axis was tightly related to the value on the X axis. Other types of bands can also be used, and Figure D shows a band that describes the distribution pattern for all the observations rather than the confidence warranted in the average trend. Both shaded bands in Figure D deal with 95%, but one describes the region where 95% of the observations are likely to be found, and the other the region where 95% of the trends (from repeated experiments) would be expected to occur. A key point is that the variation in the population of forests does not depend on how many samples are taken; a given proportion of forest would be a bit smaller (or much smaller) than average, and another proportion would be a bit larger (or much larger) than average. That variation does not change as the number of forests are sampled from the same landscape of forests. A sample of 24 forests produces about the same light‐shaded band as a sample of 71 forests, but the confidence warranted in the trend is tighter when based on a larger number of samples (the dark bands).
FIGURE D Rates of wood growth for lodgepole pine forests in Yellowstone National Park, Wyoming, USA rise quickly as new forests develop after fires, and then decline more slowly. The left graph shows that confidence in the average trend is warranted within the dark 95% confidence band. The points are dispersed around that average trend, and the lighter band covers the domain where about 95% of the observations would occur. The graph on the right used only a subset of 24 of the plots, and the average trend is similar, but the smaller number of sampled stands leads to a wider 95% confidence band (the darker band) for the trend compared to the full dataset on the left. The light blue band represents where 95% of the observations would be expected to fall, and the breadth of that band is quite similar between the two sampling intensities
(Source: based on data from Kashian et al. 2013; see also Figure 9.11).
Larger numbers of samples reduce the uncertainty about average trends, but not about the level of variability among forests across a landscape.
The Stories in This Book Have Two Pieces, Told in Three Ways
The subject of forest ecology combines two different types of pieces: information (or evidence) about important details, and frameworks for how to knit pieces of information into understanding how forests work. The framework described above repeats throughout the book, along with many case studies and experiments that fill in information. This two‐piece approach shows up in three complementary ways. The section headings state the key points in each chapter; these headings could be grouped together for a simple overview for each chapter. The text of each chapter lays out the information and framework in detail, while the figures reinforce the headings and text with a third dimension of images and graphs (with detailed captions). Each of these three ways contributes to understanding forest ecology, developing a foundation to be built upon with further conversations, with readings of other books and journals, and especially with curious explorations in forests and across landscapes.
Forests Are Complex Systems That Are Not Tightly Determined
A core idea in this book is that forests are indescribably complex systems, with an uncountable number of interacting pieces under the influence of external driving factors. Simple stories cannot provide high value for specific cases, because the future development