Organization.Organization History

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August 17, 2012, at 03:24 PM by 138.96.201.175 -
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(:title Project organization:)
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simulation tools
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simulation tools.

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August 16, 2012, at 03:59 PM by 138.96.201.175 -
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!!! [[External partners/External partners]]
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!!!! [[External partners/External partners]]
August 16, 2012, at 02:50 PM by 138.96.201.175 -
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!!!! [[Associated project-teams/Associated project-teams]]
!!! [[External partners/External partners]]
June 22, 2012, at 03:25 PM by 138.96.201.175 -
June 22, 2012, at 03:24 PM by 138.96.201.175 -
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(:div class="Organization":)
!!!! [[Core project-teams/Core project-teams]]
(:divend:)
June 22, 2012, at 03:15 PM by 138.96.201.175 -
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-> Computer scientists whose research and development activities aim at exploiting the processing capabilities and raw performances of massively parallel systems.

-> Algorithmists that propose algorithms and contribute to generic libraries and core solvers in order to take benefit from all the parallelism levels with the main goal of optimal scaling on very large numbers of computing entities.

-> Numerical mathematicians that are studying numerical schemes and scalable solvers for systems of partial differential equations in view of large-scale numerical simulation of complex physical phenomena.

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* Computer scientists whose research and development activities aim at exploiting the processing capabilities and raw performances of massively parallel systems.

* Algorithmists that propose algorithms and contribute to generic libraries and core solvers in order to take benefit from all the parallelism levels with the main goal of optimal scaling on very large numbers of computing entities.

* Numerical mathematicians that are studying numerical schemes and scalable solvers for systems of partial differential equations in view of large-scale numerical simulation of complex physical phenomena.
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June 22, 2012, at 03:15 PM by 138.96.201.175 -
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-> Computer science topics which will be in the spirit of this project upstream from the core topics which are centered on the development of high performance numerical schemes and algorithms, and that will deal with some issues that are crucial for exploiting the processing capabilities and raw performances of massively parallel heterogeneous systems.

-> Algorithmic aspects in the broad sense with emphasis on the development of generic numerical libraries and solvers in order to benefit from all the parallelism levels with the main goal of optimal scaling on very large numbers of computing entities, taking into account resilience issues.

-> Robustness, accuracy and scalability issues of numerical schemes independently of a particular physical context (i.e. generic design issues of high performance numerical schemes for systems of partial differential equations).
to:
* Computer science topics which will be in the spirit of this project upstream from the core topics which are centered on the development of high performance numerical schemes and algorithms, and that will deal with some issues that are crucial for exploiting the processing capabilities and raw performances of massively parallel heterogeneous systems.

* Algorithmic aspects in the broad sense with emphasis on the development of generic numerical libraries and solvers in order to benefit from all the parallelism levels with the main goal of optimal scaling on very large numbers of computing entities, taking into account resilience issues.

* Robustness, accuracy and scalability issues of numerical schemes independently of a particular physical context (i.e. generic design issues of high performance numerical schemes for systems of partial differential equations).
June 22, 2012, at 03:08 PM by 138.96.201.175 -
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June 15, 2012, at 05:01 PM by 138.96.201.175 -
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June 15, 2012, at 05:00 PM by 138.96.201.175 -
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-> Numerical mathematicians that are studying numerical schemes and scalable solvers for systems of PDEs in view of large-scale numerical simulation of complex physical phenomena.
to:
-> Numerical mathematicians that are studying numerical schemes and scalable solvers for systems of partial differential equations in view of large-scale numerical simulation of complex physical phenomena.
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At the intermediate level, the activities will be concerned with the study of the systems of PDEs that model the scientific and engineering use cases considered in the project. Topics of interest include 9 discretization in space of underlying systems of PDEs (high order approximation, adaptivity, etc.), solution algorithms based on continuous models (domain decomposition algorithms, physics based preconditioners, etc.) and numerical methods adapted to multiscale and multiphysics problems.
to:
At the intermediate level, the activities will be concerned with the study of the systems of partial differential equations that model the scientific and engineering use cases considered in the project. Topics of interest include 9 discretization in space of underlying systems of partial differential equations (high order approximation, adaptivity, etc.), solution algorithms based on continuous models (domain decomposition algorithms, physics based preconditioners, etc.) and numerical methods adapted to multiscale and multiphysics problems.
June 15, 2012, at 04:59 PM by 138.96.201.175 -
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> Robustness, accuracy and scalability issues of numerical schemes independently of a particular physical context (i.e. generic design issues of high performance numerical schemes for systems of partial differential equations).
to:
-> Robustness, accuracy and scalability issues of numerical schemes independently of a particular physical context (i.e. generic design issues of high performance numerical schemes for systems of partial differential equations).
June 15, 2012, at 04:59 PM by 138.96.201.175 -
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simulation tools:

-> Level 1 (bottom level): towards generic and scalable numerical
algorithms. At the bottom level, the expected contributions will be
concerned with:

– Computer science topics which will be in the spirit of this project
upstream from the core topics which are centered on the development of
high performance numerical schemes and algorithms, and that will deal
with some issues that are crucial for exploiting the processing
capabilities and raw performances of massively parallel heterogeneous
systems.

– Algorithmic aspects in the broad sense with emphasis on the
development of generic numerical libraries and solvers in order to
benefit from all the parallelism levels with the main goal of optimal
scaling on very large numbers of computing entities, taking into
account resilience issues. – Robustness, accuracy and scalability
issues of numerical schemes independently of a particular physical
context (i.e. generic design issues of high performance numerical
schemes for systems of partial differential equations).

Associated activities will be undertaken by researchers from INRIA
project-teams that will define the core of the project partnership,
gathering:

– Computer scientists whose research and development activities aim at
exploiting the process- ing capabilities and raw performances of
massively parallel systems.

– Algorithmists that propose algorithms and contribute to generic
libraries and core solvers in order to take benefit from all the
parallelism levels with the main goal of optimal scaling on very large
numbers of computing entities.

– Numerical mathematicians that are studying numerical schemes and
scalable solvers for sys- tems of PDEs in view of large-scale
numerical simulation of complex physical phenomena.

• Level 2 (intermediate level): towards robust, accurate and highly
scalable numerical schemes for complex physical problems.

At the intermediate level, the activities will be concerned with the
study of the systems of PDEs that model the scientific and engineering
use cases considered in the project. Topics of interest include 9
discretization in space of underlying systems of PDEs (high order
approximation, adaptivity, etc.), solution algorithms based on
continuous models (domain decomposition algorithms, physics based
preconditioners, etc.) and numerical methods adapted to multiscale and
multiphysics problems.

These activities will be undertaken by the numerical mathematicians of
the core project-teams and from researchers of associated INRIA
project-teams that are experts of the underlying physical models and
potential users of HPC facilities (these associated teams do not
consider HPC as a central topic of their activities and typically rely
on the methodologies and tools proposed by the researchers form the
core project-teams).

• Level 3 (top level): towards exascale computing for the simulation
of frontier problems. At the top level, the activities will be
concerned with the deployment of large-scale simulations using high
performance numerical computing methodologies resulting from the
activities undertaken in the bottom and intermediate levels. Numerical
results will be validated through comparisons with existing simulation
tools in the user community (when this will be possible) or with
results published in reference papers of the considered application
domains. The success of these demonstration activities will greatly
rely on the involvement of external partners from research
laboratories or industrial groups that will help in defining and
dimensioning a number of frontier problems.
to:
simulation tools

>> clip <<
Level 1 (bottom level): towards generic and scalable numerical algorithms. At the bottom level, the expected contributions will be concerned with:

-> Computer science topics which will be in the spirit of this project upstream from the core topics which are centered on the development of high performance numerical schemes and algorithms, and that will deal with some issues that are crucial for exploiting the processing capabilities and raw performances of massively parallel heterogeneous systems.

-> Algorithmic aspects in the broad sense with emphasis on the development of generic numerical libraries and solvers in order to benefit from all the parallelism levels with the main goal of optimal scaling on very large numbers of computing entities, taking into account resilience issues.

–> Robustness, accuracy and scalability issues of numerical schemes independently of a particular physical context (i.e. generic design issues of high performance numerical schemes for systems of partial differential equations).

Associated activities will be undertaken by researchers from INRIA project-teams that will define the core of the project partnership, gathering:

-> Computer scientists whose research and development activities aim at exploiting the processing capabilities and raw performances of massively parallel systems.

-> Algorithmists that propose algorithms and contribute to generic libraries and core solvers in order to take benefit from all the parallelism levels with the main goal of optimal scaling on very large numbers of computing entities.

-> Numerical mathematicians that are studying numerical schemes and scalable solvers for systems of PDEs in view of large-scale numerical simulation of complex physical phenomena.

>> clip <<

Level 2 (intermediate level): towards robust, accurate and highly scalable numerical schemes for complex physical problems.

At the intermediate level, the activities will be concerned with the study of the systems of PDEs that model the scientific and engineering use cases considered in the project. Topics of interest include 9 discretization in space of underlying systems of PDEs (high order approximation, adaptivity, etc.), solution algorithms based on continuous models (domain decomposition algorithms, physics based preconditioners, etc.) and numerical methods adapted to multiscale and multiphysics problems.

These activities will be undertaken by the numerical mathematicians of the core project-teams and from researchers of associated INRIA project-teams that are experts of the underlying physical models and potential users of HPC facilities (these associated teams do not consider HPC as a central topic of their activities and typically rely on the methodologies and tools proposed by the researchers form the core project-teams).

>> clip <<

Level 3 (top level): towards exascale computing for the simulation of frontier problems. At the top level, the activities will be concerned with the deployment of large-scale simulations using high performance numerical computing methodologies resulting from the activities undertaken in the bottom and intermediate levels. Numerical results will be validated through comparisons with existing simulation tools in the user community (when this will be possible) or with results published in reference papers of the considered application domains. The success of these demonstration activities will greatly rely on the involvement of external partners from research laboratories or industrial groups that will help in defining and dimensioning a number of frontier problems.
June 15, 2012, at 04:54 PM by 138.96.201.175 -
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Level 1 (bottom level): towards generic and scalable numerical
to:
-> Level 1 (bottom level): towards generic and scalable numerical
June 15, 2012, at 04:54 PM by 138.96.201.175 -
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The foreseen contributions of the project address a three-layer stack,
from building block numerical algorithms to large-scale numerical
simulation tools:

• Level 1 (bottom level): towards generic and scalable numerical
algorithms. At the bottom level, the expected contributions will be
concerned with:

– Computer science topics which will be in the spirit of this project
upstream from the core topics which are centered on the development of
high performance numerical schemes and algorithms, and that will deal
with some issues that are crucial for exploiting the processing
capabilities and raw performances of massively parallel heterogeneous
systems.

– Algorithmic aspects in the broad sense with emphasis on the
development of generic numerical libraries and solvers in order to
benefit from all the parallelism levels with the main goal of optimal
scaling on very large numbers of computing entities, taking into
account resilience issues. – Robustness, accuracy and scalability
issues of numerical schemes independently of a particular physical
context (i.e. generic design issues of high performance numerical
schemes for systems of partial differential equations).

Associated activities will be undertaken by researchers from INRIA
project-teams that will define the core of the project partnership,
gathering:

– Computer scientists whose research and development activities aim at
exploiting the process- ing capabilities and raw performances of
massively parallel systems.

– Algorithmists that propose algorithms and contribute to generic
libraries and core solvers in order to take benefit from all the
parallelism levels with the main goal of optimal scaling on very large
numbers of computing entities.

– Numerical mathematicians that are studying numerical schemes and
scalable solvers for sys- tems of PDEs in view of large-scale
numerical simulation of complex physical phenomena.

• Level 2 (intermediate level): towards robust, accurate and highly
scalable numerical schemes for complex physical problems.

At the intermediate level, the activities will be concerned with the
study of the systems of PDEs that model the scientific and engineering
use cases considered in the project. Topics of interest include 9
discretization in space of underlying systems of PDEs (high order
approximation, adaptivity, etc.), solution algorithms based on
continuous models (domain decomposition algorithms, physics based
preconditioners, etc.) and numerical methods adapted to multiscale and
multiphysics problems.

These activities will be undertaken by the numerical mathematicians of
the core project-teams and from researchers of associated INRIA
project-teams that are experts of the underlying physical models and
potential users of HPC facilities (these associated teams do not
consider HPC as a central topic of their activities and typically rely
on the methodologies and tools proposed by the researchers form the
core project-teams).

• Level 3 (top level): towards exascale computing for the simulation
of frontier problems. At the top level, the activities will be
concerned with the deployment of large-scale simulations using high
performance numerical computing methodologies resulting from the
activities undertaken in the bottom and intermediate levels. Numerical
results will be validated through comparisons with existing simulation
tools in the user community (when this will be possible) or with
results published in reference papers of the considered application
domains. The success of these demonstration activities will greatly
rely on the involvement of external partners from research
laboratories or industrial groups that will help in defining and
dimensioning a number of frontier problems.
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