Frontiers in Psychology (Sep 2012)

How Noisy is Lexical Decision?

  • Kevin eDiependaele,
  • Marc eBrysbaert,
  • Peter eNeri

DOI
https://doi.org/10.3389/fpsyg.2012.00348
Journal volume & issue
Vol. 3

Abstract

Read online

Lexical decision is one of the most frequently used tasks in word recognition research. Theoretical conclusions are typically derived from a linear model on the reaction times (RTs) of correct word-trials only (e.g., linear regression and ANOVA). Although these models estimate random measurement error for RTs, considering only correct trials implicitly assumes that word/nonword categorizations are without noise: Words receive a yes-response because they have been recognized, and they receive a no-response when they are not known. Hence, when participants are presented with the same stimuli on two separate occasions, they are expected to give the same response. We demonstrate that this not true and that responses in a lexical decision task suffer from inconsistency in participants’ response choice, meaning that RTs of correct word responses include RTs of trials on which participants did not recognize the stimulus . We obtained estimates of this internal noise using established methods from sensory psychophysics (Burgess & Colborne, 1988). The results show similar noise values as in typical psychophysical signal-detection experiments when sensitivity and response bias are taken into account (Neri, 2010). These estimates imply that, with an optimal choice model, only 83-91% of the response choices can be explained (i.e., can be used to derive theoretical conclusions). For word responses, word frequencies below 10 per million yield alarmingly low percentages of consistent responses (near 50%). The same analysis can be applied to RTs, yielding noise estimates about three times higher. Correspondingly, the estimated amount of consistent trial-level variance in RTs is only 8%. These figures are especially relevant given the recent popularity of trial-level lexical decision models using the linear mixed-effects approach (e.g., Baayen et al., 2008).

Keywords