Equal for all stimuli. Similarly, a category step might be obscured in a ranked activation profile, because ranking the noisy activation estimates will artifactually smooth the transition. After obtaining a ranking hypothesis from a given dataset, we therefore need independent data to test for gradedness and for a category step. We use session 1 to obtain the ranking hypothesis. We then apply the order (preferred before nonpreferred, and ordered according to session 1 within preferred and within nonpreferred) to the activation profile estimated from session 2 and fit the falloff model to the session 2 activations. We use a simple Biotin-VAD-FMK chemical information linear falloff model with four predictors (see Fig. 6 A). The predictors are (1) a linear-ramp predictor for the preferred category, which ranges from 1 (at the most activating preferred stimulus) to 0 (at the category boundary) and is constant at 0 within the nonpreferred category; (2) a linear-ramp predictor for the nonpreferred category, which is constant at 0 within the preferred category and ranges from 0 (at the category boundary) to 1 (at the least activating nonpreferred stimulus); (3) a confound-mean predictor spanning all stimuli (1 for all stimuli); and (4) a category-step predictor (1 for the preferred and 1 for the nonpreferred category). The estimated parameters of this linear model reflect the gradedness within (predictor 1) and outside (predictor 2) thepreferred category, the activation average between the two categories (predictor 3), and the size of the category step (predictor 4), i.e., the drop-off at the category boundary that is not explained by the piecewise linear gradation within and outside the preferred category. To improve the estimates, we perform the same model fitting in reverse (using session 2 to obtain the ranking hypothesis and session 1 to fit the model) and average the estimated parameters across both directions. Note that the two directions do not provide fully independent estimates; we do not assume such independence for inference. Statistical inference is performed by bootstrap resampling of the stimulus set (10,000 resamplings). The motivation for bootstrap resampling the stimuli is to simulate the variability of the estimates across samples of stimuli that could have been used. Our conclusions should be robust to the AZD0865 web particular choice of exemplars from each category. We therefore view our stimuli as a random sample from a hypothetical population of stimuli that might equally well have been used. Repeating the analysis (ranking with each session’s data, fitting the model to the other session’s data, and averaging the gradation- and step-parameter estimates across the two directions) for each bootstrap resampling, provides a distribution of fits (shown transparently overplotted in gray in Fig. 6B) and parameter estimates, from which we compute confidence intervals and p values (one-sided test). We performed two variants of this analysis that differed in the way the data were combined across subjects. In the first variant (see Fig. 6 B), we averaged the activation profiles across subjects to obtain a group-average activation profile for ranking (based on one session) and for fitting the falloff model (based on the other session). This analysis is most sensitive to activation profiles that are consistent across subjects. In the second variant (results not shown, but described below), we fitted the falloff model independently for each subject and averaged the parameter estim.Equal for all stimuli. Similarly, a category step might be obscured in a ranked activation profile, because ranking the noisy activation estimates will artifactually smooth the transition. After obtaining a ranking hypothesis from a given dataset, we therefore need independent data to test for gradedness and for a category step. We use session 1 to obtain the ranking hypothesis. We then apply the order (preferred before nonpreferred, and ordered according to session 1 within preferred and within nonpreferred) to the activation profile estimated from session 2 and fit the falloff model to the session 2 activations. We use a simple linear falloff model with four predictors (see Fig. 6 A). The predictors are (1) a linear-ramp predictor for the preferred category, which ranges from 1 (at the most activating preferred stimulus) to 0 (at the category boundary) and is constant at 0 within the nonpreferred category; (2) a linear-ramp predictor for the nonpreferred category, which is constant at 0 within the preferred category and ranges from 0 (at the category boundary) to 1 (at the least activating nonpreferred stimulus); (3) a confound-mean predictor spanning all stimuli (1 for all stimuli); and (4) a category-step predictor (1 for the preferred and 1 for the nonpreferred category). The estimated parameters of this linear model reflect the gradedness within (predictor 1) and outside (predictor 2) thepreferred category, the activation average between the two categories (predictor 3), and the size of the category step (predictor 4), i.e., the drop-off at the category boundary that is not explained by the piecewise linear gradation within and outside the preferred category. To improve the estimates, we perform the same model fitting in reverse (using session 2 to obtain the ranking hypothesis and session 1 to fit the model) and average the estimated parameters across both directions. Note that the two directions do not provide fully independent estimates; we do not assume such independence for inference. Statistical inference is performed by bootstrap resampling of the stimulus set (10,000 resamplings). The motivation for bootstrap resampling the stimuli is to simulate the variability of the estimates across samples of stimuli that could have been used. Our conclusions should be robust to the particular choice of exemplars from each category. We therefore view our stimuli as a random sample from a hypothetical population of stimuli that might equally well have been used. Repeating the analysis (ranking with each session’s data, fitting the model to the other session’s data, and averaging the gradation- and step-parameter estimates across the two directions) for each bootstrap resampling, provides a distribution of fits (shown transparently overplotted in gray in Fig. 6B) and parameter estimates, from which we compute confidence intervals and p values (one-sided test). We performed two variants of this analysis that differed in the way the data were combined across subjects. In the first variant (see Fig. 6 B), we averaged the activation profiles across subjects to obtain a group-average activation profile for ranking (based on one session) and for fitting the falloff model (based on the other session). This analysis is most sensitive to activation profiles that are consistent across subjects. In the second variant (results not shown, but described below), we fitted the falloff model independently for each subject and averaged the parameter estim.