- When the gradients of all tasks are in the same direction, then it is called gradient agreement, and when the gradient of some tasks differ greatly from others, then it is called gradient disagreement.
- The update equation in gradient agreement can be expressed as .
- Weights are proportional to the inner product of the gradients of a task and the average of gradients of all of the tasks in the sampled batch of tasks.
-
The weights are calculated as follows:
- The normalization factor is proportional to the inner product of and .
- If the gradient of a task is in the same direction as the average gradient of all tasks in a sampled batch of tasks, then we can increase its weights so that it'll contribute more when updating our model parameter. Similarly,...
Germany
Slovakia
Canada
Brazil
Singapore
Hungary
Philippines
Mexico
Thailand
Ukraine
Luxembourg
Estonia
Lithuania
Norway
Chile
United States
Great Britain
India
Spain
South Korea
Ecuador
Colombia
Taiwan
Switzerland
Indonesia
Cyprus
Denmark
Finland
Poland
Malta
Czechia
New Zealand
Austria
Turkey
France
Sweden
Italy
Egypt
Belgium
Portugal
Slovenia
Ireland
Romania
Greece
Argentina
Malaysia
South Africa
Netherlands
Bulgaria
Latvia
Australia
Japan
Russia