LINEAR ALGEBRA TECHNOLOGIES LTD has a total of 21 patent applications. Its first patent ever was published in 2009. It filed its patents most often in WIPO (World Intellectual Property Organization), Republic of Korea and United States. Its main competitors in its focus markets computer technology, audio-visual technology and basic communication technologies are SAKATA KOTARO, BEIJING DIGIBIRD TECH CO LTD and FRIEDLANDER STEVEN.
# | Country | Total Patents | |
---|---|---|---|
#1 | WIPO (World Intellectual Property Organization) | 6 | |
#2 | Republic of Korea | 4 | |
#3 | United States | 4 | |
#4 | China | 2 | |
#5 | EPO (European Patent Office) | 2 | |
#6 | United Kingdom | 2 | |
#7 | Romania | 1 |
# | Industry | |
---|---|---|
#1 | Computer technology | |
#2 | Audio-visual technology | |
#3 | Basic communication technologies | |
#4 | Environmental technology |
# | Technology | |
---|---|---|
#1 | Television | |
#2 | Electric digital data processing | |
#3 | Image data processing | |
#4 | Code conversion | |
#5 | Climate change mitigating computer technologies | |
#6 | Display controls |
# | Name | Total Patents |
---|---|---|
#1 | Moloney David | 14 |
#2 | Ivanov Yuri | 6 |
#3 | Barry Brendan | 6 |
#4 | Donohoe David | 6 |
#5 | Richmond Richard | 5 |
#6 | Connor Fergal | 4 |
#7 | Vesa Ovidiu Andrei | 2 |
#8 | Brick Cormac | 2 |
#9 | O'Riordan Martin | 1 |
#10 | Moloney Davi | 1 |
Publication | Filing date | Title |
---|---|---|
US2015146038A1 | Apparatus, systems, and methods for removing shading effect from image | |
US2015046678A1 | Apparatus, systems, and methods for providing configurable computational imaging pipeline | |
US2015138405A1 | Apparatus, systems, and methods for removing noise from an image | |
RO129804A0 | Apparatus, system and method for manufacturing an extensible configurable tape for processing images | |
KR20130095179A | Broadcast video decoder with reduced memory and processing requirements suitable for handheld and mobile applications | |
GB201001312D0 | Mashbox | |
GB201000197D0 | Sparse matrix vector multiplier using a bit map of non-zero elements to control scheduling of arithmetic operations |