• 540 likes • 646 Views
Pasgear 2. Version 2.3 (Build 02.12.2009) Jeppe Kolding and Åsmund Skålevik www.cdcf.no/data/pasgear. ‘Database’. Analysis + Series of ready made analyses for quick exploration and overview of the data. What is Pasgear 2 ?. Extract. Data stored at raw level (as sampled)
E N D
Pasgear 2 Version 2.3 (Build 02.12.2009) Jeppe Kolding and Åsmund Skålevik www.cdcf.no/data/pasgear
‘Database’ Analysis + Series of ready made analyses for quick exploration and overview of the data What is Pasgear 2 ? • Extract
Data stored at raw level (as sampled) Keep automatic track of ‘effort’ Extract information Philosophy Raw data never touched ! Visualize Condense and group
Philosophy cont… • Easy data entry (punch or import) • Easy data export (raw or grouped) • Perform standard ‘fisheries’ analyses by click and go (inbuilt library of ‘macros’) • Make almost any kind of ‘your own’ analyses by powerful queries and grouping techniques • Standardize output (CPUE, correct for gear selectivity (s) or catchability (q)) • Make nice graphs (almost endless possibilities) • Interface with other software (Excel, FiSAT..)
Nice Graphs… Length frequencies corrected for gear selectivity by the SELECT method
Special features • Automatic estimation of weights from length-weight relationships. • Standardized (weighed) calculation of CPUE with confidence limits. • Calculation of different types of confidence limits (arithmetic, Pennington estimator, and bootstrap). • Non-linear maximum likelihood estimation of gillnet, hook and trap selectivity probabilities (SELECT) • Gear selectivity corrected length frequencies and catch curves • Non-linear least squares estimation of maturity ogives and size at 50% maturity
How does it keep automatic track of effort? “2 stage” sampling in one record How many samples are here? • No matter how you extract the data, the sample size will always be known • even if there are ‘no fish’ in the sample as biological and physical info is counted separately. 1 2 3 4 ‘Physical’ data combined with the biological..
Biological data - standard Other columns can be added – also physical
No catch = empty setting • A single record with only physical values species = 0
Standardized catch per unit effort • y = absolute effort, e.g. number of net panel (or fleet) settings • n = number of samples (if effort is not a variable then y = n). • Wi = catch (in weight or numbers) in set i or sample i, • SU = standard relative effort unit (size) of a net panel • Ui = actual relative effort unit (size) of net i (this can be given in the Relative effort field in the Data Table) • ST = standard time unit (hours or minutes) of a setting (defined in the data table properties/Effort mode), • Ti = actual time unit of setting i (this can be given in the duration field in the Data Table).
# Nets # hrs # Nets # m or m2 Standardized catch per unit effort = kg · 100m-1 · 12hrs-1 net set 100 m or m2 # Samples 12 hrs # Nets
1 2 Standardize CPUE
Query = Filter You can change the name (caption) of any object in Pasgear using the ‘general’ tab + adding comments if desirable
Query text mode = compiled script In text mode you can write any advanced query or expression using the compiler syntax. To see and understand the syntax see the ‘Expression builder’
Expression builder: These two expressions are doing the same thing ! • What this expression does: • Lookup field ‘Date’ in Data table • Return the Month of the date (1..12) • If Month is between 2 to 5 or 9 to 11 then result = true else result = false
Analysis: Groups and variables • You can group in 3 dimensions (rows, columns and pages) • Grouping is done based on the field columns in the data table • You can add a ‘variable’ to any of the 3 dimensions • A variable is a count, a mean, etc. i.e. various calculated values
Modify analysis Double click
Columns C4 H C1 C2 C3 R1 R2 Rows R3 Analysis: 2 D – rows, columns Column groups Row variables
C4 H C1 C2 C3 R1 R2 R3 Analysis: 2 D – rows, columns Column variables Row groups
C4 H C1 C2 C3 R1 R2 R3 Analysis: 2 D – the page variable Column groups Row groups Page variables
C4 C4 C4 C4 C4 C4 H H H H H H C1 C1 C1 C1 C1 C1 C2 C2 C2 C2 C2 C2 C3 C3 C3 C3 C3 C3 R1 R1 R1 R1 R1 R1 R2 R2 R2 R2 R2 R2 R3 R3 R3 R3 R3 R3 Analysis: 3 D – the page concept Column groups Page groups Row variables Page variables
C4 C4 C4 C4 C4 C4 H H H H H H C1 C1 C1 C1 C1 C1 C2 C2 C2 C2 C2 C2 C3 C3 C3 C3 C3 C3 R1 R1 R1 R1 R1 R1 R2 R2 R2 R2 R2 R2 R3 R3 R3 R3 R3 R3 Analysis: 3 D groups Column variables Page groups Row groups Page variables
C8 C5 C6 C7 C4 C4 C4 C4 C4 H H H H H C1 C1 C1 C1 C1 C2 C2 C2 C2 C2 C3 C3 C3 C3 C3 R1 R1 R1 R1 R1 R2 R2 R2 R2 R2 R3 R3 R3 R3 R3 R4 R5 R6 Analysis: 3 D groups + variables Column groups Column variables Pages Row groups Page variables Row variables
Diagrams and charts Control pane Y- series Diagram area Chart area Plot area Z - series Options pane Zoom and scale pane
Diagrams and charts Check off and write 1
Diagrams and charts Reset to default Invert colors
Making a chart For a variable For a table
Gear Selectivity All fishing or sampling gears are more or less selective
What is selectivity? Sample this population with 2 gillnets of different mesh sizes
Gear Selectivity • The fish retained in a gear is usually only an unknown proportion of the various size classes available in the fished population. • Selectivity is a quantitative expression of this proportion and represented as a probability of capture of a certain size of fish in a certain size of mesh (or hook).
Gear Selectivity • From observedcatches one can calculate the selection curves, which are the probabilities that a certain length is caught in a certain mesh size
Gear Selectivity • Gillnet, hook, and trap selectivity can be indirectlyestimated from comparative data of observed catch frequencies across a series of mesh or hook sizes. • The general statistical model (SELECT) is described in Millar (1992), and the specific application on gillnets and hooks is described in Millar & Holst (1997) and Millar and Fryer (1999)
Gear Selectivity • The principle of geometric similarity: Length of maximum retention (mean length) and spread of selection curve (SD) are both proportional to mesh size(Baranov 1948) With increasing mesh size there is a proportional increase in mean length and SD of the fish caught
Gear Selectivity – 5 models Normal location shift Normal scale shift Lognormal Gamma Bimodal normal scale shift μi = mean size (length) of fish caught in mesh size i = k1mi σi = standard deviation of the size of fish in mesh i = k2mi or αmi Lj = mean size of fish in size (length) class j
Gear Selectivity – 5 models Only means are proportional to mesh size, spread is constant. Normal location shift Means and spread are proportional to mesh size (principle of geometric similarity). Normal scale shift Means and spread are proportional to mesh size but with asymmetrical retention modes (i.e. skewed distributions). Lognormal Means and spread are proportional to mesh size but with asymmetrical retention modes (i.e. skewed distributions). Gamma Bimodal normal scale shift Means and spread are proportional to mesh size but 2 different capture modes, i.e. fish wedged by the gills and entangled in the mesh sizes
Gear Selectivity – Step 1 • Find the linear part of the mesh size range Exclude
Gear Selectivity – Step 2 • Evaluate appropriate model These plots assist in evaluating whether the mean and SD spread increase with mesh size, and what the degree of skewness is.
Gear Selectivity – Step 3 • Estimate selection curve Probability = less than 1 Sum of all selection curves standardized to 1 Cut off level
Gear Selectivity – Step 4 • Correct observed catches Correcting for gear selectivity can have significant effect when calculating total mortality or growth from length frequency data (FiSAT). With no correction mortality may be underestimated
Gear Selectivity – Step 5 • Save probabilities This is a default name that ensures that Pasgear will check on the species and the length interval to accept the selectivity file: It mean species = 6 (only) And length interval = 1 cm
Connect a selectivity file Catches by groups are now corrected for estimated selectivity