Phenology metrics outputs (e.g., SOS, POS, EOS) may not be for every single pixel identified. Usually, that is the case when no pronounced phenology curve is detected during a year, e.g., for ever-green vegetation, or when the pixel is dominated by a non-vegetated surface. Hence, when the temporal profile does not fulfill the requirements of identifying a clear growth curve (increase and decrease over time), no SOS, PEOS, and EOS will be identified which will lead to empty output pixels. As a result, the output map will lead to a speckled appearance. While for non-vegetated surfaces no phenology metrics will be derived, failed detection can also occur for pixels within-fields when the phenology curve is not sufficiently pronounced.
Hence, a speckled appearance may appear that would benefit from post-processing. For those situations, a solution may be to apply a spatial interpolation. Spatial interpolation can be simply classical interpolators, i.e.: linear, nearest neighbour, natural, or cubic interpolation. As such, it will lead to a spatially smooth, filled map, however, note that it is a cosmetic solution, and the filled numbers may not necessarily reflect reality.
Phenology metrics outputs (e.g., SOS, POS, EOS) may not be for every single pixel identified. Usually, that is the case when no pronounced phenology curve is detected during a year, e.g., for ever-green vegetation, or when the pixel is dominated by a non-vegetated surface. Hence, when the temporal profile does not fulfill the requirements of identifying a clear growth curve (increase and decrease over time), no SOS, PEOS, and EOS will be identified which will lead to empty output pixels. As a result, the output map will lead to a speckled appearance. While for non-vegetated surfaces no phenology metrics will be derived, failed detection can also occur for pixels within-fields when the phenology curve is not sufficiently pronounced.
Hence, a speckled appearance may appear that would benefit from post-processing. For those situations, a solution may be to apply a spatial interpolation. Spatial interpolation can be simply classical interpolators, i.e.: linear, nearest neighbour, natural, or cubic interpolation. As such, it will lead to a spatially smooth, filled map, however, note that it is a cosmetic solution, and the filled numbers may not necessarily reflect reality.