Results 281 to 290 of about 215,067 (318)
Some of the next articles are maybe not open access.
Tile Coding Based on Hyperplane Tiles
2008In large and continuous state-action spaces reinforcement learning heavily relies on function approximation techniques. Tile coding is a well-known function approximator that has been successfully applied to many reinforcement learning tasks. In this paper we introduce the hyperplane tile coding, in which the usual tiles are replaced by parameterized ...
LOIACONO, DANIELE, LANZI, PIER LUCA
openaire +2 more sources
Tile-Makers and Semi-Tile-Makers
The American Mathematical Monthly, 2007(2007). Tile-Makers and Semi-Tile-Makers. The American Mathematical Monthly: Vol. 114, No. 7, pp. 602-609.
openaire +2 more sources
The Mathematical Gazette, 1978
Why is such a nice result rarely, if ever, found in texts? Perhaps because it is usually necessary to use trigonometry to calculate the areas of regular polygons. A regular n-gon inscribed in a unit circle has an area n times that of the isosceles triangle having an edge as base and the ...
Alexanderson, G. L., Seydel, Kenneth
openaire +2 more sources
Why is such a nice result rarely, if ever, found in texts? Perhaps because it is usually necessary to use trigonometry to calculate the areas of regular polygons. A regular n-gon inscribed in a unit circle has an area n times that of the isosceles triangle having an edge as base and the ...
Alexanderson, G. L., Seydel, Kenneth
openaire +2 more sources
On tile-k-transitive tilings of the space
Geometriae Dedicata, 1996A \(k\)-transitive tiling \((k\) being a positive integer) with respect to a crystallographic space group \(G\) of Euclidean space is a tiling whose tiles can be distributed into \(k\) classes so that \(G\) acts transitively on each class. The author considers tilings in three-dimensional euclidean space consisting of polyhedral tiles (i.e.
openaire +2 more sources
Proceedings of the 13th ACM SIGPLAN Symposium on Principles and practice of parallel programming, 2008
The importance of tiles or blocks in scientific computing cannot be overstated. Many algorithms, both iterative and recursive, can be expressed naturally if tiles are represented explicitly. From the point of view of performance, tiling, either as a code or a data layout transformation, is one of the most effective ways to exploit locality, which is a ...
Jia Guo +4 more
openaire +1 more source
The importance of tiles or blocks in scientific computing cannot be overstated. Many algorithms, both iterative and recursive, can be expressed naturally if tiles are represented explicitly. From the point of view of performance, tiling, either as a code or a data layout transformation, is one of the most effective ways to exploit locality, which is a ...
Jia Guo +4 more
openaire +1 more source
Tilings of space by knotted tiles
The Mathematical Intelligencer, 1995Whereas in the Euclidean plane a tiling by congruent tiles consists of topological disks, in Euclidean 3-space, it is possible to have tilings not only by 3-balls but also by congruent genus-\(n\) handlebodies and these can be knotted as well as unknotted. In this paper the author examines tilings of Euclidean 3-space by congruent knotted tiles.
openaire +2 more sources
OpTile: Toward Optimal Tiling in 360-degree Video Streaming
ACM Multimedia, 2017Mengbai Xiao +3 more
semanticscholar +1 more source
Irregular Phased Array Tiling by Means of Analytic Schemata-Driven Optimization
IEEE Transactions on Antennas and Propagation, 2017N. Anselmi +3 more
semanticscholar +1 more source
To Tile or not to Tile, That is the Question
2024 IEEE International Parallel and Distributed Processing Symposium Workshops (IPDPSW)Altan Haan +4 more
openaire +1 more source