Your browser does not fully support modern features. Please upgrade for a smoother experience.

Version	Summary	Created by	Modification	Content Size	Created at	Operation
1		Sergio Da Silva	--	335	2026-02-03 09:24:11	\|
2	Format Correct	Abigail Zou	Meta information modification	335	2026-02-03 09:38:10	\|

Video Upload Options

We provide professional Academic Video Service to translate complex research into visually appealing presentations. Would you like to try it?

No, upload directly Yes

Cite

If you have any further questions, please contact Encyclopedia Editorial Office.

Select a Style

Da Silva, S.; Bonini, P. Extremes of the Edgeworth Box. Encyclopedia. Available online: https://encyclopedia.pub/entry/59472 (accessed on 04 February 2026).

Da Silva S, Bonini P. Extremes of the Edgeworth Box. Encyclopedia. Available at: https://encyclopedia.pub/entry/59472. Accessed February 04, 2026.

Da Silva, Sergio, Patricia Bonini. "Extremes of the Edgeworth Box" Encyclopedia, https://encyclopedia.pub/entry/59472 (accessed February 04, 2026).

Da Silva, S., & Bonini, P. (2026, February 03). Extremes of the Edgeworth Box. In Encyclopedia. https://encyclopedia.pub/entry/59472

Da Silva, Sergio and Patricia Bonini. "Extremes of the Edgeworth Box." Encyclopedia. Web. 03 February, 2026.

Peer Reviewed

Extremes of the Edgeworth Box

This is a peer-reviewed entry published in Encyclopedia Journal, full entry can be found at 10.3390/encyclopedia6020029

Extremes of the Edgeworth box concern corner allocations and their relationship to the contract curve in a two-good, two-agent exchange economy. In the standard pure-exchange setting with well-behaved preferences, the contract curve comprises all Pareto-efficient allocations, including interior tangencies and boundary corners, where no mutually beneficial trade remains. When money is introduced as a numéraire (a medium of exchange only), real feasibility and preferences are unchanged, so the contract curve remains the benchmark for efficiency. When money provides liquidity services (is valued for holding), agents may rationally abstain from trade even near interior tangencies; short-run outcomes can therefore include inaction at corners. This entry defines these objects, outlines the efficiency conditions at boundaries, and summarizes how monetary interpretations affect short-run behavior in general equilibrium and monetary economics. The Edgeworth geometry remains a real-exchange depiction; when we discuss money as a store of value, we use it as a short-run, reduced-form outside option that proxies intertemporal motives. This does not “fix” the box; it clarifies why no-trade at or near corners can be individually rational when liquidity is valued.

Edgeworth box contract curve corner solutions Pareto efficiency general equilibrium indifference curves budget constraint numéraire liquidity preference monetary economy

The extremes of the Edgeworth box ^[1]^[2]^[3] are the two boundary allocations in a two-good, two-agent exchange economy where one agent holds all resources and the other holds none. Let agents

i \in \{A, B\}

have strictly increasing, strictly quasi-concave utilities

U_{i} (x_{i}, y_{i})

and endowments satisfying

x_{A} + x_{B} = \bar{x}

and

y_{A} + y_{B} = \bar{y}

. An allocation is Pareto-efficient if no feasible reallocation makes someone better off without making the other worse off.

For interior efficient points,

MRS 𝑥 𝑦 𝐴 = MRS 𝑥 𝑦 𝐵,

while at the extremes a non-negativity/boundary condition binds, so any feasible move that benefits the deprived agent necessarily harms the endowed agent; hence the corners are efficient boundary optima.

With strictly positive prices

(p_{x}, p_{y})

, a Walrasian equilibrium selects either a tangency on the contract curve or a boundary optimum when the budget line through the endowment supports it. Thus, the extremes are limit cases of price-supported efficient allocations in the Edgeworth geometry.

References

Edgeworth, F.Y. Mathematical Psychics: An Essay on the Application of Mathematics to the Moral Sciences; C. Kegan Paul & Co.: London, UK, 1881.
Hicks, J.R. Value and Capital: An Inquiry into Some Fundamental Principles of Economic Theory; Clarendon Press: Oxford, UK, 1939.
Nicholson, W.; Snyder, C.M. Microeconomic Theory: Basic Principles and Extensions, 12th ed.; Cengage Learning: Boston, MA, USA, 2021.

© Text is available under the terms and conditions of the Creative Commons Attribution (CC BY) license; additional terms may apply. By using this site, you agree to the Terms and Conditions and Privacy Policy.

Upload a video for this entry

Information

Subjects: Economics

Contributors MDPI registered users' name will be linked to their SciProfiles pages. To register with us, please refer to https://encyclopedia.pub/register : Sergio Da Silva , Patricia Bonini

View Times: 5

Online Date: 03 Feb 2026

Table of Contents

Notice

You are not a member of the advisory board for this topic. If you want to update advisory board member profile, please contact office@encyclopedia.pub.

Confirm

Only members of the Encyclopedia advisory board for this topic are allowed to note entries. Would you like to become an advisory board member of the Encyclopedia?

Yes

${ textCharacter }/${ maxCharacter }

Submit

Cancel

There is no comment~

${ textCharacter }/${ maxCharacter }

Submit

Cancel

${ selectedItem.replyTextCharacter }/${ selectedItem.replyMaxCharacter }

Submit

Cancel

Confirm

Are you sure to Delete?

Yes No