## Table Of Contents

This sample application( ZoomInterpolation ) demonstrates the
implementation of Bi-Linear interpolation and Bi-Cubic interpolation in a GLSL
shader. When a small region of input image is displayed to large area, interpolation is a required factor. If we provide better interpolation, the output image quality will be high. Interpolation is a "Process used to estimate an unknown value between two known values by utilizing a common mathematical relation". ZoomInterpolatoin allows to create zoomed image with different interpolation types.

Screenshot of ZoomInterpolation Application.

In OpenGL, we can specify an interpolation type(Filter type)
to create a resized image of texture. When a texture or region of a texture is
mapped to a higher or lower screen region, OpenGL uses this interpolation type
to create texture image in different size.

To create a large image from a small texture area, OpenGL
provides two interpolation options, GL_NEAREST, and GL_LINEAR. OpenGL texture mapping provides a maximum of 2*2 Bi-Linear interpolation. In addition to OpenGL interpolation types, here different versions of Bi-Cubic interpolation is implemented
in pixel shaders.

##

GL_NEAREST just copies data available in nearest pixel and
it create a blocky effect when a very small region is zoomed to a high screen region. In nearest interpolation,
intermediate pixels are created with nearest valid pixel. This kind of interpolated
images are blocky since same data is copied to intermediate pixels.

Below image is created through OpenGL GL_NEAREST
interpolation and its quality is very bad. Edge of the flower seems to be a "stair case". We can remove this stair case through better interpolation methods.

Interpolation with GL_NEAREST interpolation type.

We can use the following code to achieve nearest interpolation in OpenGL fixed function pipeline.

glTexParameteri( GL_TEXTURE_2D,GL_TEXTURE_MAG_FILTER, GL_NEAREST);
glTexParameteri( GL_TEXTURE_2D,GL_TEXTURE_MIN_FILTER, GL_NEAREST);

OpenGL provides a good interpolation method, GL_LINEAR. It
interpolates nearest 4 pixels and creates a smooth image comparing to the
GL_NEAREST method. This method interpolate both in X direction and Y direction. Therefore it called Bi-Linear interpolation.

The following image is created through GL_LINEAR
interpolation and its edges are smooth when comparing to the image created
through GL_NEAREST interpolation. Here "stair case" effect is not visible. But we can see a shade of yellow and green through the edge of flower, and a small "stair case" is visible some edge of the flower.

Interpolation with GL_LINEAR interpolation type.

The following code can be used to achieve Bi-Linear interpolation in OpenGL fixed function pipeline.

glTexParameteri( GL_TEXTURE_2D,GL_TEXTURE_MAG_FILTER, GL_LINEAR );
glTexParameteri( GL_TEXTURE_2D,GL_TEXTURE_MIN_FILTER, GL_LINEAR );

OpenGL provides only two interpolations methods to create zoomed display of a image(texture). These interpolation methods are not enough when a very small image is zoomed
to large area. We can see small blocky effect in the above image ( GL_LINEAR ).

The first step to create a better interpolation method is to create Bi-Linear interpolation( Which is same as that of OpenGL GL_NEAREST interpolation). This Bi-Linear interpolation is implemented in a pixel shader.

A pixel shader is a program which will execute for each pixels of a rendering. More details of Pixel Shaders are avaialable at http://en.wikipedia.org/wiki/Pixel_shader or http://nehe.gamedev.net/article/glsl_an_introduction/25007/

### Bi-Linear Shader Implementation

In Bi-Linear interpolation nearest four pixels
are considered to create an intermediate pixel.

In the above figure an intermediate pixel F(p’,q’) is created
by interpolating nearest four texels F(p,q), F(p,q+1), F(p+1,q), F(p+1,q+1).

Texel is the term used to indicate an element in a texture(
similar to a pixel in screen)[A texel, or texture element (also texture pixel) is the fundamental unit of texture space].

Initially two texels in top row and bottom row are interpolated with linear interpolation[horizontal]. Then the interpolated pixels of the top row and bottom row are also linearly interpolated[vertical]. Explanation with code will help to understand the above description.

An interpolation factor a, is used in X direction to
interpolate F(p,q) and F(p,q+1) as follows.

F(p’’) = a * F(p,q) + (1.0 – a ) F(p, q+1) F(p+1’’) = a * F(p+1,q) + (1.0 – a ) F(p+1, q+1)

An interpolation factor b, is used in Y direction to
interpolate F(p’’)and F(p+1’’) as follows.

F(p’,q’) = b * F(p’’) + (1.0 - b) * F(p+1’’)

Corresponding GLSL shader code.

vec4 tex2DBiLinear( sampler2D textureSampler_i, vec2 texCoord_i )
{
vec4 p0q0 = texture2D(textureSampler_i, texCoord_i);
vec4 p1q0 = texture2D(textureSampler_i, texCoord_i + vec2(texelSizeX, 0));
vec4 p0q1 = texture2D(textureSampler_i, texCoord_i + vec2(0, texelSizeY));
vec4 p1q1 = texture2D(textureSampler_i, texCoord_i + vec2(texelSizeX , texelSizeY));
float a = fract( texCoord_i.x * fWidth );
vec4 pInterp_q0 = mix( p0q0, p1q0, a ); vec4 pInterp_q1 = mix( p0q1, p1q1, a );
float b = fract( texCoord_i.y * fHeight ); return mix( pInterp_q0, pInterp_q1, b ); }

In this method nearest 16 pixels are used to
create an intermediate pixel F(p’q’). In the below figure an intermediate pixel F(p'q')[Near to F(p',q')] is created by interpolating nearest 4*4 pixels from F( p-1, q-1) to F(p+2,q+2). Details of this interpolation is explained with the help of code and some equations.

Following equation [from *Digital
Image Processing: PIKS Inside, Third Edition*] is used to interpolate
nearest 16 pixles. First two sigma(**Σ)** are 2 for loops in the shader code.

Where Rc() denotes a Bi-Cubic interpolation function such as a BSpline, Traingular, Bell cubic interpolation function. In this sample I just use a Triangular, Bell, and B-Spline interpolation function. F(p+m,q+n) indicate texel data at location (p+m, q+n).

Following is a GLSL shader code for Bi-Cubic Interpolation.

vec4 BiCubic( sampler2D textureSampler, vec2 TexCoord )
{
float texelSizeX = 1.0 / fWidth; float texelSizeY = 1.0 / fHeight; vec4 nSum = vec4( 0.0, 0.0, 0.0, 0.0 );
vec4 nDenom = vec4( 0.0, 0.0, 0.0, 0.0 );
float a = fract( TexCoord.x * fWidth ); float b = fract( TexCoord.y * fHeight ); for( int m = -1; m <=2; m++ )
{
for( int n =-1; n<= 2; n++)
{
vec4 vecData = texture2D(textureSampler,
TexCoord + vec2(texelSizeX * float( m ), texelSizeY * float( n )));
float f = Triangular( float( m ) - a );
vec4 vecCooef1 = vec4( f,f,f,f );
float f1 = Triangular ( -( float( n ) - b ) );
vec4 vecCoeef2 = vec4( f1, f1, f1, f1 );
nSum = nSum + ( vecData * vecCoeef2 * vecCooef1 );
nDenom = nDenom + (( vecCoeef2 * vecCooef1 ));
}
}
return nSum / nDenom;
}

`BiCubic() `

function get a texture coordinate (x,y) and returns the interpolated value of nearest 16 texels.

Nearest 16 texels are iterated through 2 for loops from [x-1,y-1] to [x+2, y+2].

for( int m = -1; m <=2; m++ )
{
for( int n =-1; n<= 2; n++)

For each nearest element an interpolation factor is calculated with the corresponding Bi-Cubic interpolation function. In the above `BiCubic`

() function `Triangular`

() is used to get an interpolation factor. Different versions of Bi-Cubic interpolation[BSpline, Traingular, Bell] can be created by changing `Triangular`

() and its logic. When plotting values from `Triangular`

(), we will get the below image in a triangle form.

From plotting of triangular function, left most value of X axis is -2 and right most value of X axis is +2. `Triangular`

(x) is plotted in Y direction. It indicates `Triangular`

function returns lower value for a high input and high value for a low input. The return value of `Triangular`

() is multiplied with current data. Therefore low weight is multiplied to far texels and high weight is multiplied to nearest texels. In effect an intermediate pixel is created by interpolating nearest 16 data. The weightage will be higher for nearest pixels. The output image of Triangular Bi-Cubic is smoother than Bi-Linear.

**Implementation of Bi-Cubic Interpolation[ Triangular ] **

Triangular function is a simple Bi-Cubic function, as defined in the following equation.

Here return value of R(x) is x+1 when x is between -1 and 0, and return value is x+1 when x is between 0 and 1. Following pseudo code gives more idea of triangular function. This function provides a low value for high input and a high value for a low input.

if( -1 < x && x <= 0 )
{
return x + 1
}
else if( 0 < x && x <= 1 )
{
return x - 1
}

Above diagram is the output of `Triangular`

() function. `Triangular`

(x) is plotted in Y direction. x starts from -1.0 and ends at +1.0. It indicate when x is high, `Triangular`

(x) is low and therefore far data of an intermediate texel get low weight. And a near texel will get high weight.

The following code is used in GLSL shader for Triangular Bi-Cubic implementation.

float Triangular( float f )
{
f = f / 2.0;
if( f < 0.0 )
{
return ( f + 1.0 );
}
else
{
return ( 1.0 - f );
}
return 0.0;
}

Interpolation with GLSL Bi-Cubic Triangular interpolation type.

## Implementation of Bi-Cubic Interpolation[ Bell ]

When comparing the Bi-Cubic
Triangular image quality is increased. But blurred effect can be seen. The reason of this blurred edge is weight returned from `Triangular`

() for near and far texel. If weight of near texel is high and far texel is very low, then Bi-Cubic interpolation can
achieve a smooth edges. Another Bi-Cubic
interpolation funciton which creates a bell shaped( nearest values[Center] are
high) and far values are low[left and right ends].

Above equation has three conditions to create the following curve. Corresponding code is implemented in `BellFunc`

(). If we plot the input values from -2 to +2 of BellFunc()in a graph we will get the following curve. Where X direction contain x provided to `BellFunc`

and Y direction is corresponding return value[`BellFunc(x)`

].

The above diagram indicates when x is high, `BellFunc`

(x) is very low therefore far data of an intermediate texel get very low weight. For nearest texel `BellFunc`

(x) is high and get a high weight.

The following code is used in GLSL shader for Bell shaped Bi-Cubic implementation.

float BellFunc( float x )
{
float f = ( x / 2.0 ) * 1.5; if( f > -1.5 && f < -0.5 )
{
return( 0.5 * pow(f + 1.5, 2.0));
}
else if( f > -0.5 && f < 0.5 )
{
return 3.0 / 4.0 - ( f * f );
}
else if( ( f > 0.5 && f < 1.5 ) )
{
return( 0.5 * pow(f - 1.5, 2.0));
}
return 0.0;
}

Interpolation with Bi-Cubic Bell interpolation type.

## Implementation of Bi-Cubic Interpolation[ B-Spline ]

When comparing the Bi-Cubic Bell shaped, B spline is smoother and edges are more clear. Below equation is used to create BSpline() function.

The code of this equation is implemented in `BSpline`

() function.

Above diagram is the output of `BSpline`

() function. `BSpline`

(x) is plotted in Y direction. x starts from -2.0 and ends at +2.0. It indicate when x is high, BSpline(x) is very low and therefore far data of an intermediate texel get very lower weight. When comparing to Bell shaped wave, values in far range ( near -2 and +2 ) are very low. Therefore final output image is also smoother than Bell Bi-Cubic interpolated image. The following code is used in GLSL shader for BSpline implementation.

float BSpline( float x )
{
float f = x;
if( f < 0.0 )
{
f = -f;
}
if( f >= 0.0 && f <= 1.0 )
{
return ( 2.0 / 3.0 ) + ( 0.5 ) * ( f* f * f ) - (f*f);
}
else if( f > 1.0 && f <= 2.0 )
{
return 1.0 / 6.0 * pow( ( 2.0 - f ), 3.0 );
}
return 1.0;
}

Interpolation with Bi-Cubic BSpline interpolation type.

## About ZoomInterpolation Application:

ZoomInterpolation is an application created to demonstrate different interpolation methods. On startup it creates a texture with a bitmap [Flower.bmp] available in resource of this application.

BMPLoader BMPLoadObj; BYTE* pbyData = 0;
BMPLoadObj.LoadBMP( IDB_BITMAP_FLOWER, m_nImageWidth, m_nImageHeight, pbyData );
m_glTexture.Create( m_nImageWidth, m_nImageHeight, pbyData );

This application displays two images, zoomed image is in left, and actual image is at right side. Two viewports are used for displaying actual image and zoomed image. A red rectangle indicates the zoomed image. Small area of image is selected for texture mapping and displayed to screen.

Following code is used to draw the actual image with a RED rectangle selection.

void CZoomInterpolationDlg::DrawActualImage()
{
glViewport( 805, 10, 200, 150 );
m_glTexture.Enable();
m_glVertexBuffer.DrawVertexBuffer( GL_QUADS );
m_glTexture.Disable();
glColor3f( 1.0, 0.0, 0.0 );
float fXStart = m_fXOffset * 2;
float fYStart = m_fYOffset * 2;
float fWidth = m_fZoomWidth * 2;
float fHeight = m_fZoomHeight * 2;
glBegin( GL_LINE_LOOP );
glVertex2d( -1.0 + fXStart , -1.0 + fYStart );
glVertex2d( -1.0 + fXStart + fWidth, -1.0 + fYStart );
glVertex2d( -1.0 + fXStart + fWidth, -1.0 + fYStart + fHeight );
glVertex2d( -1.0 + fXStart , -1.0 + fYStart + fHeight );
glVertex2d( -1.0 + fXStart , -1.0 + fYStart );
glColor3f( 1.0, 1.0, 1.0 );
glEnd();
}

The following code is used to create the zoomed image with current interpolation.

void CZoomInterpolationDlg::DrawZoomedImage()
{
glViewport( 0, 0, 800, 600 );
if( 0 != m_pShader )
{
m_pShader->EnableShader();
if( !m_pShader->SetTexture( "ImageTexture", m_glTexture.GetTextureID() ))
{
TRACE( L"SetTexture failed" );
}
if( !m_pShader->SetParam( "fWidth", m_nImageWidth ))
{
TRACE( L"SetTexture failed" );
}
if( !m_pShader->SetParam( "fHeight", m_nImageHeight ))
{
TRACE( L"SetTexture failed" );
}
m_glVertexBufferZoom.DrawVertexBuffer( GL_QUADS );
m_pShader->DisableShader();
}
else
{
m_glTexture.Enable();
m_glVertexBufferZoom.DrawVertexBuffer( GL_QUADS );
m_glTexture.Disable();
}
}

In ZoomInterpolation a rendering area is prepared, then set two viewports to display two types images. First one displays zoomed image, and second display is a miniature of actual image. Please note the `glViewport()`

calls at the first step of `CZoomInterpolationDlg::DrawActualImage()`

and `CZoomInterpolationDlg::DrawZoomedImage().`

**Pan operation:**

When mouse clicks on zoomed image and pans, the texture mapping region changes with respect to mouse move and it creates a pan effect.

**Zoom and UnZoom:**

When Mouse scroll, the zoom/unzoom is implemented by increasing or decreasing the texture mapping area. `CZoomInterpolationDlg::HandleZoom`

() handles zoom and unzoom. Two buttons “Zoom+” and “Zoom-“ is also added to increase zoom or decrease zoom.

**Loading new Image:**

A button “Load Image” is available to load an image file from your machine. The image area is created in an aspect ratio of 4:3[800X600 pixels]. Therefore input image is expected in an aspect ratio of 4:3 for better quality. Otherwise stretched/skewed image will be displayed. `BMPLoader`

class is used to retrieve RGB data from bitmap with the help of Gdi+ library. This class supports different image extensions such as .bmp, .jpg, .png, .tga etc.

#### Plotting of Interpolation Curve:

A simple class is created to plot the curve indicating weights applied in Bi-Cubic interpolation function. Triangular, Bell, and BSpline are plotted with the same code of GLSL shader code.

#### Main Classes Used in ZoomInterpolation Application:

`BMPLoader`

: This class is used for getting RGB information of an image file.

This class supports bmp, jpg, png, and tga format files.

`GLExtension`

: This class holds all opengl extensions required for GLSL shader.

`GLSetup`

: This class is used for creating rendering context and other opengl initialisations.

`GLVertexBuffer`

: This class holds vertex data required for rendering a Quad image withtexture mapping.

`PlotInterpCurve`

: This class draws current interpolation curve with the help of GDI.

`ZoomInterpolation`

: This class handles main operations of ZoomInterpolation Application.

All mouse move and button handling are implemented in this class.

All other classes in this application is used fromthis class.

## Limitations:

1) The input image is expected in an aspect ratio of 4:3 for better output image. Otherwise stretched/skewed image will be displayed.

2) For GLSL shader implementation, following extensions are required in your machine.

a. `GL_ARB_fragment_shader`

b. `GL_ARB_vertex_shader `

If your machine do-not have a supporting graphics device, this application will display interpolation with openGL fixed function pipeline(Nearest and Linear).

3) The shaders for different Bi-Cubic and Bi-Linear interpolation is prepared with the help some equations, I expect some issues in this code.

### References:

### History:

- 07-Aug-2011: Initial Version.
- 08-Aug-2011: Added details of ZoomInterpolation application.