Field survey data.

Field survey data were used as the training data to calibrate statistical models describing relationship between remote sensing parameters and vegetation cover. We positioned the sample plots with GPS and designed sample plots referring to topographic map and vegetation chart. The size of samples plots matched with the spatial resolution of remote sensing images perfectly, which was 30×30m². We collected 24 shrub sample plots and 6 grassland sample plots with 3 quadrats at each sample plot, including 90 quadrats in total. Specific permission was not required for all the sample plots and for the sampling activities. The field study activities did not involve any endangered or protected species.

In grassland sample plots, we selected a 1×1m² quadrat randomly and took photos vertically with a digital camera. After geometric correction, enhancement processing, color space transformation and classification, the grassland fractional cover of each photo was extracted. For each plot, we calculated the arithmetic mean of vegetation cover from all quadrats to acquire the fractional cover. Coverage data in quadrats were then transformed to data in sample plots on surface. In shrub sample plots, we utilized line-intercept method, which involved two objectives: ①put three survey lines with 30m long at each sample plot, pulled the measure tape tight along the survey lines, calculated the fractional cover by dividing the length of tape that was intercepted by plants by the total tape length; ②selected three grassland quadrats of 1×1m², collected grassland coverage using the same protocol as used in grassland sample plots. Sum of the two was the vegetation coverage in shrub sample plots.

Remote Sensing Data Acquisition and Pre-processing.

A Landsat-5 TM image and a HJ-1B image were acquired in this study. We acquired cloud-free TM image with a relatively high spatial resolution (30m) was on August 7, 2011. The image provided by the small satellites constellation of environment and disaster monitoring and forecasting in China was obtained on July 30, 2011 with the CCD camera fixed on HJ-1B satellite and its spatial resolution was 30m.

The images were Level 1T products with primary precision and terrain correction. Geometric correction was necessary for TM image and HJ-1B image by different radiometric correction models according to the topographic map of study site.

(1) For TM image, we converted the DN (digital number) value to radiance using Eq (1) to eliminate the sunshine difference in multispectral images. (1) where L_max and L_min are the spectrum radiance values when the DN values a 255 and 1 respectively, which can be obtained from Internet (http://landsat.usgs.gov/science_L5_cpf.php).

We input the parameters obtained from atmospheric correction which was conducted with 6S model into atmospheric correction Eq (2) and got the atmospheric correction results image. (2) where i = 1,2,3,4,5,7, which represents the wave band of TM images; L is the radiance after radiometric calibration; xa, xb and xc are atmospheric correction parameters in 6S model.

(2) For HJ-1B image, satellite image was calibrated with the radiometric calibration equation which could transform the DN image of HJ-1B satellite acquired from China Centre for Resources Satellite Data and Application. (3) where L is radiance value, 1/a is the gain of absolute calibration coefficient, L₀ is offset. The unit of transformed radiance value is W·m^-2·sr^-1·um^-1

Conducted by radiative transfer model codes of MODTRAN4+(Moderate Resolution Atmospheric Transmission),we used the FLAASH atmospheric correction module in ENVI to compensate for the effects of atmosphere, sunlight, etc. on surface features reflection, so as to restore the surface reflectance of surface features from images and then obtained the atmospheric corrected image.

Processing steps of the study.

Based on TM image and HJ-1B image, we estimated the fractional vegetation cover in study site with LSMM and improved SELSMM respectively. The major processing is shown in Fig 2. The study incorporated three sections: 1) select endmembers from images which have been processed with PPI method to ensure that the pixels participating in spectral unmixing are purer; 2) extract vegetation coverage information in study site from TM image and HJ-1B image with improved SELSMM and compare it with the estimation result of LSMM; and 3) quantify the accuracy of the results estimated with different models based on the two kinds of images using field measured coverage in the same period.

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Fig 2. Major processing steps in study.

https://doi.org/10.1371/journal.pone.0124608.g002

Spectral Unmixing.

Selection of Endmembers: In the procedure of spectral unmixing, it must be sure that the selected endmembers can represent the spectral information of all land cover components truly and objectively, so that the result will have a high accuracy. The number of endmembers is constrained by the dimensionality of satellite imagery. More endmembers can interpret more spectral heterogeneity and then improve applicability of the model. However, too many endmembers will make model more sensitive to endmember selection and then the universality of model will be reduced. So, it is critical to determine the balance between number of endmembers and the overall optimization of the model. In this study, we selected endmembers by calculating PP). First, we minimum noise fraction (MNF) transformed the images to reduce the spectral dimensionality so that the major information and noise could be abstracted and the redundancy of data and correlation among wave bands could be reduced. On such basis, we could determine the candidate endmembers through analyzing PPI. We connect MNF transformation with PPI using the n-Dimensional Visualization tool to apply n-dimensional visualization analysis and extract the spectral information of all components [34]. In this study, we just need fractional vegetation cover, so it is unnecessary to classify non-vegetation features. V-I-S model (Vegetation-Impervious Surface-Soil model) was adopted to identify the surface components and spectral reflectivity curve of endmembers for spectral unmixing [34].

Linear Spectral Mixture: Model. Each pixel in a remote sensing image can be composed of a finite number of dominant components which have relatively contribution to the spectral information collected by remote sensing sensor. The remote sensing information of every pixel can be unmixed into several components and those components constitute the remote sensing information of the pixel through a linear combination. Therefore, linear unmixing can be conducted on remote sensing information to build a pixel mixture model for estimation of vegetation coverage. LSMM is the most common model for unmixing of mixed pixel, which is defined as that the reflectance of a pixel on a certain spectral band (brightness value) is the linear combination of reflectance of the basic components (Endmember) with their proportions in total area of the pixel as the weight coefficients [35]. The model (Eq (4)) and its constraint conditions (Eq (5) and Eq (6)) are shown below: (4) (5) (6) where R_Li is the spectral reflectance of pixel i on wave band L; α_ij is the proportional value of the basic component j of pixel I; C_Lj is the spectral reflectivity of basic component j on wave band L; n is the number of basic components of pixel i; ε_Li is the residual not explained by the linear model.

When calculating the proportions of basic components of image pixels, fully constrained linear spectral mixture model (FCLSMM) was chosen to make the fractional vegetation cover estimation with LSMM more accurate and reliable, that was to calculate α_ij with the constraints of minimum ε_Li, nonnegative α_ij and a sum of 1 for α_ij.

Improved Selective Endmember Linear Spectral Mixture Model: We built the SELSMM based on the theory that different pixels used different set of endmembers to decompose spectrum. The key of model was how to determine the endmembers comprised in each pixel. Through calculating the response value between reference endmember spectrum and actual pixel spectrum, we can judge the similarity degree of the two spectra. Taken the response value of a reference endmember as the spectral contribution value of the reference endmember to actual pixel so that it can participate in unmixing of mixed pixel, a SELSMM can be built 33]. The higher the response value between reference endmember spectrum and pixel spectrum is, the more similar the two spectras are and the more proportion the component which corresponds to the reference endmember has in the pixel. Therefore, an improved algorithm for selective endmember is developed. Normalization processing was conducted on the response value x_i between the endmember spectrum for comparing and spectrum of a certain pixel firstly. These response values will be mapped to the range from 0 to 1 through the proportional relationship of (x_i is response value between the endmember spectrum for comparing and spectrum of a certain pixel; m is the number of response values which participate in similarity degree comparison). Finally the proportion was proposed as the contribution value of endmember i to the pixel.

With the new calculating mean of contribution value, linear spectral unmixing can be conducted on selective endmember and then the estimation accuracy of the model can be enhanced.

(1)Through calculating the response value between the actual pixel spectrum and reference endmember spectrum, the spectral similarity between the two spectra can be derived, so it can be guaranteed that the reference endmember spectrum which is highly similar to the actual pixel spectrum will be selected. Response coefficient is obtained by dividing the covariance of the two spectra by the product of their variances. The spectrum response coefficient of a pixel can be represented as: (7) where C_Lj is the spectrum of reference endmember j on wave band L; R_Li is the spectrum of pixel i on wave band L; m is the number of spectral wave bands.

(2) Calculating and comparing the response values between different referential endmembers spectra and actual pixels spectra with Eq (8), the maximum response value (denoted r_max) and corresponding endmember spectrum vector (denoted A_max) can be obtained. As the reference endmember spectrum which is most similar to the pixel, A_max can be taken as the preferred endmember.

Setting a parameter X_j as the contribution value of a reference endmember A_j to mixed pixel R_i, the contribution of reference endmember A_max to mixed pixel R_max can be represented as X_max and the contribution of residual endmember (denoted R_Re) to R_i can be represented as: (8)

Combining the response value r_j of reference endmember to mixed pixel, X_j can be represented as: (9) (10) Then, the contribution of reference endmember A_max to mixed pixel R_max should be: (11) Replacing the X_max in Eq (8) with Eq (11), residual endmember R_Re can be represented as: (12)

A series of experiments indicated that as the selected endmember spectrum vectors are non-orthogonal, the identifying procedure may encounter end when R_Re meet the terminal conditions even after one iteration. So, we added an adjustment coefficient η and adjusted Eq (12) into the following pattern: (13) where η ranges from 0 to 1 and to some extent it influences the number of endmembers n within each pixel: when η is too large, the identifying procedure may encounter with just a few times of iteration of a pixel, while if η is too small, all endmembers will participate in the calculation and calculation of spectrum response value will become meaningless. According to many experiments, we demonstrated that 0.35 and 0.65 would be the appropriate values of η for Landsat TM images and HJ-1B images respectively.

(3) Replacing the R_i in Eq (8) with R_Re and conducting iteration on Eq (7) to Eq (13), the iteration will stop when a component of R_Re becomes negative or there is only a small variation of ΔR (Eq (14)) and then the number of endmembers (n) in the pixel and corresponding endmember spectrum can be determined. (14) where and are respectively the residual pixel spectrum after iterations of k+1 times and k times.

With above method, the number of endmembers in each pixel and corresponding endmember spectrum vectors can be determined. Together with FCLSMM, the content of every component of each pixel in an image can be obtained.

Fractional vegetation cover estimation.

We unmixed the mixed pixels of TM image and HJ-1B image respectively with LSMM and SELSMM and obtained the fractional vegetation cover in study site. To compare the estimated results based on different models and images facilitate, the fractional vegetation cover is classified into six categories, namely 0.0~0.2, 0.2~0.4, 0.4~0.6, 0.6~0.8, 0.8~1.0 and non-vegetation (Fig 3). We calculated the area of each category and obtained their percentages of the total area in study area (Table 1). Fig 3 shows that in study site, the region with fractional vegetation cover ranging from 0.0 to 0.2 is mostly in loess covered terrain with high altitude while the region with fractional vegetation cover ranging from 0.2 to 0.4 is the widest, which matches with the actual vegetation coverage situation in the study site. The region with fractional vegetation cover ranging from 0.4 to 0.6 distributed in the plain area along the river is mostly covered by farmland vegetation and artificial shrub, where the fractional vegetation cover is high. There is little region with fractional vegetation cover larger than 0.8. Region of non-vegetation is mainly water area such as rivers, lakes, reservoirs, etc. and area with impervious surface such as mines, cities, etc.

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Fig 3. Estimation results of fractional vegetation cover.

((a) fractional vegetation cover estimated with LSMM based on TM image; (b) fractional vegetation cover estimated with SELSMM based on TM image; (c) fractional vegetation cover with LSMM based on HJ-1B image; (4) fractional vegetation cover SELSMM based on HJ-1B image.)

https://doi.org/10.1371/journal.pone.0124608.g003

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Table 1. Proportions of the area of different fractional vegetation cover categories which is estimated based on different models and different images.

https://doi.org/10.1371/journal.pone.0124608.t001

The accuracy of fractional vegetation cover estimated by models was assessed through the field survey data. The size of random samples for collection of field measured coverage data is 30×30m² to match the spatial scale of field survey data to the spatial resolution of images. We extracted the estimated coverage corresponding to the spatial position of field survey data to conducted linear regression analysis with measured coverage data. The result shows that all optimal regression equations pass t-test of 0.05, which meet the statistical demand (p<0.05) with a significant correlation between estimated and field coverage data (Table 2). The samples do not show clear segregation by vegetation and converge to the 1:1 straight line (Fig 4). Therefore, fractional vegetation cover in study site can be extracted with LSMM and SELSMM based on TM image and HJ-1B image. For the unmixing results of a certain model, the overall accuracy of pixel unmixing based on TM image is higher than the results based on HJ-1B image. The RMSEs of the former are smaller than the latter; In the linear regression models which are built between the fractional vegetation cover estimated with a certain remote sensing model and field measured coverage, the R² of the estimation result based on TM image is larger than that based on HJ-1B image.

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Table 2. Accuracy of the fractional vegetation cover estimated with different models based on different images.

https://doi.org/10.1371/journal.pone.0124608.t002

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Fig 4. Relationship between estimated fractional vegetation cover with models and field survey data.

((a) result of linear regression analysis between vegetation coverage which is estimated with LSMM based on TM image and measured coverage; (b) result of linear regression analysis between vegetation coverage which is estimated with SELSMM based on TM image and measured coverage; (c) result of linear regression analysis between vegetation coverage which is estimated with LSMM based on HJ-1B image and measured coverage; (d) result of linear regression analysis between vegetation coverage which is estimated with SELSMM based on HJ-1B image and measured coverage.)

https://doi.org/10.1371/journal.pone.0124608.g004

To compare the difference between the estimated coverage and measured coverage, we selected root mean square error (RMSE) criterion and coefficient of determination (R²) to evaluate estimation accuracy and the results are shown in Table 2. RMSE is used to assess the overall accuracy of mixture models and the coefficient of determination reflects the fitting degree between estimated and field survey data. (15) (16) where is the fractional vegetation cover estimated with models and f_i is the corresponding measured coverage; is the average value of estimated fractional vegetation cover; N is the number of samples for accuracy assessment.