Study area and crop model performance in simulating grain protein concentration

The long-term modelling developed in the present study was focused on Val d'Orcia (Central Italy, 43°02′N, 11°68′E, 320 m a.s.l.), where durum wheat is the most traditionally grown crop. The area has an average annual temperature of 13·6 °C and a cumulative precipitation of 715 mm. Wheat is grown in ‘Typic Ustorthents fine, mixed, calcareous, mesic’ soils (Soil Survey Staff 2014), moderately deep, weakly alkaline, with a silty–clay–loam texture.

The CERES-wheat simulation model (DSSAT-CSM version 4.0) used in the present study is a predictive and deterministic model, designed to simulate the effects of cultivar, crop management, weather and soil on crop growth, development and production (Ritchie & Otter Reference Ritchie, Otter and Willis1985). The model operates on a daily timestep and the minimum meteorological inputs include precipitation (mm), solar radiation (MJ/m²), and maximum and minimum air temperatures (°C) (Jones & Kiniry Reference Jones and Kiniry1986). The daily weather data for the period 1955–2011 were collected from six weather stations located in Val d'Orcia; Table 1 shows the main physical and chemical characteristics of the soil profile used to initialize the model.

Table 1. Main chemical and physical characteristics of soil from the study area, and input soil profile used to initialize the simulation model CERES-wheat

CEC, cation-exchange capacity; N, nitrogen.

In most wheat simulation models, including CERES-wheat, GPC is obtained as the result of independent functions for dry matter and N accumulation into the grain, with the latter predicted through estimating N uptake by plant and N distribution into grains. The model assumes that under optimal growing conditions, the rate and duration of starch deposition during grain filling are mainly determined by factors operating within or close to the grain itself, and are therefore sink-limited (Fischer et al. Reference Fischer, Aguilar and Laing1977). On the other hand, the rate and duration of protein deposition are determined by factors external to the grain and therefore are mainly source-limited (Jenner et al. Reference Jenner, Ugalde and Aspinall1991). The calculation of N uptake assumes limitation either by crop demand or by N availability. Therefore, N assimilation depends on N supply from the soil and on leaf area expansion, and thus on the leaf biomass able to store N and translocate it into the grain during grain filling. The source-limited assumption implies that grain protein accumulation depends on the N content of above-ground biomass at the beginning of the grain filling. In optimal conditions, N available in the biomass is translocated into the grain, and during grain filling the model simulates grain N based on sink size, which is a function of the daily rate of dry matter accumulation and the number of grains per plant.

The CERES-wheat model was previously calibrated and validated for winter durum wheat cvar Claudio, widespread in the study area, in a previous study (Dalla Marta et al. (Reference Dalla Marta, Orlando, Mancini, Guasconi, Motha, Qu and Orlandini2015). The crop productive potential and the timing of the phenological stages (Zadoks et al. Reference Zadoks, Chang and Konzak1974) were calibrated by the genetic coefficients of the ‘Winter-Europe’ genotype adjusted on the basis of the best fit between the simulated and measured yields and onset dates of the main crop stages (Dalla Marta et al. Reference Dalla Marta, Orlando, Mancini, Guasconi, Motha, Qu and Orlandini2015).

However, significant differences between ordinary and durum wheat have been observed in field studies in relation to the qualitative response of the crop in the Mediterranean environment. Cossani et al. (Reference Cossani, Slafer and Savin2011) observed on average 5 g/kg more grain maximum N concentration for cvar Claudio compared with ordinary wheat. Therefore, as a first step in the present study, the model routine for GPC was revised to make it more appropriate for modelling durum wheat and cvar. Claudio in particular, using the CERES-wheat outputs for biomass dry matter and N concentration. Building on the assumptions of the GPC sub-model, a new equation for GPC simulation was developed (Eqn (1)). This equation assumes that the total available N (TN) from the biomass is translocated into the grain and that its ratio with the grain N sink (NS) determines the N concentration. Hence,

(1) $${\rm GPC} = ({\rm TN/NS} \times 100) + 0 {\cdot} 5) \times 5 {\cdot} 7$$

where 0·5 is the additional factor due to the genetic difference between durum and ordinary wheat (Cossani et al. Reference Cossani, Slafer and Savin2011) and 5·7 is the conversion factor from grain N to protein content (Spratt Reference Spratt1979).

Total available nitrogen is the total N available for translocation from above-ground biomass into the grain at the beginning of grain filling. In this respect, leaves and stems are the most important N reserves in wheat; therefore in the current work plant straw was considered as the N source, disregarding any contribution from spikes and roots. Therefore, in Eqn (1), TN was computed as the total leaf and stem biomass (g DM/plant) multiplied by the appropriate N concentration simulated by the model. The biomass weight per hectare at the beginning of grain filling was converted into biomass per plant on the basis of an average plant density of 500 stems/m².

The size of the grain NS was computed as equal to the grain weight increase per plant simulated during the grain-filling stage, depending on the difference between the grain dry matter at the watery ripe stage and at the fully ripe stage (Weiss & Moreno-Sotomayer Reference Weiss and Moreno-Sotomayer2006).

The performance of the CERES-wheat model variants, i.e. with and without the new GPC equation, in terms of GPC prediction was evaluated by a correlation analysis between simulated and observed data (Table 2). The variety trials of the Regional Agency for Development and Innovation in the Agro-forestry Sector (ARSIA) supplied the crop data for model calibration. Data were available for 10 years (1998–2009) on one field per year. Once calibrated, CERES-wheat was validated using a dataset from field monitoring carried out by the Siena Provincial Agrarian Consortium (CAPSI) in collaboration with the Department of Agrifood Production and Environmental Sciences – University of Florence (DISPAA). The data were available over three growing seasons (2009–2011), for a total number of 20 fields (nine in 2009, seven in 2010 and four in 2011). The ARSIA and CAPSI datasets supplied information concerning crop management (e.g. sowing, plant density and fertilization plans), plant phenology and harvest (e.g. yield, grain humidity and GPC). The following fitting coefficients were calculated: root-mean-square error (RMSE; Fox Reference Fox1981; from 0 to +∞, optimum 0), relative root-mean-square error (RRMSE; Jørgensen et al. Reference Jørgensen, Kamp-Nielsen, Christensen, Windolf-Nielsen and Westergaard1986; from 0 to +∞, optimum 0), model efficiency (EF; Nash & Sutcliffe Reference Nash and Sutcliffe1970; from –∞ to 1, optimum 1; Eqn (2)) and the coefficient of residual mass (CRM; Loague & Green Reference Loague and Green1991; from –∞ to +∞, optimum 0; Eqn (3)):

(2) $${\rm \; EF} = 1 - \displaystyle{{\sum\nolimits_{i = 1}^n {{(S_i - M_i)}^2} {\rm \; }} \over {\sum\nolimits_{i = 1}^n {{(M_i - \bar M)}^2}}}$$

(3) $${\rm CRM} = \displaystyle{{\sum\nolimits_{i = 1}^n {M_i} - \sum\nolimits_{i = 1}^n {S_i} {\rm \; }} \over {\sum\nolimits_{i = 1}^n {M_i} }}$$

where S and M are the simulated and measured data, respectively.

Table 2. Performance of CERES-wheat crop model, with and without the new equation for simulation of grain protein concentration

RMSE, root-mean-square error; RRMSE, relative root-mean-square error; EF, model efficiency; CRM, coefficient of residual mass.

Development and validation of a simplified forecasting index for grain protein concentration

After assessment of the model performance in simulating GPC with the new equation, it was used for a long-term simulation aiming to identify the main variables affecting GPC in the CERES-wheat model. Following previous work carried out on yield simulation, the procedure described in Dalla Marta et al. (Reference Dalla Marta, Orlando, Mancini, Guasconi, Motha, Qu and Orlandini2015) was adopted for evaluating the impact of status (LAI) and forcing (weather indices) variables on GPC. Accordingly, using the model initialization described by Dalla Marta et al. (Reference Dalla Marta, Orlando, Mancini, Guasconi, Motha, Qu and Orlandini2015), CERES-wheat was run over the 56-year period from 1955 to 2011, with the new GPC equation. A correlation analysis was carried out, using the output of the long-term simulation (GPC and LAI) and the observed monthly weather indices (Table 3), in order to describe the relationship between GPC and both LAI and the weather indices. The values of the proposed prediction factors are calculated at the key crop growth stages of tillering, heading and grain filling, corresponding to stages 2, 5 and 7, respectively, of the Biologische Bundesanstalt, Bundessortenamt und Chemische Industrie (BBCH) phenological scale for cereals (Lancashire et al. Reference Lancashire, Bleiholder, Langeluddecke, Stauss, van den Boom, Weber and Witzen-Berger1991).

Table 3. Correlations between grain protein concentration, weather indices and plant LAI during the crop cycle

ns, not significant; MTMAX, monthly mean maximum temperature; MTMIN, monthly mean minimum temperature; WD, warm days (maximum temperature above monthly 56-years average); TP, monthly total precipitation; NR, days without rainfall; LAI, leaf area index.

A backward stepwise multiple regression (SPSS.18) was performed, with GPC as the dependent variable, and LAI and weather indices (Table 3) as prediction factors in order to develop a simplified forecasting index (SFIpro) for GPC, of the form described in Eqn (4):

(4) $$Y = \beta _0 + \beta _1 \times X_1 + \beta _2 \times X_2 + {\cdot\cdot\cdot} + \beta _n \times X_n$$

where Y is the GPC at harvest taken from each year of the long-term simulation output; β ₀ the intercept value; β ₁, β ₂, …, β _n the regression coefficients of the predictor variables X ₁, X ₂, …, X _n , respectively.

The SFIpro was validated against field data collected on ten fields per year during two growing seasons (2010 and 2011 harvests) in order to assess its potential as an operational tool and therefore to study the ability of CERES-wheat to determine the main variables affecting GPC. In monitored fields, different crop management were considered according to the agronomic practices commonly adopted by each farmer (Table 4). At harvest, ten samples were collected following an X scheme with two repetitions (i.e. five sampling points per field, one point in the centre and four points around the centre, forming a cross). Each sample consisted of plants collected from an area of 1 m². Grain moisture content was measured after oven-drying (105 °C for 24 h), the GPC and grain gluten concentration were determined with an Infratec System 1241 Grain Analyser (FOSS, Denmark), and the yield was recorded by a precision mini thresher. To better understand the model performances, a second validation of SFIpro was carried out separately on two groups of fields classified in terms of the LAI values during the heading stage (BBCH stage 5) (LAI5) recorded in field. Fields where crop LAI was in the II and III quartiles were grouped as intermediate LAI (LAIint) (1 ⩽ LAI5 ⩽ 2) (ten fields), and fields where crop LAI was in I and IV quartiles were grouped as extreme LAI (LAIext) (LAI5 < 1 and LAI5 > 2) (four and six fields, respectively). Fields belonging to the same growing season showed a heterogeneous distribution between LAIint and LAIext, indicating that LAI5 is affected both by the seasonal weather and by the different crop management adopted by each farmer.

Table 4. Sowing date and fertilizers applied during the growing seasons 2009–2010 and 2010–2011

DAS, days after sowing; P, phosphorus; N, nitrogen.

In order to investigate how SFIpro performance was related to different LAI and thus the relationship between GPC and LAI, correlation analyses between forecasted and observed GPC and between observed yield and observed GPC were performed separately for the LAIint and LAIext groups.