Site Description

Four field experiments were established at the Columbia Basin Agriculture Research Center (CBARC) (45.7196°N, 118.6235°W) in two consecutive years (2020 and 2021). The soil at CBARC was a Walla Walla silt loam (coarse-silty, mixed, superactive, mesic Typic Haploxerolls; 8% clay, 27% sand, and 65% silt) with 2.3% organic matter and a pH of 5.4. Average precipitation at CBARC is 420 mm yr⁻¹.

Model Development Experiment

In 2020, one experiment (hereafter referred as Site A) was established in a completely randomized block design with four replications. Each replication had 10 plots, each measuring 3 m by 4.5 m. Four hundred S. tragus seeds were sprinkled in the center of each plot on March 23, with 200 seeds (86% viability) spread in two separate 1 m² areas within each plot. Seeds came from S. tragus plants collected on October 2019 from a grower’s field south of Ione, OR (45.3867°N, −119.8436°W). Seeds were stored in paper bags at room temperature (20 to 25 C) until use. Seed germination was tested in germination chambers at constant temperature (25 C) and 12-h interval of light and darkness, arranged in five replicates with 25 seeds per replicate each year. Initially, petri dishes were set up with a filter paper and water was added as required later. Germination was recorded regularly until no further seeds germinated (the incubation period did not exceed 15 d). After S. tragus seeds were sprinkled, spring wheat (‘Ryan’) was planted on March 24 in the experimental area using a no-till drill (Great Plains 606NT, Salinas, KS, USA) with 25 cm of interrow space at a seeding rate of 120 kg ha⁻¹. The experimental area was fenced to prevent tumbleweed S. tragus plants from blowing across the research plots. Spring wheat fertilization was conducted following standard recommendations for the region (Wysocki et al. Reference Wysocki, Lutcher, Horneck, Hart and Petrie2007). The number of emerged seedlings was recorded every 15 d from April 7 until July 29. Data from the 10 plots per replicate were averaged, and the cumulative emergence percentage was calculated at the end of the season.

Model Validation Experiments

Also, in 2020 but in a no-till fallow field, one experiment (hereafter referred to as Site B) was conducted in a completely randomized block with four replications. Plot size was 3 m by 4.5 m. Salsola tragus seeds (from the same seed lot as those used in Site A) were sprinkled in the center of each plot in two 1 m² areas on March 5. In 2021, two experiments were conducted in fallow and spring wheat following the same experimental design and plot size as Sites A and B. Again, S. tragus seeds were sprinkled in the center of each plot in two 1 m² areas on March 13 in the fallow site (hereafter referred to as Site C) and on March 10 in the spring wheat site (hereafter referred to as Site D), at a seeding rate of 400 seeds (56% viability) per plot (200 seeds in each 1 m² area). Seeds came from S. tragus plants collected on October 2020 from a different grower’s field south of Ione, OR (45.4409°N, 119.8791°W). After S. tragus seeds were sprinkled, spring wheat (Ryan) was planted in Site C on March 11 using the same no-till drill described for Site A at a seeding rate of 120 kg ha⁻¹. Sites B, C, and D were fenced to prevent S. tragus plants from rolling across the experiments and dispersing seeds across the experimental area. Fertilization of spring wheat in Site D was conducted following standard recommendations for the region (Wysocki et al. Reference Wysocki, Lutcher, Horneck, Hart and Petrie2007). The number of emerged seedlings was recorded every 15 d in 2020, from March 31 to July 4 in site B, and weekly in 2021, from March 23 to July 13 in sites C and D, until no further seedlings were observed.

Soil Environmental Measures

Daily soil temperature and moisture were measured with 24 sensors per site located in a range of shallow soil depths varying from 0 up to 2.5 cm. Temperature was measured with calibrated thermistors, and water potential was measured with Decagon MPS6 water potential sensors (Meter Group, 2365 NE Hopkins Ct., Pullman, Washington 99163, US). Four sets of sensors (north, south, east, west) were established in each experimental site, with each set having two thermistors and four MPS6 sensors.

Soil temperature and water potential were used to calculate the hydrothermal time (θ _HT ), expressed as C · kPa · d (degrees Celsius × kilopascal × days), being a function of hydro time (θ _H = Ψ – Ψ _b ) (kPa) and thermal time (θ _T = T – T_b ) (C), where Ψ is daily average soil water potential, Ψ _b is base water potential for seed germination expressed in kPa, T is daily average temperature at the soil surface, and T_b is base temperature for seed germination expressed in C, according to Equation 1:

([1]) $${{\rm{\theta }}_{{{HT}}}} = {\rm{\;}}{{\rm{\theta }}_{{H}}} \cdot {{\rm{\theta }}_{{T}}}$$

where θ _H = 1 when Ψ > Ψ _b , otherwise θ _H = 0; and θ _T = T – T_b when T > T_b , otherwise θ _T = 0. The Ψ _b and T_b considered for S. tragus were −1,000 kPa (Yousefi et al. Reference Yousefi, Rashidi, Moradi and Mastinu2020) and 4 C (Dwyer and Wolde-Yohannis Reference Dwyer and Wolde-Yohannis1972), respectively.

The cumulative hydrothermal time (HTT) was estimated from March 28 according to Equation 2, where d is the time period in days when HTT was computed:

([2]) $${\rm{HTT}} = \sum ({{\rm{\theta }}_{{{HT}}}})\;{\rm{*}}\;d$$

Model Development

To describe the pattern of seedling emergence, percent of cumulative emergence, E, was related to the cumulative hydrothermal time (HTT) with a Weibull model (Gonzalez-Andujar et al. Reference Gonzalez-Andujar, Chantre, Morvillo, Blanco and Forcella2016; Martinson et al. Reference Martinson, Durgan, Forcella, Wiersma, Spokas and Archer2007):

([3]) $$E = k\{ 1 - {\rm{exp[}} - b({\rm{HTT}} - p)]\} $$

where k is the maximum emergence fraction, b is the slope (emergence rate), and p is the inflection point on the x axis. Model performance was assessed by calculating the root mean-square error (RMSE), sum of the residuals (SRES), and sum of the absolute residuals (SARES) (Bastida et al. Reference Bastida, Lezaun and Gonzalez-Andujar2021). These measures are defined by Equations 4 to 6, where x _i and y _i are the observed and predicted cumulative percentage emergence, respectively:

([4]) $${\rm{RMSE}} = {\rm{\;}}\sqrt {\left( {{1 \over n}} \right)\mathop \sum \nolimits_{i = 1}^n {{\left( {{x_i} - {y_i}} \right)}^2}} $$

([5]) $${\rm{SRES}} = \mathop \sum \nolimits_{i = 1}^n \left( {{x_i} - {y_i}} \right)$$

([6]) $${\rm{SARES}} = \mathop \sum \limits_{i = 1}^n {\rm{ABS\;}}\left( {{x_i} - {y_i}} \right)$$

ABS is absolute value of the number within parentheses and n is the number of observations. A scale of RMSE meaning is (Royo-Esnal et al. Reference Royo-Esnal, Torra, Antoni Conesa, Forcella and Recasens2010): < 5 = excellent prediction, 5 to 10 = very good prediction, 10 to 15 = good prediction, and >15 = insufficient prediction. The SRES and SARES determine how errors in the model cancel out. If SRES is small compared with SARES, errors in the model will tend to cancel out. If SRES and SARES are large and SRES is positive, the model will tend to underestimate the observed value. However, if SRES is negative and large in comparison to SARES, then the model will tend to overestimate the observed value. Model parameters and goodness of fit were estimated by nonlinear least-squares regression using GraphPad Prism 6.0 (GraphPad Software, San Diego, CA, USA).

Model Validation

The model was validated using independent data from the described sites (B, C, and D) by comparing the observed seedling emergence and the predicted seedling emergence according to HTT, based on soil temperature and water potential measured on the sites and modeled by the Weibull function. Finally, the accuracy of the model was assessed by comparing the predicted and observed values through linear regression.