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Modeling emergence of sterile oat (Avena sterilis ssp. ludoviciana) under semiarid conditions

Published online by Cambridge University Press:  15 February 2021

Carlos Sousa-Ortega*
Affiliation:
PhD Candidate, Departamento de Ciencias Agroforestales, Escuela Tecnica Superior de Ingenieria Agronomica, Universidad de Sevilla, Seville, Spain
Aritz Royo-Esnal
Affiliation:
Researcher, Departamento d’Hortofruticultura, Botànica i Jardineria, ETSEA, Agrotecnio, Universitat de Lleida, Lleida, Spain
Iñigo Loureiro
Affiliation:
Researcher, Department of Plant Protection, Instituto Nacional de Investigación y Tecnología Agraria y Alimentaria, Madrid, Spain
Ana I. Marí
Affiliation:
Reseacher, Department of Plant Health, Integrated Group Management, Centro de Investigación y Tecnología Agroalimentaria, Zaragoza, Spain
Juan A. Lezáun
Affiliation:
Researcher, Instituto Navarro de Tecnologías e Infraestructuras Agroalimentarias, Navarra, Spain
Fernando Cordero
Affiliation:
Researcher, Consejo Superior de Investigaciones Científicas, Toledo, Spain
Milagros Saavedra
Affiliation:
Researcher, Protección de Cultivos, Instituto Andaluz de Investigación y Formación Agraria, Pesquera, Alimentaria y de la Producción Ecológica (IFAPA), Cordoba, Spain
José A. Paramio
Affiliation:
Researcher, Asociación de Investigación para la Mejora del Cultivo de la Remolacha Azucarera (AIMCRA), Valladolid, Spain
José L. Fernández
Affiliation:
Researcher, ADAMA Agriculture España SA, Madrid, Spain
Joel Torra
Affiliation:
Researcher, Departamento d’Hortofruticultura, Botànica i Jardineria, ETSEA, Agrotecnio, Universitat de Lleida, Lleida, Spain
José M. Urbano
Affiliation:
Professor, Departamento de Ciencias Agroforestales, Escuela Tecnica Superior de Ingenieria Agronomica, Universidad de Sevilla, Seville, Spain
*
Author for correspondence: Carlos Sousa-Ortega, Departamento de Ciencias Agroforestales, ETSIA, Universidad de Sevilla, Seville, Spain. Email: [email protected]
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Abstract

Winter wild oat [Avena sterilis ssp. ludoviciana (Durieu) Gillet & Magne; referred to as A. sterilis here] is one of the major weed species of the Avena genus, given its high competitive ability to infest cereal crops worldwide, with special concern in Spain. A nine-location field experiment was established across Spain where a total of 400 A. sterilis seeds per location were sowed in four replicates in autumn 2016 to monitor the emergence during two growing seasons in dryland conditions. The data were used to test the prediction ability of previously published thermal (TT) and hydrothermal time (HTT) models and to develop new models, if required. Overall, the average percentage of emergence was 30% during the first season and 21% during the second season. In both seasons, the main emergence flush occurred between November and February. According to the phenological stage, A. sterilis achieved the tillering earlier in southern sites, between November 25 and the end of December, compared with northern sites, where this stage was reached at the end of January. The newly developed model described the emergence with precision, using three cardinal temperatures to estimate the TT. The three cardinal points were established at −1.0, 5.8, and 18.0 C for base (Tb), optimum (To), and ceiling temperature (Tc), while the base water potential (Ψb) was established at −0.2 MPa for the HTT estimation. This study contributes to improving prediction of the emergence of A. sterilis and provides knowledge for decision support systems (DSS) for the control of this weed.

Type
Research Article
Creative Commons
Creative Common License - CCCreative Common License - BY
This is an Open Access article, distributed under the terms of the Creative Commons Attribution licence (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted re-use, distribution, and reproduction in any medium, provided the original work is properly cited.
Copyright
© The Author(s), 2021. Published by Cambridge University Press on behalf of the Weed Science Society of America

Introduction

Wild oats (Avena spp.) are among the most widespread and concerning weeds in agriculture (Holm et al. Reference Holm, Plucknett, Pancho and Herberger1977). In Spain, Avena sp. are represented mainly by two species, spring or common wild oat (Avena fatua L.) and sterile or winter wild oat (Avena sterilis L.), the last with an accepted subspecies, Avena sterilis ssp. ludoviciana (Durieu) Gillet & Magne, referred to hereafter as A. sterilis. The most abundant taxon is A. sterilis, which is distributed in north and central Spain. Avena fatua infests wheat (Triticum aestivum L.) crops in the mountainous areas of northern Spain where winters are cold, while A. sterilis is more abundant in the warm central and southern regions of the Iberian Peninsula (Fernández-Quintanilla et al. Reference Fernández-Quintanilla, Navarrete, Torner, Sanchez Del Arco, Sans and Fernández-Quintanilla1997; García Baudín Reference García Baudín1982). These tall grasses are considered especially worrisome due to their strong competitive ability, reducing cereal crop yields between 10% and 60% (Bajwa et al. Reference Bajwa, Akhter, Iqbal, Peerzada, Hanif, Manalil, Hashim, Ali, Kebaso, Frimpong, Namubiru and Chauhan2017; Fernández-Quintanilla et al. Reference Fernández-Quintanilla, Navarrete, Torner, Sanchez Del Arco, Sans and Fernández-Quintanilla1997). This success of A. sterilis as a weedy species is explained, in part, by its high seed production, earlier shedding of seeds (Barroso et al. Reference Barroso, Navarrete, Sánchez del Arco, Fernandez-Quintanilla, Lutman, Perry and Hull2006), and the capacity of its seeds to remain dormant in the seedbank for several years (Bajwa et al. Reference Bajwa, Akhter, Iqbal, Peerzada, Hanif, Manalil, Hashim, Ali, Kebaso, Frimpong, Namubiru and Chauhan2017). Its fecundity can increase the soil seedbank from 100 seeds m−2 to more than 1,000 seeds m−2 in 2 yr in the absence of control methods (Gonzalez-Andujar and Bastida Reference Gonzalez-Andujar and Bastida2018).

Avena sterilis management has become difficult in recent years with the development of biotypes that are resistant to a large number of herbicides (Heap Reference Heap2020; Owen and Powles Reference Owen and Powles2009) and with the increase of no-tillage systems, as A. sterilis is adapted to different soil tillage systems (Alarcón et al. Reference Alarcón, Hernández-Plaza, Navarrete, Sánchez, Escudero, Hernanz, Sánchez-Giron and Sánchez2018). For this reason, some studies have been carried out to increase knowledge of this weed’s biology and thus improve integrated weed management (IWM) for its control. In this sense, phenological stages of this weed are relevant, as they determine its competitive periods (Knezevic and Datta Reference Knezevic and Datta2015) and the optimal moments for applying a certain control method (Royo-Esnal et al. Reference Royo-Esnal, Torra, Conesa and Recasens2012). For example, according to Owen and Powles (Reference Owen and Powles2009), to achieve effective control of Avena spp., and in this case for A. sterilis, chemical control must be applied in early growth stages.

Seedling emergence is part of the phenological growth process that happens in the early stages of the weeds life cycle, so biological knowledge of this event becomes essential for understanding a species’ behavior. This information is even more relevant for annual weeds and can contribute to improved IWM. The principal factors affecting seed germination and seedling emergence are temperature, water potential, air quality, and light (Forcella et al. Reference Forcella, Benech Arnold, Sanchez and Ghersa2000). Soil temperature can be used by itself to develop thermal time (TT) models, as the accumulation of daily thermal degrees (DTD) can be used to predict weed emergence. According to Bradford (Reference Bradford2002), TT is defined by three cardinal points that are different for each species. The first is the base temperature (T b), which is the temperature when the accumulation of DTD starts and below which no accumulation on DTD happens. Above T b, an increase in temperature produces more DTD accumulation until the optimal temperature (T o) is reached, which is the temperature when maximum DTD accumulation is produced. At temperatures greater than the T o, DTD accumulation decreases until reaching the ceiling temperature (T c), after which there is no DTD accumulation. TT models can be corrected to accumulate DTD only when there is enough soil moisture; such models are called hydrothermal time (HTT) models (Grundy Reference Grundy2003). The accumulation of daily hydrothermal degrees (DHD) for emergence models is considered to occur when the water potential (Ψ) is above a base water potential (Ψb) that varies with species and depends on their tolerance of soil aridity.

The first approach to modeling A. sterilis emergence was performed by Fernández-Quitanilla et al. (Reference Fernández-Quitanilla, Navarrete, Andujar, Fernandez and Sanchez1986), who related the emergence of this weed with the cumulative rainfall. Then, an HTT model was developed by Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005), using T b and Ψb as the only base parameters previously obtained from a growth chamber experiment (Fernández-Quintanilla et al. Reference Fernández-Quintanilla, Gonzalez-Andujar and Appleby1990), which were established at −0.8 C and at −1.2 MPa, respectively. Thus, the aim of this study is to check the precision of the developed model across 24 situations. Moreover, the development of a new model using the three cardinal thermal points is proposed as a second objective, in order to compare it with the previous model from Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005) and to consider whether the accuracy will be enhanced.

Material and Methods

Plant Material

Seeds of A. sterilis were collected from approximately 20 plants in July 2016 from a barley (Hordeum vulgare L.) field margin in Cubells, in the province of Lleida, Spain (41.85°N, 0.95°E). Seeds were cleaned and dry-stored in a refrigerator at 4 C until their distribution to the different participants of the experiment in September 2016. Once received, they were sown in the field during October 2016.

Experimental Design

The experiment was established in October 2016 at nine sites across Spain (Figure 1). At seven sites, the experiment was carried out during two growing seasons; while at the two remaining sites, the experiment was only conducted during the first year (Table 1). The emergence of A. sterilis was monitored under rainfed conditions in an attempt to simulate the cereal field conditions where this weed is a concern for farmers. The experiment followed a randomized block design where each location had four replications, which consisted of 0.25 m by 0.25 m quadrats. For each replicate, 6.25 L of soil was extracted, mixed with the 100 seeds, and then returned to the ground so that the seeds were evenly distributed in the upper 10 cm of the soil. An unseeded quadrat was established in each replication to check whether the natural A. sterilis populations would interfere with the results. Seedling emergence was recorded weekly with destructive counts from October until May, except during emergence flushes, when data were collected every 2 to 3 d. To observe the early growth under different environments, the first two emerged seedlings from each replicate were maintained in five northern and four southern sites and were allowed to grow until the end of December. Phenological stages of these seedlings were recorded based on the Biologische Bundesanstalt, Bundessortenamt and Chemical (BBCH) industry scale (Meier Reference Meier2001). Soil temperature at 2-cm depth and rainfall were recorded at each location using a digital thermometer DS18B20 (Maxim, San José, California, USA) and a pluviometer D2145 (Darrea, Llobregat, Spain) within the experimental area. The experimental design is accurately described in Sousa-Ortega et al. (Reference Sousa-Ortega, Chamber, Urbano, Izquierdo, Loureiro, Marí, Cordero, Vargas, Saavedra, Lezaun, Paramio, Fernández, Torra and Royo-Esnal2020a).

Figure 1. Locations within Spain where the experiments of Avena sterilis ssp. ludoviciana emergence were conducted during the 2016–2017 and 2017–2018 seasons.

Table 1. Location, sowing date, and soil texture for the nine experimental field sites established in Spain in 2016 to study Avena sterilis emergence.

a Location where the experiment was conducted only during 2016–2017 season.

In this paper, we define the cumulative emergence as the percentage of emerged seedlings from the total emerged seedlings by experimental location and year. Seedbank emergence is the percentage of emerged seedlings from the total seeds sown.

Evaluation of the Previously Published Model

The observed emergence was subjected to the model developed by Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005) for the emergence of A. sterilis. The TT [Equation 1] and HTT [Equation 2] models used are:

([1]) $${\rm{TT}}\,{\rm{model}}:Y = 1 - {e^{[ - log2*{{({{{\rm{TT}}} \over {344.3}})}^{2.09}}]}}$$
([2]) $${\rm{HTT}}\,{\rm{model}}:Y = 1 - {e^{[ - log2*{{({{{\rm{HTT}}} \over {207.7}})}^{1.53}}]}}$$

where Y is the cumulative emergence, TT is the thermal time, and HTT is the hydrothermal time. TT and HTT were calculated with the sum of DTD and DHD, respectively, following the equations:

$$\eqalign{ & {\rm{If}}{\mkern 1mu} T > - 0.{\rm{8C}}:{\mkern 1mu} {\mkern 1mu} {\mkern 1mu} {\mkern 1mu} {\rm{DTD}} = T - 0.{\rm{8C}} \cr & {\rm{If}}{\mkern 1mu} T < - 0.{\rm{8C}}:{\mkern 1mu} {\mkern 1mu} {\mkern 1mu} {\mkern 1mu} {\rm{DTD}} = {\rm{0}} \cr & {\rm{If}}{\mkern 1mu} \psi {\mkern 1mu} > - 1.2{\mkern 1mu} {\rm{MPa}}:{\mkern 1mu} {\mkern 1mu} {\mkern 1mu} {\mkern 1mu} {\rm{DHD}} = {\rm{DTD}} \cr & {\rm{If}}{\mkern 1mu} \psi {\mkern 1mu} < - 1.2{\mkern 1mu} {\rm{MPa}}:{\mkern 1mu} {\mkern 1mu} {\mkern 1mu} {\mkern 1mu} {\rm{DHD}} = {\rm{0}} \cr & \cr} $$

where T is the soil temperature in degrees Celsius and Ψ is the soil water potential in megapascals (MPa).

Development of the New Emergence Model

The three cardinal temperatures for TT, T b, T o, and T c, were estimated in a first step. These values were obtained through an iterative process, wherein different combinations of these cardinal temperatures were used to calculate the TT; then a nonlinear regression between TT and observed emergence was tested using three biological equations (Equations 35), and the cardinal temperatures combination with lower errors (root mean-square error [RMSE]; Equation 6) was selected. The second step was to estimate Ψ following a similar process that was carried out for estimating TT; in this case, different base water potentials (Ψb) were used with the combination of the best three cardinal temperatures previously selected to estimate the HTT.

TT and HTT were calculated by summing the DTD and DHD. In this work, the DTD and DHD were obtained following Bradford (Reference Bradford2002):

  • If the soil temperature was between T b and T o: DTD = TT b

  • If the soil temperature was between T o and T c: DTD = (TT b)*[1 − (TT b)/(T cT b)] and if T < T b or T > T c, then TT = 0

where T is the mean daily temperature.

DHD time was estimated by including soil moisture in the DTD calculations.

$${\rm{DHD }} = {\rm{DTD*(}}{\rm \Psi} - {\rm \Psi _{\rm{b}}})$$

where if Ψ < Ψb, then (Ψ − Ψb) = 0; if Ψ > Ψb, then (Ψ − Ψb) = 1.

As a first step to obtain Ψ, which was used in these equations, a water balance was performed, using the procedure defined in Fuentes-Yagüe and García-Legaspi (Reference Fuentes-Yagüe and García-Legaspi1999) to get the water content. Soil texture and organic matter content were used to estimate the water-holding capacity of the soil; then the water balance was calculated by summing the rainfall and estimating the evapotranspiration (obtained from the closet meteorological station). Once the water content was calculated, the water potential was estimated following the equations described in Saxton and Rawls (Reference Saxton and Rawls2006).

Thus, a reduction in DTD was established when the temperature was above T o, because a slight reduction between T o and T c better explains the biological consequences than a drastic reduction when the temperature is above T c. Moreover, as the three cardinal points were established by an iterative process using numerous combinations, an eventual result with similar values of T o and T c would suggest that this slight reduction in TT is not necessary.

The biological growth models tested in the nonlinear regression were: Gompertz [Equation 3], log-logistic [Equation 4], and Weibull [Equation 5] equations:

([3]) $$\!\!Y = 100\,*{e^{[ - {e^{( - k*{\rm{TT}} + b)}}]}}$$
([4]) $$Y = 100/[1 + {e^{^{( - k*{\rm{TT}} + b)}}}]$$
([5]) $$\ \ \ \ \ \ Y = 100*\{ 1 - {e^{[ - {e^{( - k)}}*{\rm{T}}{{\rm{T}}^b}]}}\} $$

where Y is the cumulative emergence, TT is the thermal time (HTT if this scale is used), and k and b are parameters obtained from the nonlinear regression. In the Gompertz and log-logistic equations, an increase in b represents a delay of the inflection point that represents 36% and 50% of weed emergence, respectively. An increase of the k parameter produces an increase in slope at the inflection point. On the other hand, in the Weibull equation, both parameters do not have biological meaning; they are simply shaping the emergence curve.

The accuracy of these models was tested with the RMSE [Equation 6], where greater model accuracy is indicated by lower RMSE values. Model accuracy was assessed using RMSE with the scale developed in Royo-Esnal et al. (Reference Royo-Esnal, Torra, Conesa and Recasens2010) to evaluate their artificial seedbank experiment. A model with an RMSE <5 has excellent accuracy, between 5 and 10 it has very good accuracy, between 10 and 15 it has good accuracy, and it is inaccurate for values >15.

([6]) ${\rm{RMSE}} = \sqrt {1/n\mathop \sum \limits_{i = 0}^n {{({x_i} - {y_i})}^2}} $

where x i represents the observed cumulative percentage emergence, y i is the predicted cumulative percentage of emergence, and n is the number of observations.

Model Validation

The selected model was applied to a seedling emergence data of an A. sterilis population collected from a wheat farm in Jerez (southern Spain) to evaluate its predictive ability. The independent data were obtained from a previous experiment that was carried out in two different sites, Tomejil (37.4023°N, 5.5893°W) and Sevilla ETSIA (same site described in Table 1), during two (2006 to 2007 and 2007 to 2008) and three (2005 to 2006, 2006 to 2007, and 2007 to 2008) growing seasons, respectively. The soil structure at Tomejil was 6% sand, 34% silt, and 60% clay.

At both locations, four replications of 200 seeds of A. sterilis were sown each growing season, following the same procedure described earlier. Each year, newly sown plots were placed next to those of the previous season, without disturbing the soil of the existing plots, and thus allowing recording the emerged seedlings from each plot during two growing seasons. DTD and DHD accumulation began at the date of the first relevant rainfall, and subsequent emergence data were then combined to produce eight different situations in which the model could be tested (Table 2). Climatic data for both sites were collected from the nearest weather station, and water potential was estimated using the same procedure described earlier.

Table 2. Location, sowing code, sowing date, date of the first relevant rainfall, and total number of Avena sterilis seedlings counted for each validation series.

a The code represents the year when sowing was performed and the year when the emergence was counted; i.e., the “S06YR07” code indicates that seeds were sown in 2005–2006 and that emergence was counted during 2006–2007.

b First relevant rainfall is the starting point for the accumulation of thermal and hydrothermal time.

c Sum of total emerged seedlings from four replications with 200 seeds planted in each replication for a total of 800 seeds planted at each location.

Seedbank Emergence

Differences in total seedling emergence among locations were analyzed with one-way ANOVA for each season. Differences among means were determined using Tukey’s test at P < 0.05. As was mentioned before, the seedbank emergence is referred to the percentage of total emerged seedlings from the total seeds sown, independent of seed viability. This is possible because, as only one population was used, the proportion of nonviable seeds is supposed to be the same among locations, and the observed differences could be explained by the different environmental conditions at each site. Moreover, no A. sterilis was recorded in the controls; therefore, the natural seedbank did not affect to the differences between locations.

Results and Discussion

Weather Conditions

The experimental sites had different weather conditions during both growing seasons (from October to April), providing robustness to the model. The mean temperature during the entire experiment was, as expected, higher in the experiment carried out in Sevilla (17.0 and 15.9 C for 2016 to 2017 and 2017 to 2018, respectively), while the coldest locations were Valladolid, Navarra, and Madrid, with mean monthly temperatures of 10.4, 10.6, and 11.8 C in 2016 to 2017 and 9.6, 9.5, and 10.9 C in 2017 to 2018, respectively (Table 3). With respect to precipitation, the average of total rainfall between October and April was 370.2 ± 40.4 mm in 2016 to 2017 and 386.6 ± 36.7 mm for 2017 to 2018. Although total rainfall was similar (only 16 mm of difference between the two seasons), autumn 2017 to 2018 was drier than in 2016 to 2017, especially at Zaragoza and Lleida, where 29.4 and 19.0 mm, respectively, were recorded from October to December (Table 4).

Table 3. Average monthly temperature for the nine different experimental sites from October to April during seasons 2016–2017 and 2017–2018, with average temperature of the emergence period also provided.

Table 4. Total monthly precipitation for the nine different experimental sites from October to April during seasons 2016–2017 and 2017–2018, with total precipitation for the emergence period also provided.

Emergence Pattern

The average seedbank emergence of A. sterilis was 30% in 2016 to 2017 and 21% in 2017 to 2018 (Table 5). Avena sterilis seedbank emergence in the first season was lower than for two other species that are of concern in wheat fields in Spain, rigid ryegrass (Lolium rigidum Gaudin; 58%) and North African knapweed (Centaurea diluta Aiton; 39%) (Sousa-Ortega et al. Reference Sousa-Ortega, Chamber, Urbano, Izquierdo, Loureiro, Marí, Cordero, Vargas, Saavedra, Lezaun, Paramio, Fernández, Torra and Royo-Esnal2020a, 2020b). The longer seed dormancy of A. sterilis, which can reach up to 5 yr (Bajwa et al. Reference Bajwa, Akhter, Iqbal, Peerzada, Hanif, Manalil, Hashim, Ali, Kebaso, Frimpong, Namubiru and Chauhan2017), might explain this result. For this reason, A. sterilis seedling emergence was higher during the second season, and thus seedbank reduction was less than for the other two weeds.

Table 5. Average percentage emergence (±SD) of Avena sterilis at nine experimental locations in Spain during seasons 2016–2017 and 2017–2018.

a Different letters show significant differences according to Tukey’s test (α = 0.05). Data for 2016–2017 were transformed (x 0.5) to meet requirements for ANOVA, but nontransformed means are shown.

Comparing seedbank emergence between locations, statistical differences were found in the first (P-value < 0.0001) and second seasons (P-value < 0.0001) (Table 5). The highest seedling emergence occurred at Zaragoza (64%), which was statistically similar to emergence at Lleida (45%), which was followed by Valladolid (40%), Madrid (35%), and Navarra (35%). Experimental sites with low seedling emergence were Cordoba (9.5%), Toledo (9.5%), and Sevilla ETSIA (8.5%) (Table 5). These results show a trend of increased A. sterilis emergence at cooler locations, which agrees with findings reported by Fernández-Quintanilla et al. (Reference Fernández-Quintanilla, Gonzalez-Andujar and Appleby1990), who observed that under controlled conditions, a higher proportion of A. sterilis seeds germinated when average temperatures were below 10 C than when temperatures were above 10 C and that germination was severely reduced with temperatures above 30 C. In the second growing season, emergence was greatest at Sevilla 2H (50.0%) compared with all other locations (7.3% to 26.5%) (Table 5).

Emergence of A. sterilis most frequently occurred between November and February after a daily average temperature below 9 C occurred, similar to what was observed by Aibar et al. (Reference Aibar, Ochoa and Zaragoza1991). In Zaragoza in 2017 to 2018, the dry autumn delayed the onset of emergence until February. At northern locations, most seedlings emerged in a main flush during this period; in contrast, at southern locations (Sevilla and Córdoba) during both seasons and in Lleida in 2016 to 2017, two flushes were observed; a larger flush occurred between November and January and a smaller flush occurred at the end of February. The lack of precipitation in midwinter (January and February) may have prevented seedlings from emerging in these locations.

Phenology and Early Growth

In the southern locations, A. sterilis reached the tillering stage between November 25 and the end of December, from 48 to 79 d after sowing. In the northern locations, this stage occurred later, at the end of January (between 102 and 112 d after sowing), with the exception of Zaragoza, where it occurred in mid-December (64 d after sowing). Chemical control methods applied to weeds at early phenological stages result in higher control efficacies than at later stages. This becomes even more evident with herbicide-resistant populations (Moss et al. Reference Moss, Hughes, Blair and Clarke2001). For this reason, the parameterization of our results can help determine these application timings. The relationship of the seedling emergence pattern with the phenological stage demonstrates that the best time to perform a chemical control in southern locations is when the emergence percentages rise to about 70% of total emergence. Tillering of the first A. sterilis seedlings starts when 80% of seedlings have emerged, and these more advanced individuals could escape control by herbicides. On the other hand, in northern locations, the best timing for chemical control would be when 80% of total seedling emergence is achieved, because phenological development is slower due to colder temperatures, and tillering is delayed, allowing for control of a higher percentage of emerged weeds (Figure 2).

Figure 2. Phenological stages of the first emerged seedlings of Avena sterilis ssp. ludoviciana using the BBCH scale, during the 2016–2017 season. Vertical dotted lines indicate 70%, 80%, and 90% emergence at each test location.

Accuracy of the Previously Published and New Models

The Weibull function, with an average RMSE value of 11.8, described the A. sterilis emergence slightly better than the Gompertz (RMSE = 11.9) or log-logistic (RMSE = 12.3) equations. For the TT model, the parameter values were established at 8.50 for k and 1.54 for b; while the parameters for the HTT model were set at 7.44 and 1.51 for k and b, respectively. The biological parameters to calculate the TT and HTT used in the new models were −1.0, 6.6, and 18.0 C for T b, T o, and T c, respectively, while the Ψb was established at −0.2 MPa. The T b obtained in this experiment is close to the −0.8 C established by Fernández-Quintanilla et al. (Reference Fernández-Quintanilla, Gonzalez-Andujar and Appleby1990) under growth chamber conditions. However, substantial differences were found for T o and T c, which were lower than those established in growth chamber experiments by Fernández-Quintanilla et al. (Reference Fernández-Quintanilla, Gonzalez-Andujar and Appleby1990) and by Üremİs and Uygur (Reference Üremİs and Uygur1999), which set them at 10 and 30 C, respectively. On the other hand, with a Ψb of −0.2 MPa A. sterilis showed higher dependence on soil moisture than other winter weeds, such as ripgut brome (Bromus diandrus Roth) (−1.3 MPa) or C. diluta (−0.5 MPa) (García et al. Reference García, Recasens, Forcella, Torra and Royo-Esnal2013; Sousa-Ortega et al. Reference Sousa-Ortega, Royo-Esnal, DiTommaso, Izquierdo, Loureiro, Marí, Cordero, Vargas, Saavedra, Paramio, Fernández, Torra and Urbano2020b). Moreover, the established Ψb in the new model is considerably high compared with that obtained by Fernández-Quintanilla et al. (Reference Fernández-Quintanilla, Gonzalez-Andujar and Appleby1990), who established it at −1.2 MPa.

The new model, with average RMSE values across locations of 15.4 and 13.4 for TT and HTT models, was more accurate than the model developed by Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005) (Table 6; Figures 3 and 4). The new model (TT or HTT) showed higher accuracy (lowest RMSE values) in 13 of 16 environments (site and season) compared with the previous model (Table 6). In contrast, the fit for the Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005) models was worse than expected, having an average RMSE value of 30.0 for the TT model, with only two locations having an RSME less than 15. The fit for the HTT was even poorer, with an average RMSE value of 35.7 and one only location where RMSE was less than 15. Inclusion of soil moisture data did not improve the accuracy of the model from Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005), but it did improve the accuracy of the newly developed model. The average RMSE was reduced by two points, and the sites showing very good accuracy (RMSE = 5 to 10) increased from five to seven, the number of sites with good accuracy (RMSE = 10 to 15) was maintained, and the number of sites with unsuccessful accuracy (RMSE >15) was reduced from five to three. Greatest accuracy improvement due to the inclusion of soil moisture was observed in Lleida 2017 to 2018 and Zaragoza 2016 to 2017, where RMSE was reduced from 38.2 and 27.1 to 10.0 and 14.9, respectively. The HTT model successfully described the emergence pattern of A. sterilis at all locations, with the exception of the 2017 to 2018 locations in Cordoba, Madrid, and Zaragoza (Table 6; Figures 3 and 4). The lack of accuracy was especially relevant at Zaragoza, where the model obtained an RMSE value of 37.5 (Table 4). These results may be explained due to bad setting of the starting point for TT and HTT accumulation. Despite the fact that the first relevant rainfall was registered on January 6, the availability of water by the seeds was delayed for 3 wk until the temperatures were above 0 C, because the water reserves were frozen. If this moment is taken as the starting point, the accuracy of the new model increases from 27.4 and 37.5 RMSE values to 9.6 and 9.2 for TT and HTT, respectively. In addition, the model developed by Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005) had a similar response, dropping from 11.3 to 5.3 for the TT model and from 25.5 to 9.2 for the HTT model.

Table 6. Root mean-square error (RMSE) values obtained from thermal (TT) and hydrothermal (HTT) time of models developed by Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005) compared with those of the new model at each experimental site during seasons 2016 to 2017 and 2017 to 2018.a

a Bold indicates the lowest RMSE value in each site and season among the four models.

Figure 3. Predicted emergence of Avena sterilis ssp. ludoviciana grown in 16 environments using the thermal model designed by Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005) [Y = 100{1 – exp[−log(2)*(TT/344.3)2.09]}] (dotted line) and the new thermal time model [Y = 100{1 – exp[−exp(−8.50)(TT)1.54]}] (solid line). Observed seedling emergence is shown by the black dots.

Figure 4. Predicted emergence of Avena sterilis ssp. ludoviciana grown in 16 environments using the hydrothermal model designed by Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005) [Y = 100{1 – exp[−log(2)*(HTT/207.7)1.53]}] (dotted line) and the new hydrothermal time model [Y = 100{1 – exp[−exp(−7.44)(HTT)1.51]}] (solid line). Observed seedling emergence is shown by the black dots.

Data Validation with Independent Data

The improvements in accuracy occurring with the new models were expected, as these models were developed using the data collected for this experiment. For this reason, to perform a fair comparison, the models were subjected to independent data.

Weather conditions between November and April at the experimental sites used for data validation, Tomejil and Sevilla ETSIA, ranged from 17.6 to 20 C for the hottest monthly temperatures and 7.1 to 9.6 C for the coldest monthly temperatures during the 3 yr. On the other hand, precipitation during 2005 to 2006 and 2006 to 2007 was a typical rainfall distribution occurring under Mediterranean environments, with precipitation mainly occurring during autumn (Romero et al. Reference Romero, Guijarro, Ramis and Alonso1998), while autumn in 2007 to 2008 was very dry, almost without any rainfall from October until February (Table 7).

Table 7. Average monthly temperature and rainfall accumulation at the independent locations during the seasons 2005–2006, 2006–2007, and 2007–2008.

Again, the new models improved the accuracy of the emergence description compared with those obtained using the Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005) models (Table 8; Figures 5 and 6). In this validation process, the new model (TT or HTT) showed the lowest RMSE values in five out of eight experimental conditions (site and season) compared with the older model (Table 8). The RMSE averaged 16.3 and 18.0, respectively, for the new TT and HTT models, while these values were higher (24.9 and 23.9) for the Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005) models. However, in this case, the HTT model did not improve the accuracy of the TT. These results could be explained by the dry autumn that occurred at Tomejil and Sevilla ETSIA in 2008, which would have prevented the HTT model from achieving 100% emergence. Maybe the observed emergence was not the full emergence, as it would be if there had been not moisture limitation, as the HTT model suggested. In contrast, the HTT model worked better in 2005 to 2006, when it improved the prediction from 11.1 to 6.7 (Table 8; Figures 5 and 6).

Table 8. Root mean-square error (RMSE) values obtained from thermal (TT) and hydrothermal (HTT) time of models developed by Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005) compared with those of the new model for independent data collected at eight environments.a

a See Table 2 for explanation of location and sowing codes. Bold indicates the lowest RMSE value in each site and season among the four models.

Figure 5. Predicted emergence of Avena sterilis ssp. ludoviciana based on independent data from eight environments using new thermal time model [Y = 100{1 – exp[−exp(−8.50)(TT)1.54]}] (solid line) and the thermal model designed by Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005) [Y = 100{1 – exp[−log(2)*(TT/344.3)2.09]}] (dotted line). Observed seedling emergence is shown by the black dots.

Figure 6. Predicted emergence of Avena sterilis spp. ludoviciana based on independent data from eight environments using new hydrothermal time model [Y = 100{1 – exp[−exp(−7.44)(HTT)1.51]}] (solid line) and the hydrothermal model designed by Leguizamón et al. (Reference Leguizamón, Fernandez-Quintanilla, Barroso and Gonzalez-Andujar2005) [Y = 100{1 – exp[−log(2)*(HTT/207.7)1.53]}] (dotted line). Observed seedling emergence is shown by the black dots.

Based on the equations of the newly developed models, the inclusion of a T c and a reduction of the period between T o and T c was required for the improvement of the emergence models of this species. Similar results were observed for L. rigidum (Sousa-Ortega et al. Reference Sousa-Ortega, Chamber, Urbano, Izquierdo, Loureiro, Marí, Cordero, Vargas, Saavedra, Lezaun, Paramio, Fernández, Torra and Royo-Esnal2020a) and C. diluta (Sousa-Ortega et al. Reference Sousa-Ortega, Royo-Esnal, DiTommaso, Izquierdo, Loureiro, Marí, Cordero, Vargas, Saavedra, Paramio, Fernández, Torra and Urbano2020b), which demonstrates there is potential for improving the accuracy of the models in future research.

The emergence of A. sterilis has effectively been described with a wide experiment including nine locations, developed and evaluated in 16 environments, and validated under 8 additional environments. Overall, the mean seedbank emergence for all environments was 30% during the first season and 21% during the second season (Table 5). In both seasons, the main emergence flush occurred between November and February. According to the phenological stage, A. sterilis achieved tillering earlier in southern sites, between November 25 and the end of December, whereas this stage was reached at the end of January in northern sites. We proposed therefore propose that chemical control methods should be applied when cumulated emergence is 70% (158 hydrothermal degrees) in southern locations and 80% (192 hydrothermal degrees) in northern locations. The new model (TT and HTT) was found to be more accurate than the previously published model, showing higher accuracies in 18 out of 24 scenarios. Moreover, it demonstrated the need of including a T c, which avoids DTD accumulation when the temperature is above 18 C, for modeling the emergence of this weed. According to Royo-Esnal et al. (Reference Royo-Esnal, Torra, Conesa and Recasens2010), who indicated that a model presents a good predictive capability when the RMSE is lower than 15, the new HTT model described with good precision the emergence of A. sterilis in 18 of 24 environments, including four independent experiments, and failure occurred only in very dry seasons, when the TT model was more accurate. Improvements in understanding this behavior under low moisture conditions is needed to improve understanding of the emergence biology of A. sterilis. Moreover, the lack of a successful description in six environments suggests the need to continue to adjust these models to achieve satisfactory results at more sites.

Acknowledgments

We would like to thank first the funding institutions, Cátedra Adama and the Spanish Weed Science Society (SEMh), with special mention of Cátedra Adama, which financed the article publishing charges. Also, JT acknowledges support from the Spanish Ministry of Science, Innovation and Universities (grant Ramon y Cajal RYC2018-023866-I). We also want to thank the students and the technicians that have helped with the fieldwork for this experiment in different sites, without whose help data collection would have been more difficult. No conflicts of interest have been declared.

Footnotes

Associate Editor: Debalin Sarangi, University of Minnesota

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Figure 0

Figure 1. Locations within Spain where the experiments of Avena sterilis ssp. ludoviciana emergence were conducted during the 2016–2017 and 2017–2018 seasons.

Figure 1

Table 1. Location, sowing date, and soil texture for the nine experimental field sites established in Spain in 2016 to study Avena sterilis emergence.

Figure 2

Table 2. Location, sowing code, sowing date, date of the first relevant rainfall, and total number of Avena sterilis seedlings counted for each validation series.

Figure 3

Table 3. Average monthly temperature for the nine different experimental sites from October to April during seasons 2016–2017 and 2017–2018, with average temperature of the emergence period also provided.

Figure 4

Table 4. Total monthly precipitation for the nine different experimental sites from October to April during seasons 2016–2017 and 2017–2018, with total precipitation for the emergence period also provided.

Figure 5

Table 5. Average percentage emergence (±SD) of Avena sterilis at nine experimental locations in Spain during seasons 2016–2017 and 2017–2018.

Figure 6

Figure 2. Phenological stages of the first emerged seedlings of Avena sterilis ssp. ludoviciana using the BBCH scale, during the 2016–2017 season. Vertical dotted lines indicate 70%, 80%, and 90% emergence at each test location.

Figure 7

Table 6. Root mean-square error (RMSE) values obtained from thermal (TT) and hydrothermal (HTT) time of models developed by Leguizamón et al. (2005) compared with those of the new model at each experimental site during seasons 2016 to 2017 and 2017 to 2018.a

Figure 8

Figure 3. Predicted emergence of Avena sterilis ssp. ludoviciana grown in 16 environments using the thermal model designed by Leguizamón et al. (2005) [Y = 100{1 – exp[−log(2)*(TT/344.3)2.09]}] (dotted line) and the new thermal time model [Y = 100{1 – exp[−exp(−8.50)(TT)1.54]}] (solid line). Observed seedling emergence is shown by the black dots.

Figure 9

Figure 4. Predicted emergence of Avena sterilis ssp. ludoviciana grown in 16 environments using the hydrothermal model designed by Leguizamón et al. (2005) [Y = 100{1 – exp[−log(2)*(HTT/207.7)1.53]}] (dotted line) and the new hydrothermal time model [Y = 100{1 – exp[−exp(−7.44)(HTT)1.51]}] (solid line). Observed seedling emergence is shown by the black dots.

Figure 10

Table 7. Average monthly temperature and rainfall accumulation at the independent locations during the seasons 2005–2006, 2006–2007, and 2007–2008.

Figure 11

Table 8. Root mean-square error (RMSE) values obtained from thermal (TT) and hydrothermal (HTT) time of models developed by Leguizamón et al. (2005) compared with those of the new model for independent data collected at eight environments.a

Figure 12

Figure 5. Predicted emergence of Avena sterilis ssp. ludoviciana based on independent data from eight environments using new thermal time model [Y = 100{1 – exp[−exp(−8.50)(TT)1.54]}] (solid line) and the thermal model designed by Leguizamón et al. (2005) [Y = 100{1 – exp[−log(2)*(TT/344.3)2.09]}] (dotted line). Observed seedling emergence is shown by the black dots.

Figure 13

Figure 6. Predicted emergence of Avena sterilis spp. ludoviciana based on independent data from eight environments using new hydrothermal time model [Y = 100{1 – exp[−exp(−7.44)(HTT)1.51]}] (solid line) and the hydrothermal model designed by Leguizamón et al. (2005) [Y = 100{1 – exp[−log(2)*(HTT/207.7)1.53]}] (dotted line). Observed seedling emergence is shown by the black dots.