tutorial_subsystem

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tutorial_subsystem [2014/07/14 11:51] guillaume [Extension domain] |
tutorial_subsystem [2017/04/19 13:31] |
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- | ======SubSystem in Alpha====== | ||

- | In this tutorial, we will present how to write structured alpha programs with subsystems, and we will present the associated transformations. | ||

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- | ====Syntax of Use Equation (without extension domain)==== | ||

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- | Let us assume that we want to compute the mean of the values of a vector. It is feasible through the following Alpha system: | ||

- | <sxh alphabets; gutter:false> | ||

- | affine mean {N | N>0} | ||

- | input | ||

- | float A {k | 0<=k<N}; | ||

- | output | ||

- | float C {|}; | ||

- | local | ||

- | float temp {|}; | ||

- | let | ||

- | temp = reduce(+, [k], A[k]); | ||

- | C = temp / N; | ||

- | . | ||

- | </sxh> | ||

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- | However, let us assume that you already have another Alpha system which computes the sum of the elements of a vector. It is possible to use this affine system (instead of rewriting its equation in the main system), by calling it through a **use equation**: | ||

- | <sxh alphabets; gutter:false> | ||

- | affine sum {P| P>0} // Computes the sum of the elements of a vector of size P | ||

- | input | ||

- | float vect {i | 0<=i<P }; | ||

- | output | ||

- | float Res; | ||

- | let | ||

- | Res = reduce(+, [k], vect[k]); | ||

- | . | ||

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- | affine mean {N | N>0} | ||

- | input | ||

- | float A {k | 0<=k<N}; | ||

- | output | ||

- | float C {|}; | ||

- | local | ||

- | float temp {|}; | ||

- | let | ||

- | use sum[N] (A) returns (temp); // Compute "temp" using the system "sum" | ||

- | C = temp / N; | ||

- | . | ||

- | </sxh> | ||

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- | The system "mean" is calling the system "sum" (which is called a subsystem). The subsystem is called with the parameter "N" and the input "A". After doing its computation, the result of "sum" will be stored inside the local variable "temp". | ||

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- | In general, the syntax of a use equation is the following: | ||

- | <sxh alphabets; gutter:false> | ||

- | use subsystem_name[list of parameters] (list of input expressions) returns (list of output variables); | ||

- | </sxh> | ||

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- | If your subsystem has several parameters/inputs/outputs, you have to provide them in the order in which they are declared. | ||

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- | ====Extension domain==== | ||

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- | Let us assume that you have a system which computes a dot product of two vectors: | ||

- | <sxh alphabets; gutter:false> | ||

- | affine dotProduct {N | N>0} | ||

- | input | ||

- | float v1 {k | 0<=k<N}; | ||

- | float v2 {k | 0<=k<N}; | ||

- | output | ||

- | float Res {|}; | ||

- | let | ||

- | Res = reduce(+, [k], v1[k]*v2[k]); | ||

- | . | ||

- | </sxh> | ||

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- | If you want to compute a matrix vector multiplication using this affine system, you will need to instanciate it once per rows of the matrix. Thus, you will need a parametrised number of call to the "dotProduct" system. | ||

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- | It is possible to do it by using an extension domain: | ||

- | <sxh alphabets; gutter:false> | ||

- | affine dotProduct {N | N>0} | ||

- | input | ||

- | float v1 {k | 0<=k<N}; | ||

- | float v2 {k | 0<=k<N}; | ||

- | output | ||

- | float Res {|}; | ||

- | let | ||

- | Res = reduce(+, [k], v1[k]*v2[k]); | ||

- | . | ||

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- | affine matrixVectorProduct {R,S | (R,S)>0} | ||

- | input | ||

- | float mat {i,j | 0<=i<R && 0<=j<S }; | ||

- | float vect {j | 0<=j<S}; | ||

- | output | ||

- | float vectRes {i | 0<=i<R}; | ||

- | let | ||

- | use {k | 0<=k<R} dotProduct[R] ( mat, (k,j->j)@vect) returns (vectRes); | ||

- | . | ||

- | </sxh> | ||

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- | The set "{k | 0≤k<R}" before the subsystem name is called the **extension domain**. We are calling the system "dotProduct" once, for each instance of "k" in the extension domain. We can use the indexes of the extension domain to parametrize the parameters, inputs given to the subsystem and the outputs computed by the subsystem: | ||

- | - the indexes can be used to specify the parameters (ex: "R+k") | ||

- | - the first dimensions of the input expressions correspond to the dimensions of the extension domain. For example, each row of "mat" will be sent to a different instance of the subsystem (ex: in the previous example, the third instance of "dotProduct" will receive "(j->3,j)@mat" and "(j->j)@vect" as inputs). | ||

- | - the first dimensions of the output variables correspond to the dimensions of the extension domain. All the results from every subsystem call are gathered inside common variables (ex: "vectRes[3]" is the output of the third instance of "dotProduct") | ||

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- | Apart from the compatibility of dimensions, the input expressions must be defined at least on the points asked by the subsystem, and the output variable must be defined on a subset of the domain of the subsystem output. | ||

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- | ====Transformations involving subsystems==== | ||

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- | **InlineSubSystem:** Inline the equations of a subsystem inside the affine system calling it. The use equation of the main system is replaced by the equations of the subsystem (which are adapted), and new local variables are added. | ||

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- | **OutlineSubSystem:** Given a list of equations of an affine systemm, outline them inside a new system and replace these equation by a use equation. The current version (July 2014) do not allow to specify an extension domain, however this is a work in progress. |

tutorial_subsystem.txt · Last modified: 2017/04/19 13:31 (external edit)