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Survival Analysis Diane Stockton. Survival Curves Y axis, gives the proportion of people surviving from 1 at the top to zero at the bottom, representing.

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Presentation on theme: "Survival Analysis Diane Stockton. Survival Curves Y axis, gives the proportion of people surviving from 1 at the top to zero at the bottom, representing."— Presentation transcript:

1 Survival Analysis Diane Stockton

2 Survival Curves Y axis, gives the proportion of people surviving from 1 at the top to zero at the bottom, representing 100% survival to zero percent survival at the bottom. The X axis, gives the time after diagnosis A survival curve is a statistical picture of the survival experience of a group of patients in the form of a graph showing the percentage surviving versus time.

3 Survival Curves Any point on the curve gives the proportion or percentage surviving at a particular time after the start of observation. E.g. the blue dot on the example curve shows that at one year, about 75% of patients were alive. A survival curve always starts out with 100% survival at time zero, the beginning. A survival curve is a statistical picture of the survival experience of a group of patients in the form of a graph showing the percentage surviving versus time.

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6 Questions in survival analyses Which Survival? Observed (or crude) survival Cause-specific (also known as Net or Corrected) survival Relative survival Period survival Data issues Censoring Life tables Standardisation Modelling survival

7 Observed (crude) survival Observed survival = number surviving the interval number alive at the start of the interval

8 Frequently 1 and 5 year survival rates are reported which are interpreted as the proportion surviving 1 or 5 years after diagnosis. The median survival is the time at which the percentage surviving is 50%. Survival Curves

9 The experience of a particular group as represented by a staircase curve can be considered an estimate or sample of what the "real" survival curve is for all people with the same circumstances. As with other estimates, the accuracy improves as the sample size increases. With staircase curves, as the group of patients is larger, the step down caused by each death is smaller. If the times of the deaths are plotted accurately, then you can see that as the size of the group increases the staircase will become closer and closer to the ideal of a smooth curve.

10 Observed (crude) survival Observed survival = number surviving the interval number alive at the start of the interval Often the length of follow-up is not the same for all patients and some became “censored” during the interval. Usually we assume that each “censored” patient was at risk for only half of the interval, so : = number surviving the interval number alive at start of interval – (0.5 *number censored)

11 Censored data From Paul W Dickman Gothenburg slides

12 Censoring When a patient is censored the curve doesn't take a step down as it does when a patient dies. But censoring the patient reduces the number of patients who are contributing to the curve, so each death after that point represents a higher proportion of the remaining population, and so every step down afterwards will be a little bit larger than it would have been.

13 Censoring From Robert A Yaffee, Survival analysis with STATA

14 Cause-specific (or net or corrected) Survival Cause of death from the death certificate is used to attribute the death to the disease of interest other causes BUT…….. Which deaths should be considered attributable to the disease of interest? Are the death certificates available and accurate? The analysis is exactly the same as for observed survival (actuarial or Kaplan-meier) but those dying from other causes are counted as censored at their time of death

15 Censoring From Robert A Yaffee, Survival analysis with STATA

16 Comparison of survival methods

17 Relative Survival Relative survival = observed survival expected survival where : Expected survival = survival that would have been expected if the patients had been subject only to the mortality rates of the general population. It can be interpreted as the proportion of patients alive after i years of follow-up in the hypothetical situation where the disease in question is the only possible cause of death.

18 Calculating the expected survival Tables of the mortality rates of the general population, by age (single year of age at death, 0-99) sex calendar period of death And by other important factors such as Geographical area deprivation category Life tables

19 10 100 1,000 10,000 100,000 0102030405060708090100 Age at death (years) Rate per 100,000 Most deprived Least deprived General mortality rates

20 General life table 90 44 40 90 67 60 0 20 40 60 80 100 Affluent234Deprived Deprivation category Survival (%) Observed Expected Relative Life tables and bias in deprivation gradient - 1 23% gap in relative survival between affluent and deprived

21 Deprivation life tables 44 40 67 60 85 95 0 20 40 60 80 100 Affluent234Deprived Deprivation category Survival (%) Observed Expected Relative Life tables and bias in deprivation gradient - 2

22 Deprivation life tables 85 40 60 95 47 63 0 20 40 60 80 100 Affluent234Deprived Deprivation category Survival (%) Observed Expected Relative 16% gap in relative survival between affluent and deprived Life tables and bias in deprivation gradient - 3

23 Life Tables The use of the same life table for groups for whom general mortality is known to differ can lead to bias because the expected survival will be under estimated for the groups who have better than average survival and hence the relative survival will be over estimated and visa versa for the groups who have worse than average survival

24 Appropriate life tables are important! Deprivation-specific Relative survival estimates:

25 Different relative survival methods There are different ways of computing : EDERER I (not recommended) EDERER II (not recommended for estimating cumulative expected survival, however a good estimator for the interval- specific expected survival) Hakulinen (recommended for estimating cumulative expected survival for the purpose of estimating relative survival ratios but is not recommended for interval-specific expected survival) Maximum likelihood (Esteve) (similar results to Hakulinen method)

26 Patients do not all die of the disease you are monitoring Observed (crude) survival –“Real” survival of the patients –survival from disease of interest and all causes of death combined –Intuitive; easy to explain –Easily computed in wide variety of statistical software Survival analysis for population studies

27 Patients do not all die of the disease you are monitoring Net survival (corrected, cause-specific) –separates risk from disease of interest and background risk (everyone) –deaths from other causes are censored –survival from cancer in the absence of other causes –agreement on which causes of death are due to the disease –death certification is precise, stable over time, comparable –coding of death certificates is accurate, consistent Survival analysis for population studies

28 Patients do not all die of the disease you are monitoring Relative survival –also separates risk from disease of interest and background risk (everyone) –all deaths in study period are included –uses vital statistics to account for background risk –ratio of observed and expected survival –survival relative to that of general population –does not require information on cause of death –avoids need for attribution of death to disease or other cause –long-term survival (disease hazard falls, other hazard rises) –need appropriate (and accurate) life tables –different methods give slightly different results –not as easy to explain Survival analysis for population studies

29 Comparison of survival methods

30 From Paul W Dickman Gothenburg slides

31 Age-Standardised Relative Survival Rate The calculation of the expected survival probability adjusts only for the age-specific mortality from other causes. If an overall (all-ages) estimate of relative survival for patients is used to compare survival rates for two populations with very different age structures, the results may be misleading. It is therefore desirable to age-standardise the relative survival rates. Age-adjustment is also important for the analysis of time trends in relative survival because if survival varies markedly with age, a change in the age distribution of patients over time can produce spurious survival trends (or obscure real trends).

32 Survival varies markedly by age for many diseases

33 Why we should standardise …cont 15.5 13.5 30% 25% 15% John-o- Groats Population (%) 0.25 Weight 11.3 13.5 All ages Unstandardised Standardised 27% 17% 8% 2% 15% 25% 30% 0-44 45-64 65-74 75+ 2 year survival estimates identical in both places Lands end Population (%) Age band

34 Age-standardisation Advantages None of the routine survival methods adjust for age or sex (not even relative survival) Standardising allows comparison with other populations or over time when the the population structures are not the same … the other option is modelling which is discussed later

35 Age-standardisation Limitations No routinely-used common standard population for survival analyses – create a standard that is sensible for your data Unclear what to do when there is no survival estimate for an age-group Obviously more time consuming than “all ages” estimates

36 If there is no estimate in an age group then: –Merge with another age group until have enough cases –Increase time band for that estimate (changes in time are usually smaller than changes between age bands so I prefer this option) –And if all else fails then produce a truncated standardised rate ALSO REMEMBER when producing estimates for sexes combined, remember to analyse the sexes separately and then sex-standardise them … add together the two estimates and then halve

37 Period survival Also known as the Brenner method (after proposer) Gives estimate of e.g. 5 year survival using the most up-to-date information Trade off between recency of data and number of patients IntervalIncludes patients diagnosed 119961997199819992000 219951996199719981999 319941995199619971998 419931994199519961997 519921993199419951996

38 From Paul W Dickman Gothenburg slides

39 Period survival continued (Finland example) Interval-specific relative survival estimates: Interval19781979198019811982 10.6270.790 20.8230.839 30.8650.879 40.9670.958 50.978 Most up-to-date five year survival estimate available would be: Using cohort method = 0.627*0.823*0.865*0.967*0.978 = 0.431 Using period method = 0.790*0.839*0.879*0.958*0.978 = 0.557 The actual five-year survival estimate for patients diagnosed in 1982 was 0.583 so the period method did not over-estimate survival

40 Modelling survival For crude or cause-specific survival –Cox Proportional Hazards regression –Poisson regression For relative survival –Programmes/macros written in SAS, STATA and R see http://www.pauldickman.com/ Grouped or individual data can be modelled Splines and fractional polynomials can be modelled

41 Recommendations Always display relative survival estimates Display crude survival along with relative survival to satisfy those who like to see the “real” thing Only use cause-specific survival for a specific study where the cause of death flag can be reviewed Choice of relative survival technique depends on ease of use and comparability Age-standardise if appropriate (include weights used in your footnotes). Include confidence intervals

42 Useful links / contacts Presentations, statistical programme code, scientific papers and examples of survival analyses http://www.pauldickman.com/ STATA ado files for the maximum likelihood relative survival method http://www.lshtm.ac.uk/eph/ncde/cancersurvival/tools/ My details: diane.stockton@nhs.net 0131 275 6817


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