Topics in Labor Supply

Topics in Labor Supply Chapter 3

Extensions of Static Model • Labor supply over the lifecycle • Fertility • Household production • Retirement • Policy: Decline in work attachment among older workers

Labor Supply over the Lifecycle • Workers can “save” earnings when H* is high and enjoy more C and L later in life • Age-earnings profile • OC of leisure _____ when young and old • OC of leisure _____ during “prime” working years  “Inverse U” • Note: Workers anticipate evolution of wages, so high wages during prime years do not increase lifetime income

Labor Supply over the Lifecycle • Given age-earnings profile, younger and older workers enjoy leisure more than prime age workers • H* and w • In the lifecycle model, an increase in w is expected (evolutionary ∆wOC of leisure), but does not increase lifetime income (lifetime opportunity set)

Labor Supply over the Lifecycle • Recall: In the lifecycle model, an increase in w is expected and only induces a substitution effect for a particular worker • Comparing the level of two wage profiles generates an income effect • Jeff’s hours profile = Jeff if substitution effect dominates • Jeff’s hours profile = Jeff if income effect dominates

LFPR over the Lifecycle • Reservation wage: in years when w > , people will work • less likely for younger and older workers, so it is as young and old ages that LFPR tends to be lower (than at prime-age years) • changes over the lifecycle (# children, etc), so LFP varies over the lifecycle

Empirical Evidence • Should show ↑ LFPR and ↑ H* when wages are high • Intertemporal Substitution hypothesis: • LFP • Males: participation peaks between ages 20 and 50 • Females: participation peaks during early 40s • Substantial decline after age 50 – retirement, health, disability insurance programs, etc. • Hours worked • Males: increase to age 30, decline after age 50 (2100 annual during prime years) • Females: peak during 40s (many PT before)

Fertility • Evidence: as per capital income rose, fertility rates have declined • Model: • N = number of children (will depend upon income and prices) • X = quantity of goods and services • pN = price of another child (~100K including foregone earnings) • pX = price of consumption goods • I = income • At tangency,

Comparative Statics • Suppose I↑, ceteris paribus • If children are a normal good, N*

Comparative Statics • Suppose pN↑, ceteris paribus • Income Effect: _ to _ • Substitution Effect: _ to _ • Income and substitution effects ____________

Empirical Evidence • Theory suggests the demand for children will __crease with wages [corr(income , N*) _ 0] or with a __crease in the cost of raising children [corr(pN , N*) _ 0] • Strong negative correlation between mother’s wage and the number of children (10% in wages decreases N* by 3%) • Weak negative correlation between N* and income (10% increase in wages decreases N* by 0.4%) • Why?:

Household Production • Model • Leisure = childrearing, cooking, cleaning, etc. • Household production yields commodities consumed in the household such as meals  household production is an input to these commodities • Evidence • Labor market activity – Married men: 40 hours; Single men: 33 hours • Women allocate fewer hours than men to the labor market. • Married women allocate fewer hours than single women to the labor market. • Household production – Married women: 35 hours; Married men: 14 hours

Household Production, cont. • Goal: Determine how households allocate time to the labor market and to household production • Determined by comparative advantage: • Spouse with lower wage rate or greater household productivity specializes in __________ • Production Possibilities frontier

Household Production, cont. • OC of $1 of HH goods = slope = = $ of market good production • OC of $1 of HH goods = slope = = $ of market good production • Tim has a comparative advantage in __________________, and Jane has a comparative advantage in _____________________

Household Production, cont. • Joint PPF • Case 1: Jane and Tim both work in the labor market • Case 2: Jane and Tim both work at home • Case 3: Specialize

Household Production Decision • Who does what? • Depends where joint PPF and indifference curves are tangent • A: flat indifference curve (households enjoy market goods, so must work outside home)  • B: households enjoy both goods  • C: steep indifference curve (households enjoy goods produced at home) 

Comparative Statics • Suppose Jane’s wage increases • Her contribution to the PPF becomes __________. • Tim’s productivity at home remains the same ($360, and slope does not change) • Jane will work ______ in the market and may eventually only work in the labor market

Comparative Statics • Suppose Tim’s home productivity increases • His contribution to the PPF ________________. • Jane continues to earn a maximum of $210 in the labor market. • Tim will spend _______ time on household production and may eventually only work at home.

HH Production Empirical Evidence • Gender differentials • Wage gap is shrinking • Improvements in household technology decrease the household productivity differential • 10% increase in wages (OC of HH production)  HH hours decrease by 2% • When wage↑, HH production is less valuable and OC of leisure↑ LFP ↑ • Technological advances reduce HH productivity relative to labor market productivity, so HH hours ↓ (H*↑), primarily for women

Retirement • Model • Assume H = 0 after retirement (no PT work) • After retirement, individuals spend previous savings and employer-provided and/or government-provided pension benefits • More can be consumed by those who work longer since incomes usually exceed pensions • Tradeoff between leisure (longer retirement) and consumption  budget constraint downward sloping • Determinants of retirement age: • Wage • Pension benefits

Retirement Decision • Assume someone who lives to age 80 decides to retire sometime between age 60 and age 80 • Vt =

Comparative Statics • Suppose w↑, benefits constant • If worker retires when wage increase goes into effect, the increase • If retirement is delayed until after wage increase, • Here, _____________ effect dominates

Comparative Statics • Suppose benefits↑, wage constant • If years of retirement = 0, • Income effect: • Substitution effect: •  Years of retirement __crease

Retirement Empirical Evidence • LFPR of older men (ages 55-64) decreased between 13 and 35 percentage points between 1960 and 1996 • Theory: • 10% increase in wages reduces prob(retire before 65) by 6 percentage points  ______________ effect dominates • Higher benefits _________ retirement • 10% increase in benefits reduces retirement age by 1 month

Shortcomings of Model • Model does not • In US, changed from age 65 to 70 in 1978 • Abolished in 1986 • Model does not • SS: 9% per year increase if individual retires between 62 and 65, additional 4% per year after age 65 • 2/3 of men retire between 62 and 65

Policy Application: Labor Supply Response to Child Care Subsidies • Examples: school lunches, day care subsidies, tax credits • 40% of American families utilize day care totaling, on average, 7% of income • Example 1: Reduce hourly cost of day care (assume no fixed cost component) • H* will

Policy Application: Labor Supply Response to Child Care Subsidies • Example 2: Reduce fixed costs (assume no variable cost) • Equivalent to an increase in non-labor income (V) • Non-workers

Policy Application: Labor Supply Response to Child Care Subsidies • Example 2, cont.: Reduce fixed costs (assume no variable cost) • Equivalent to an increase in non-labor income (V) • Workers • Summary: Subsidies should __crease LFPR and __________ _____________effect on H* • Empirical evidence supports LFP prediction, especially among low income workers

Policy Application: Decline in Work Attachment Among Older Workers • Why has LFPR among older workers (men) ↓? • ________: Life expectancy at age 50 of white men rose from 22 to 26.7 years • ___________________________: 26% covered in 1950, 66% in 1990 • Prob(men aged 58-63 with private penions work) ↓ by 18 percentage points • ______________________: rose in 1970s and remained constant (when real wages ↓) in 1980s, but at most 15% of LFP ↓ attributable to SS • ______________________: disabled worker receives SS benefits as if he/she retired at age 65, regardless of when disability occurred • Recipients (age 55-64) of DI increased from 3.5% to 10.5% between 1960 and 1985 • Mixed evidence regarding effect of DI in LFPR

Policy Application: Decline in Work Attachment Among Older Workers • Social Security Earnings Test • Provision of SS system which discourages recipients (aged 65-69) from working • Workers can earn up to $17K without affecting benefits • Earnings beyond $17K taxed $1 for every $3 earned (33% tax rate) • Workers over age 70 unaffected

Policy Application: Decline in Work Attachment Among Older Workers • How does the SS Earnings Test affect H*? • Worker A: • Worker B: • Worker C:

Policy Application: Decline in Work Attachment Among Older Workers • Empirical Evidence on the effect of the elimination of the SS Earnings Test on H* • Only individuals working a moderate number of hours would increase the number of hours worked (because of the substitution effect) • 20% of retirees work, and 60% of those workers are affected by the SS earnings test • Estimate: removing the Earnings Test would increase H* by approximately 1 hour per week (from 3.2 to 4.4 hours)

Topics in Labor Supply

Topics in Labor Supply

Presentation Transcript

The Labor Supply Curve

Taxes on Labor Supply

Labor Supply and Demand

Supply of Labor

Topics in Labor Supply and Demand

Labor Supply

Labor Supply (Static)

Labor Supply

Introduction to Labor Supply

Labor Supply

Taxes on Labor Supply

To Supply Labor or Not to Supply Labor

Introduction to Labor Supply

Labor supply

Labor Topics

Dynamic Female Labor Supply

Topics in Labor Supply

Labor Supply Topics

Labor Supply and Demand

Dynamic Female Labor Supply

Dynamic Female Labor Supply

Application 1: Labor supply