--- title: "Choice-Level Analysis" output: rmarkdown::html_vignette description: > Why choice-level analysis offers deeper insights compared to standard profile-level analysis. vignette: > %\VignetteIndexEntry{Choice-Level Analysis} %\VignetteEngine{knitr::rmarkdown} %\VignetteEncoding{UTF-8} --- ## **Why Choice-Level Analysis?** 💡 **Choice-level analysis is simpler, easier, and more powerful than profile-level analysis.** - 🧠 Conjoint designs began in market research and psychology, where respondents **rated** two profiles (e.g., products). Each rating was treated as an **independent observation**, creating the **profile-level design** with `2 × n` rows for `n` respondents. - 🔍 Social scientists later used conjoint designs for **choices** instead of ratings but kept the same structure with a **single binary outcome**. This shift introduced **statistical and conceptual issues**. --- ### ⚠️ **Problems with Profile-Level Analysis** 🚫 Profile-level analysis forces researchers to correct a dependence that they created themselves. - 🔁 **Redundant structure:** Each choice task generates **two rows** per task for each respondent even though there is only **one independent choice**. - 🔗 **Mechanical dependence:** Selecting one profile **necessarily implies rejecting the other**, violating the independence assumption. - 🧩 **Artificial complexity:** Analysts must correct for this dependence using **complicated statistical adjustments**, even though it arises solely from how the data were organized—not from respondents’ behavior. --- ### ✅ **Advantages of Choice-Level Analysis** In contrast, **choice-level analysis** organizes data by respondent *decisions* rather than profiles. - 📋 Each unit of observation represents **a choice** for a given task per respondent. - ⚡ The outcome variable reflects **which profile was chosen** in that task. - 🧠 This data structure allows researchers to model the choice **conditional on the full comparison**. 🎯 **Choice-level analysis** directly models the respondent’s decision between two (or more) alternatives, capturing the true structure of the conjoint task. --- ## **Key Issues and Applications** - Profile-level estimands like **AMCEs** assume that each profile is generated independently and ignores how respondents evaluate one profile *relative* to another. This limits the types of questions researchers can ask. - Choice-level analysis allows researchers to explore questions that **explicitly depend on the comparison between profiles**, such as:
Examples of Choice-Level Research Questions - 🗳️ Do voters choose a **white** candidate over a **non-white** candidate? (The levels—white vs. Asian, Black, Hispanic—always differ between profiles.) - 🌐 Do **Asian Democrat respondents** prefer an **Asian Republican** over a **white Democrat**? (Profiles are intentionally designed with multiple correlated attributes.) - 📊 Do voters care about **electability**? (The two percentages representing win probability must sum to 100.) - ⚖️ Do voters prefer the **status quo** over a **policy proposal**? (One profile is fixed while the other varies across tasks.) - 🧭 How much do voters prefer **extreme left-leaning** or **extreme right-leaning** policies? (Attributes are consistently positioned on the ideological spectrum.)
Furthermore, when individuals compare profiles side-by-side, their evaluations are often **psychologically influenced by the alternative**, such as through **assimilation or contrast effects** (see *Horiuchi and Johnson 2025*). --- ## **Why Move to Choice-Level Analysis?** 🔍 **Choice-level analysis models the decision *between* two profiles, not the evaluation of a single profile.** This structure more closely mirrors: - 🧠 **Real-world decision-making**, where people choose among competing alternatives. - 🔄 **Comparative cognition**, where evaluations depend on the context of available options. - 🎛️ **Tradeoff reasoning**, where respondents weigh attribute combinations jointly. Hence, rather than estimating the probability of selecting an isolated profile, choice-level analysis estimates the **probability of choosing one profile over another**, conditional on all attributes involved. ✅ Mirrors real-world behavior ✅ Captures comparative judgment and psychological context ✅ Reveals authentic tradeoffs and priorities --- ## **Summary** | Profile-Level Analysis | Choice-Level Analysis | |:-----------------------|:----------------------| | Treats profiles as independent | Models the decision *between* profiles | | Ignores comparative context | Captures mutual influence of options | | May blur or bias tradeoffs | Highlights actual tradeoffs | | Can misstate uncertainty | Produces more interpretable estimates | | Requires complex correction methods | Works with simple and transparent models | --- ## **Key Takeaway** 🚀 If your conjoint design presents respondents with **two or more profiles for comparison**, then **choice-level analysis is essential for valid, interpretable, and psychologically realistic inference**. It provides: - **Deeper insights into human decision-making** - **Cleaner estimation procedures** - **Closer correspondence to real-world behavior** --- ## 📚 **References** - **Clayton, Horiuchi, Kaufman, King, & Komisarchik (Forthcoming).** *Correcting Measurement Error Bias in Conjoint Survey Experiments.* _Forthcoming, American Journal of Political Science._ [Preprint available](https://gking.harvard.edu/conjointE) - **Horiuchi & Johnson (2025).** *Advancing Conjoint Analysis: Delving Further into Profile Comparisons.* _Work in progress._