Are there hard and fast rules about which interpolation methods are suited to each kind of raster data?

  • 1
    What are you interpolating? Is the goal simply to visualize or to actually measure some type of distribution? Not to get your hopes up though, their are practically no hard or fast rules.
    – Andy W
    Oct 15, 2010 at 0:17
  • 4
    @ninesided: Are you sure you meant to indicate "raster" data? The answer you accepted refers solely to methods of interpolating vector (punctual and line) data.
    – whuber
    Oct 15, 2010 at 14:30
  • 5
    The title of the question is a little ambiguous. The words interpolation and resample mean two slightly different things. To interpolate is to take a sample of discrete data points (raster or vector) and compute a continuous surface from that. Resampling is taking a group of points (again, raster or vector), applying some sort of algorithm to them, and producing a new set of points. So, I believe interpolation can be viewed as one type of resampling.
    – Don Meltz
    Oct 15, 2010 at 15:43
  • 2
    Imho the title is wrong. "resampling raster data" makes me think that you have a raster and want to produce a new bigger/smaller raster from it. If you want to produce a raster by interpolating vector points "resampling" is the wrong term.
    – underdark
    Oct 15, 2010 at 17:20
  • 3
    @ninesided - Since you picked my response as the answer to your question, I assume you were looking to interpolate a set of discrete points to a continuous raster surface. The word resample is interpreted by most as a conversion of one raster into another, based on some algorithm. I don't think you're wrong to use the word because I believe interpolation is a form of resampling. It's just that most don't see it that way. I don't profess to be an expert in this area, so corrections to my assumtion are welcome.
    – Don Meltz
    Oct 15, 2010 at 17:53

4 Answers 4


A clarification to the question indicates that methods of resampling a raster are sought. Many are in use in imaging and photographic communities. For GIS work, though, several straightforward methods are in common use:

  • Nearest-neighbor resampling. Each cell in the new raster is assigned the value of the nearest cell (center to center) in the original raster. Use this for categorical data like land use and other classifications.

  • Bilinear interpolation. Each cell in the new raster is assigned an average based on the four nearest original cells. The averaging is linear in the horizontal and vertical directions. (The resulting formula, though, is not linear; it's actually quadratic.) This is good for general-purpose smoothing but the averaging that goes on typically clips local peaks and valleys a bit.

  • Cubic convolution. This is similar in spirit to bilinear interpolation but can slightly extrapolate values from nearby cells. It does so in a way intended to reproduce local averages and variability in the new grid; in particular, the clipping of local extrema should not be as severe. (One untoward consequence, evident as a bug in ESRI's ArcGIS, is that the values in the new grid may extend beyond the range of the old one, causing some of the new extremes not to be rendered correctly. But this is a matter of data display only.) The tradeoff is that cubic convolution takes a little more time to compute than bilinear interpolation.

I discuss the latter two methods in some detail at http://www.quantdec.com/SYSEN597/GTKAV/section9/map_algebra.htm

For quick one-off calculations I am usually content to perform bilinear interpolation (for continuous data) or nearest-neighbor interpolation (for categorical data). For all others, especially when preparing master datasets or when anticipating extensive manipulations, I recommend using cubic convolution (as well as giving some thought to ordering the operations to minimize propagation of floating point error).


According to ESRI the available interpolation methods (Available as tools in Spatial Analyst and other extensions) are compared as follows: (Quoting)

IDW (Inverse Distance Weighted) tool uses a method of interpolation that estimates cell values by averaging the values of sample data points in the neighborhood of each processing cell. The closer a point is to the center of the cell being estimated, the more influence, or weight, it has in the averaging process.

Kriging is an advanced geostatistical procedure that generates an estimated surface from a scattered set of points with z-values. More so than other interpolation methods supported by ArcGIS Spatial Analyst, a thorough investigation of the spatial behavior of the phenomenon represented by the z-values should be done before you select the best estimation method for generating the output surface.

Natural Neighbor interpolation finds the closest subset of input samples to a query point and applies weights to them based on proportionate areas to interpolate a value (Sibson, 1981). It is also known as Sibson or "area-stealing" interpolation.

The Spline tool uses an interpolation method that estimates values using a mathematical function that minimizes overall surface curvature, resulting in a smooth surface that passes exactly through the input points.

Spline with Barriers The Spline with Barriers tool uses a method similar to the technique used in the Spline tool, with the major difference being that this tool honors discontinuities encoded in both the input barriers and the input point data.

The Topo to Raster and Topo to Raster by File tools use an interpolation technique specifically designed to create a surface that more closely represents a natural drainage surface and better preserves both ridgelines and stream networks from input contour data.

The algorithm used is based on that of ANUDEM, developed by Hutchinson et al at the Australian National University.

Trend is a global polynomial interpolation that fits a smooth surface defined by a mathematical function (a polynomial) to the input sample points. The trend surface changes gradually and captures coarse-scale patterns in the data.

You could also take a look at this article: http://proceedings.esri.com/library/userconf/proc95/to100/p089.html

  • 1
    +1 for choosing something from the ESRI help to quote that actually makes sense and is correct!
    – whuber
    Oct 15, 2010 at 22:33
  • Could you update the link to the proceeding, the one you posted is no longer available (page not found). Alternatively, you could place a title or some information that would allow us to search for it at the ESRI page.
    – Renata Dis
    May 20, 2016 at 11:42

I agree there are no hard and fast rules, but there are some guidelines for various interpolation methods. For example, IDW is best when you have fairly dense points to begin with. Kriging is processor intensive, usually used in soil/geology modelling. Spline is usually used when a smooth surface is desired, e. g. temperature data Some methods keep the resulting raster passing through the original points while others do not.

Although it is ArcGIS centric, a good overview of the different methods can be found in the 4 page paper

Interpolating Surfaces in ArcGIS Spatial Analyst


Two other methods would be Average4 and Average16. They do what they sound like and take the average of either the 4 or 16 surrounding cells.

The use case here is mostly for DEM data. You wouldn't use it on a raster image (esp 3 band colour)

It's not distance weighted, but then I don't think I would use that for raster (just vector) since distance in a raster dataset is a bit more subjective

I always figured that Median4 and Median16 would be good ways to remove dips and spikes from DEM data, though I don't know of any packages that allow it.

  • 2
    Your suggestion to use neighborhood medians for screening local outliers in DEMs is a good one, Mark. ESRI's GRID/Spatial Analyst package has included neighborhood medians for a very long time, I know IDRISI can do it, and likely GRASS and Manifold too. But these method would be poor choices for resampling a grid. Likewise the other methods you mention would not have good properties: they effectively smooth the original data at the resolution of the original grid, and so shouldn't be considered for resampling at all.
    – whuber
    Oct 15, 2010 at 22:30

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