Large-scale seismic data compression: application to full waveform inversion and extended image volume

TitleLarge-scale seismic data compression: application to full waveform inversion and extended image volume
Publication TypeThesis
Year of Publication2018
AuthorsYiming Zhang
Month04
UniversityThe University of British Columbia
CityVancouver
Thesis Typemasters
Keywordscompression, extended image volume, FWI, hierarchical tucker, MSc, multilinear algebra, on-the-fly, thesis
Abstract

Conventional oil and gas fields are increasingly difficult to explore and im- age, resulting in a call for more complex wave-equation based inversion al- gorithms that require dense long-o↵set samplings. Consequently, there is an exponential growth in the size of data volumes and prohibitive demands on computational resources. In this work, we propose a method to com- press and process seismic data directly in a low-rank tensor format, which drastically reduces the amount of storage required to represent the data. We first outline how seismic data exhibits low-rank structure in a particular transform-domain, which can be exploited to compress the dense data in one extremely storage-efficient tensor format when the data is fully sampled. In the more realistic case of missing data, we can use interpolation techniques based on the same tensor format to recover fully sampled data volume in compressed form. In either case, once we have our data represented in its compressed tensor form, we design an algorithm to extract source or receiver gathers directly from the compressed parameters. This extraction process can be done on-the-fly directly on the compressed data, in the full wave- form inversion context, and does not require scanning through the entire dataset in order to form shot gathers. To the best of our knowledge, this work is one of the first major contributions to working with seismic data applications directly in the compressed domain without reconstructing the entire data volume. We use a stochastic inversion approach, which works with small subsets of source experiments at each iteration, further to reduce the computational and memory costs of full waveform inversion. We also demonstrate how this data compression and extraction technique can be ap- plied to forming full subsurface image gathers through probing techniques.

Notes

(MSc)

URLhttps://www.slim.eos.ubc.ca/Publications/Public/Thesis/2018/zhang2018THlss/zhang2018THlss.pdf
Presentation

https://www.slim.eos.ubc.ca/Publications/Public/Thesis/2018/zhang2018THl...

Citation Keyzhang2018THlss