{"id":275,"date":"2022-04-06T22:24:00","date_gmt":"2022-04-06T22:24:00","guid":{"rendered":"https:\/\/www.lancaster.ac.uk\/stor-i-student-sites\/harini-jayaraman\/?p=275"},"modified":"2022-04-17T19:58:24","modified_gmt":"2022-04-17T19:58:24","slug":"anomaly-detection-in-functional-data","status":"publish","type":"post","link":"https:\/\/www.lancaster.ac.uk\/stor-i-student-sites\/harini-jayaraman\/anomaly-detection-in-functional-data\/","title":{"rendered":"Anomaly detection in Functional Data"},"content":{"rendered":"\n

As discussed in my previous blog post, Functional data appears in various disciplines and each observation can be considered as real function of time observed at particular time points. Anomaly detection can be more challenging in terms of functional data because outliers are not always easily identified visually. <\/p>\n\n\n\n

Various methods are being developed to identify outliers in functional data. I’ve defined variety of outliers in functional data in my previous post, of which shape outliers is the most difficult to identify. I will discuss one of the method in identifying outliers in functional data we explored as a team during STOR608 sprints, as it was a great and interesting learning experience for me.<\/p>\n\n\n\n

Functional depth<\/h3>\n\n\n\n

The anomaly detection techniques in the methods I will discuss depends on something called ‘Functional depth’. It is nothing but a specific ordering of the curves. There are various definitions\/ways in literature to order these functional observations {Y_i(t)}, i = 1, 2,...,N, t \\in \\mathcal I <\/span> , where \\mathcal I <\/span> is closed real interval discretized into M <\/span> points. Modified Band Depth is one of the way.<\/p>\n\n\n\n