<p>In June 1958, Edward L Kaplan (1920–2006) and Paul Meier (1924–2011) published an innovative statistical method to estimate survival curves when including incomplete observations. The Kaplan–Meier (KM) method became the standard way of reporting patient survival in medical research. For example, the KM method is used in more than 70% of clinical oncology papers. With 44,319 Web of Science® citations as of November 2017, the report has become the most-cited statistics publication in the scientific literature. Part I of this report describes the KM method, its strengths and limitations, and the history and evolution of the method. In Part II we recount the biography of the remarkable mathematician Edward L Kaplan, PhD, and his unique contr...
<p>Kaplan-Meier survival curves for 30-day survival according to the cutoff (>2.6 mmol/L) in all pat...
<p>Kaplan-Meier survival curves for factors independently predicting all-cause mortality.</p
<p>Kaplan-Meier survival curves for overall survival and disease progression-free rate.</p
In June 1958, Edward L Kaplan (1920–2006) and Paul Meier (1924–2011) published an innovative statist...
Studies of how patients re¬spond to treatment over time are fundamentally impor¬tant to understandin...
<p>Kaplan-Meier Survival Curve: deaths in West Nile virus research participants over the course of t...
<p>Kaplan-Meier estimates of survival curves for patients with advanced lung cancer stratified into ...
<p>Kaplan-Meier survival curve for all study participants from randomization to end of extended foll...
(a) Progression-free survival and (b) overall survival for patients with more than 70% reduction in ...
<p>Kaplan-Meier curves of overall survival stratified by grouping, using cancer-related death as the...
<p>Kaplan-Meier curves of overall survival by histology in (A) all patients, (B) patients with non-m...
<p>Kaplan-Meier survival curves for malignant melanoma patients (diagnosed between 1997–2006).</p
<p>The Kaplan-Meier curves of disease-specific survival in relation to combinations of (A) (pCDK1<su...
<p>The Kaplan-Meier curves of Ki-67 according to (A) overall survival, (B) cancer-specific survival,...
<p>The Kaplan-Meier curves of disease-specific survival in relation to combinations of (A) (pCDK1<su...
<p>Kaplan-Meier survival curves for 30-day survival according to the cutoff (>2.6 mmol/L) in all pat...
<p>Kaplan-Meier survival curves for factors independently predicting all-cause mortality.</p
<p>Kaplan-Meier survival curves for overall survival and disease progression-free rate.</p
In June 1958, Edward L Kaplan (1920–2006) and Paul Meier (1924–2011) published an innovative statist...
Studies of how patients re¬spond to treatment over time are fundamentally impor¬tant to understandin...
<p>Kaplan-Meier Survival Curve: deaths in West Nile virus research participants over the course of t...
<p>Kaplan-Meier estimates of survival curves for patients with advanced lung cancer stratified into ...
<p>Kaplan-Meier survival curve for all study participants from randomization to end of extended foll...
(a) Progression-free survival and (b) overall survival for patients with more than 70% reduction in ...
<p>Kaplan-Meier curves of overall survival stratified by grouping, using cancer-related death as the...
<p>Kaplan-Meier curves of overall survival by histology in (A) all patients, (B) patients with non-m...
<p>Kaplan-Meier survival curves for malignant melanoma patients (diagnosed between 1997–2006).</p
<p>The Kaplan-Meier curves of disease-specific survival in relation to combinations of (A) (pCDK1<su...
<p>The Kaplan-Meier curves of Ki-67 according to (A) overall survival, (B) cancer-specific survival,...
<p>The Kaplan-Meier curves of disease-specific survival in relation to combinations of (A) (pCDK1<su...
<p>Kaplan-Meier survival curves for 30-day survival according to the cutoff (>2.6 mmol/L) in all pat...
<p>Kaplan-Meier survival curves for factors independently predicting all-cause mortality.</p
<p>Kaplan-Meier survival curves for overall survival and disease progression-free rate.</p