# Convolutional neural network - How to get the feature maps?

I read a few books and articles about Convolutional neural network, it seems I understand the concept but I don't know how to put it up like in image below:

from 28x28 normalized pixel INPUT we get 4 feature maps of size 24x24. but how to get them ? resizing the INPUT image ? or performing image transformations? but what kind of transformations? or cutting the input image into 4 pieces of size 24x24 by 4 corner? I don't understand the process, to me it seem they cut up or resize the image to smaller images at each step. please help thanks.

-
Could you enumerate the books/articles you read for Convolutional neural network? Thanks in advance. –  lmsasu Dec 30 '11 at 13:57
It is from Neural Networks and Learning Machines, Third Edition book –  Nhu Phuong Dec 30 '11 at 15:22
I was confused too, this convolution is actually the very important part (hence the name `convolutional NN`), but most people seem to focus on explaining how the CNN works, and ignore the "how to get the feature maps" part. I was confused (and angry, too) until I found this website: www1.i2r.a-star.edu.sg/~irkhan/conn2.html It explains everything in plain English. –  Tran Son Hai Apr 20 '13 at 5:08

This is matlab help file for CONV2 function, which use in CNN Matlab (to get convolutional layers). Read it carefully and you will see your answer.

``````%CONV2 Two dimensional convolution.
%   C = CONV2(A, B) performs the 2-D convolution of matrices A and B.
%   If [ma,na] = size(A), [mb,nb] = size(B), and [mc,nc] = size(C), then
%   mc = max([ma+mb-1,ma,mb]) and nc = max([na+nb-1,na,nb]).
%
%   C = CONV2(H1, H2, A) convolves A first with the vector H1 along the
%   rows and then with the vector H2 along the columns. If n1 = length(H1)
%   and n2 = length(H2), then mc = max([ma+n1-1,ma,n1]) and
%   nc = max([na+n2-1,na,n2]).
%
%   C = CONV2(..., SHAPE) returns a subsection of the 2-D
%   convolution with size specified by SHAPE:
%     'full'  - (default) returns the full 2-D convolution,
%     'same'  - returns the central part of the convolution
%               that is the same size as A.
%     'valid' - returns only those parts of the convolution
%               that are computed without the zero-padded edges.
%               **size(C) = max([ma-max(0,mb-1),na-max(0,nb-1)],0).**
``````
-