The system we are working on is biological, more specifically the distribution of specific events across a chromosome. This can be thought of as 1D array (the chromosome) across which points can be chosen (event positions). We have mapped the positions of these events experimentally and then calculated the inter-point distances (IPDs) (the distances between each successive event) - see below. 

![enter image description here][1]

We have fitted a gamma-distribution to the calculated IPDs:

![enter image description here][2]

Gamma distribution

a =  2.7863  
b = 39498.2  

Which can be reconstructed separately using:

    dist = gampdf(1:450000,2.7863,39498.2);

**Question 1:** I now want to convert this gamma distribution to a hazard function. Am I right in thinking that this will essentially plot out the probability of an event occurring at position x relative to an event at position 0?

To expand upon that, we have previously observed that our IPDs do not match those expected if event distributions across chromosomes were totally random. We are now working under the hypothesis that each event that occurs, creates a zone around it which makes it less likely another will occur nearby. By using a hazard function, we want to obtain measures of this reduction in probability at different distances. 

**Question 2:** Could anybody provide the hazard function from this distribution so I know what I am aiming for? This is because I am having difficulty finding a way to do this on my chosen software and need to be able to check my output. 

*IPD data used to produce the gamma-distribution:*

    7126.5
    11311.5
    12582.25
    13503
    15588
    18523.75
    19287.75
    20709.5
    20761.5
    21499
    22153
    22452
    23112.5
    24140
    25429.25
    25502.75
    26399.75
    26835.5
    26951.25
    27890.5
    28876.5
    29178.5
    29447
    31374.25
    32463.5
    32546.5
    32848
    33229.5
    34460.5
    35002.25
    35545.25
    37287.75
    37498.75
    37742.75
    37881.5
    38152
    38888.25
    38889
    39059.25
    39207.75
    39483.5
    42316.5
    42516.75
    43901.5
    43923.5
    44302
    44611.25
    45464
    46433.5
    47372.5
    47929
    48047.5
    49677.5
    50125.75
    50528
    50730.25
    51460.5
    51477.25
    52397
    55383.5
    55563
    56236.5
    56455.75
    57100.75
    57363.5
    57432.75
    57785.25
    58193.25
    58429
    58571
    58760
    58791.5
    59372
    59766.25
    59831.5
    59987.25
    60087.75
    60500.25
    60565
    60610.5
    61444.75
    61532.75
    61640.5
    62147.25
    62208
    62442
    62912.25
    63428.5
    63508.25
    63822.5
    63849.5
    64280.75
    64497.75
    65046
    65113.25
    65151.25
    65691.5
    66289.5
    66672.25
    67010
    67030.75
    67124
    67573.75
    68344
    68969
    69071.5
    69680.75
    70136
    70228.25
    70347.25
    70733.5
    70985
    71448
    71546.5
    71912.75
    71960.75
    72532.75
    73973.75
    74258.5
    74835
    75124
    75352.5
    75487.5
    76186.5
    76710
    78116.5
    78206.5
    78797
    78918
    79196.5
    79722
    79949.75
    80091.5
    80279
    80727.75
    80734.5
    80816.5
    81361.75
    82155.75
    82412.5
    83397.25
    84064.25
    84225.25
    84412.25
    84469
    84481
    84665.25
    84881.5
    85289
    85453.5
    85483.25
    87035.25
    87686
    87820.25
    88464.75
    88560
    88808.5
    88821
    88862.25
    89089.5
    89631.75
    90048
    90234.75
    90362.5
    90453.25
    90535.75
    91369.25
    92416.25
    94617.75
    94660.75
    95887
    96051.25
    96294.25
    96658
    97369.75
    98233.75
    98573.25
    98894.25
    99009.5
    99737
    99811.75
    100148.5
    101425
    103690.25
    104260.5
    104391.75
    104459.5
    105307.25
    107394.25
    107716.5
    108504.25
    108768
    109578.5
    109584.75
    110242.75
    110292.25
    110687.5
    110929.25
    111462
    112838.25
    113079.5
    113357.75
    113566.25
    113750.25
    113848
    114834.25
    114871
    114919.25
    115591.25
    115919.75
    116756.25
    116882
    116888
    116899.75
    117400.75
    119371
    119740.5
    120567.25
    120958.25
    121443.25
    121452.25
    122081.75
    122628.25
    123418.25
    123595.25
    124589.75
    125306.25
    126250.5
    126396.75
    126911.25
    127730.25
    128006.75
    128296.5
    128580.5
    129565.25
    130313.5
    131147.5
    131634
    133562.25
    133615.5
    133937.25
    134028.25
    134362.25
    134947.75
    135474.5
    136047.5
    136651.25
    137551
    137577.5
    139378.25
    140254.5
    140397.75
    140836.5
    141003.25
    141719.5
    142899.5
    144318.5
    144351
    146389
    146980.25
    147244.25
    148155
    149128.25
    149829.5
    150237.5
    150424.25
    151113.5
    153143
    154442.75
    154474.25
    155433.25
    157106.25
    158005.75
    158849.5
    159248.75
    160938.5
    161086.75
    161143.5
    162161.5
    163349
    164672.75
    164854.5
    165023.25
    166059.25
    169018
    170240.75
    171916
    172010
    173273
    173354
    173550.5
    175414.25
    176046.5
    176430.75
    176779.75
    177977.25
    180548
    180787.5
    182136.75
    182981.5
    183180
    184106
    187303.5
    190121.75
    191309
    192091.25
    193096.25
    197044
    197481.25
    197942.5
    200061
    203942
    212572.5
    212887
    213560.75
    213674.75
    218347.25
    219554.75
    230242.25
    231234
    231270.75
    231636.25
    237084.75
    240347.5
    241466.75
    248942.75
    249088
    253142.75
    259002
    259020.75
    260244.75
    260625.25
    264837
    273098.75
    283252.75
    287526.75
    304071.75
    304625.5
    307101.5
    307870.75
    354267.5
    405625.75

  [1]: https://i.sstatic.net/iUJh5.png
  [2]: https://i.sstatic.net/LQxyo.png