Difference between revisions of "Interpolation"
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By Nexii Malthus</div> | By Nexii Malthus</div> | ||
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=== Vector List === | |||
<!--############# VECTOR LIST LINEAR #############--> | |||
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!style="color: #000000; background-color: #aaaaff;" height="20px"| | |||
Vector List, Linear | |||
|- | |||
| | |||
Interpolates between two vectors in a list of vectors. | |||
<lsl> | |||
vector pLin(list v, float t, integer Loop ){ | |||
float l = llGetListLength(v); t *= l-1; | |||
float f = (float)llFloor(t); | |||
integer i1 = 0; integer i2 = 0; | |||
if(Loop){ i1 = (integer)(f-llFloor(f/l)*l); | |||
++f;i2 = (integer)(f-llFloor(f/l)*l);} | |||
else { | |||
if( f > l-1 ) i1 = (integer)l-1; | |||
else if( f >= 0 ) i1 = (integer)f; | |||
if(f+1 > l-1 ) i2 = (integer)l-1; | |||
else if(f+1 >= 0 ) i2 = (integer)f+1; } | |||
vector v1 = llList2Vector(v, i1); | |||
vector v2 = llList2Vector(v, i2); | |||
return vLin( v1, v2, t-f );} | |||
</lsl> | |||
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| | |||
{|cellspacing="0" cellpadding="6" border="1" style="border: 1px solid #aaaaaa; margin: 1em 1em 1em 0pt; background-color: #e0e0ff; border-collapse: collapse" | |||
!style="background-color: #d0d0ee" | Input | |||
!style="background-color: #d0d0ee" | Description | |||
|- | |||
| list v | |||
| A path of vectors. | |||
|- | |||
| float t | |||
| Interpolation, Start 0.0 - 1.0 End. | |||
|- | |||
| integer Loop | |||
| Whether the list loops over. | |||
|- | |||
!style="background-color: #d0d0ee" | Output | |||
!style="background-color: #d0d0ee" | Description | |||
|- | |||
| return vector pLin | |||
| Returns a vector that is the linear interpolation of two vectors between 't'. | |||
|} | |||
| Graph goes here, k. | |||
|} | |||
<div style="float:right;font-size: 80%;"> | |||
By Nexii Malthus</div> | |||
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=== Speed Controlled === | === Speed Controlled === | ||
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By Nexii Malthus</div> | By Nexii Malthus</div> | ||
|} | |} | ||
== Old non-documented Library == | == Old non-documented Library == |
Revision as of 21:24, 23 July 2010
LSL Portal | Functions | Events | Types | Operators | Constants | Flow Control | Script Library | Categorized Library | Tutorials |
Interpolation Library
Float Functions
Float Linear | ||||||||||||||
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Linear interpolation of f0 and f1 with fraction t. <lsl> float fLin(float f0, float f1,float t){ return f0*(1-t) + f1*t;} </lsl>
By Nexii Malthus
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Float Cosine | ||||||||||||||
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Cosine interpolation of f0 and f1 with fraction t. <lsl> float fCos(float v0,float v1,float t){ float F = (1 - llCos(t*PI))/2; return v0*(1-F)+v1*F;} </lsl>
By Nexii Malthus
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Float Cubic | ||||||||||||||||||
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Cubic interpolation of f0, f1, f2 and f3 with fraction t. <lsl> float fCub(float f0,float f1,float f2,float f3,float t){ float P = (f3-f2)-(f0-f1);float Q = (f0-f1)-P;float R = f2-f0;float S = f1; return P*llPow(t,3) + Q*llPow(t,2) + R*t + S;} </lsl>
By Nexii Malthus
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Float Hermite | ||||||||||||||||||||||
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Hermite interpolation of f0, f1, f2 and f3 with fraction t, tension and bias. <lsl> float fHem(float f0,float f1,float f2,float f3,float t,float tens,float bias){ float t2 = t*t;float t3 = t2*t; float a0 = (f1-f0)*(1+bias)*(1-tens)/2; a0 += (f2-f1)*(1-bias)*(1-tens)/2; float a1 = (f2-f1)*(1+bias)*(1-tens)/2; a1 += (f3-f2)*(1-bias)*(1-tens)/2; float b0 = 2*t3 - 3*t2 + 1; float b1 = t3 - 2*t2 + t; float b2 = t3 - t2; float b3 = -2*t3 + 3*t2; return ( b0 * f1+b1 * a0+b2 * a1+b3 * f2 );} </lsl>
By Nexii Malthus
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Float Rescale | ||||||||||||||||||
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Rescales a value from one range to another range. <lsl> float fScl( float from0, float from1, float to0, float to1, float t ) { return to0 + ( (to1 - to0) * ( (from0 - t) / (from0-from1) ) ); } </lsl>
By Nexii Malthus
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Float Rescale Fixed | ||||||||||||||||||
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Rescales a value from one range to another range. The value is clamped between the range. <lsl> float fSclFix( float from0, float from1, float to0, float to1, float t ) { t = to0 + ( (to1 - to0) * ( (from0 - t) / (from0-from1) ) ); if(t < to0) t = to0; else if(t > to1) t = to1; return t; } </lsl>
By Nexii Malthus
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Vector Functions
Vector Linear | ||||||||||||||
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Linear interpolation of v0 and v1 with fraction t. <lsl> vector vLin(vector v0, vector v1,float t){ return v0*(1-t) + v1*t;} </lsl>
By Nexii Malthus
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Vector Cosine | ||||||||||||||
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Cosine interpolation of v0 and v1 with fraction t. <lsl> vector vCos(vector v0,vector v1,float t){ float F = (1 - llCos(t*PI))/2; return v0*(1-F)+v1*F;} </lsl>
By Nexii Malthus
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Vector Cubic | ||||||||||||||||||
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Cubic interpolation of v0, v1, v2 and v3 with fraction t. <lsl> vector vCub(vector v0,vector v1,vector v2,vector v3,float t){ vector P = (v3-v2)-(v1-v0);vector Q = (v1-v0)-P;vector R = v2-v1;vector S = v0; return P*llPow(t,3) + Q*llPow(t,2) + R*t + S;} </lsl>
By Nexii Malthus
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Vector Hermite | ||||||||||||||||||||||
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Hermite interpolation of v0, v1, v2 and v3 with fraction t, tension and bias. <lsl> vector vHem(vector v0,vector v1,vector v2,vector v3,float t,float tens,float bias){ float t2 = t*t;float t3 = t2*t; vector a0 = (v1-v0)*(1+bias)*(1-tens)/2; a0 += (v2-v1)*(1-bias)*(1-tens)/2; vector a1 = (v2-v1)*(1+bias)*(1-tens)/2; a1 += (v3-v2)*(1-bias)*(1-tens)/2; float b0 = 2*t3 - 3*t2 + 1; float b1 = t3 - 2*t2 + t; float b2 = t3 - t2; float b3 = -2*t3 + 3*t2; return ( b0 * v1+b1 * a0+b2 * a1+b3 * v2 );} </lsl>
By Nexii Malthus
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Rotation Functions
Rotation Linear | ||||||||||||||
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Spherical Linear interpolation of r0 and r1 with fraction t. Also known as SLERP <lsl> rotation rLin(rotation r0,rotation r1,float t){ // Spherical-Linear Interpolation float ang = llAngleBetween(r0, r1); if( ang > PI) ang -= TWO_PI; return r0 * llAxisAngle2Rot( llRot2Axis(r1/r0)*r0, ang*t);} </lsl>
By Nexii Malthus
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Rotation Cosine | ||||||||||||||
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Spherical Cosine interpolation of r0 and r1 with fraction t. I liken to call it as SCORP <lsl> rotation rCos(rotation r0,rotation r1,float t){ // Spherical-Cosine Interpolation float f = (1 - llCos(t*PI))/2; float ang = llAngleBetween(r0, r1); if( ang > PI) ang -= TWO_PI; return r0 * llAxisAngle2Rot( llRot2Axis(r1/r0)*r0, ang*f);} </lsl>
By Nexii Malthus
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Rotation Cubic | ||||||||||||||||||||||
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Spherical Cubic interpolation of r0 and r1 with fraction t. I liken to call it as SCURP <lsl> rotation rCub(rotation r0,rotation r1,rotation r2,rotation r3,float t){ // Spherical-Cubic Interpolation // r0 = Start, r1 = End, r2 and r3 affect path of curve! return rLin( rLin(r0,r1,t), rLin(r2,r3,t), 2*t*(1-t) );} </lsl>
By Nexii Malthus
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Vector List
Vector List, Linear | ||||||||||||||
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Interpolates between two vectors in a list of vectors. <lsl> vector pLin(list v, float t, integer Loop ){ float l = llGetListLength(v); t *= l-1; float f = (float)llFloor(t); integer i1 = 0; integer i2 = 0; if(Loop){ i1 = (integer)(f-llFloor(f/l)*l); ++f;i2 = (integer)(f-llFloor(f/l)*l);} else { if( f > l-1 ) i1 = (integer)l-1; else if( f >= 0 ) i1 = (integer)f; if(f+1 > l-1 ) i2 = (integer)l-1; else if(f+1 >= 0 ) i2 = (integer)f+1; } vector v1 = llList2Vector(v, i1); vector v2 = llList2Vector(v, i2); return vLin( v1, v2, t-f );} </lsl>
By Nexii Malthus
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Speed Controlled
Rotation Cosine Aim | ||||||||||||||||||
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Spherical Cosine interpolation of r0 and r1 with speed regulation. Does the entire animation loop to rotate between r0 to r1 with a specific speed, with the cosine interpolation it makes it appear to accelerate and deccelerate realistically. <lsl> rCosAim( rotation r0, rotation r1, float speed ){ float ang = llAngleBetween(r0, r1) * RAD_TO_DEG; if( ang > PI) ang -= TWO_PI; float x; float y = (ang/speed)/0.2; for( x = 0.0; x < y; x += 1.0 ) llSetRot( rCos( r0, r1, x/y ) ); } </lsl>
By Nexii Malthus
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Old non-documented Library
Changes/ 1.0-1.1 - Added rotation types 1.1-1.2 - Added Hermite for float and vector
<lsl> //===================================================// // Interpolation Library 1.2 // // "May 12 2008", "6:16:20 GMT-0" // // Copyright (C) 2008, Nexii Malthus (cc-by) // // http://creativecommons.org/licenses/by/3.0/ // //===================================================//
float fLin(float v0, float v1,float t){
return v0*(1-t) + v1*t;}
float fCos(float v0,float v1,float t){
float F = (1 - llCos(t*PI))/2; return v0*(1-F)+v1*F;}
float fCub(float v0,float v1,float v2,float v3,float t){
float P = (v3-v2)-(v0-v1);float Q = (v0-v1)-P;float R = v2-v0;float S = v1; return P*llPow(t,3) + Q*llPow(t,2) + R*t + S;}
float fHem(float v0,float v1,float v2,float v3,float t,float tens,float bias){
float t2 = t*t;float t3 = t2*t; float a0 = (v1-v0)*(1+bias)*(1-tens)/2; a0 += (v2-v1)*(1-bias)*(1-tens)/2; float a1 = (v2-v1)*(1+bias)*(1-tens)/2; a1 += (v3-v2)*(1-bias)*(1-tens)/2; float b0 = 2*t3 - 3*t2 + 1; float b1 = t3 - 2*t2 + t; float b2 = t3 - t2; float b3 = -2*t3 + 3*t2; return ( b0 * v1+b1 * a0+b2 * a1+b3 * v2 );}
vector vLin(vector v0, vector v1,float t){
return v0*(1-t) + v1*t;}
vector vCos(vector v0,vector v1,float t){
float F = (1 - llCos(t*PI))/2; return v0*(1-F)+v1*F;}
vector vCub(vector v0,vector v1,vector v2,vector v3,float t){
vector P = (v3-v2)-(v0-v1);vector Q = (v0-v1)-P;vector R = v2-v0;vector S = v1; return P*llPow(t,3) + Q*llPow(t,2) + R*t + S;}
vector vHem(vector v0,vector v1,vector v2,vector v3,float t,float tens,float bias){
float t2 = t*t;float t3 = t2*t; vector a0 = (v1-v0)*(1+bias)*(1-tens)/2; a0 += (v2-v1)*(1-bias)*(1-tens)/2; vector a1 = (v2-v1)*(1+bias)*(1-tens)/2; a1 += (v3-v2)*(1-bias)*(1-tens)/2; float b0 = 2*t3 - 3*t2 + 1; float b1 = t3 - 2*t2 + t; float b2 = t3 - t2; float b3 = -2*t3 + 3*t2; return ( b0 * v1+b1 * a0+b2 * a1+b3 * v2 );}
rotation rLin(rotation r0,rotation r1,float t){
// Spherical-Linear Interpolation float ang = llAngleBetween(r0, r1); if( ang > PI) ang -= TWO_PI; return r0 * llAxisAngle2Rot( llRot2Axis(r1/r0)*r0, ang*t);}
rotation rCos(rotation r0,rotation r1,float t){
// Spherical-Cosine Interpolation float f = (1 - llCos(t*PI))/2; float ang = llAngleBetween(r0, r1); if( ang > PI) ang -= TWO_PI; return r0 * llAxisAngle2Rot( llRot2Axis(r1/r0)*r0, ang*f);}
rotation rCub(rotation r0,rotation r1,rotation r2,rotation r3,float t){
// Spherical-Cubic Interpolation // r0 = Start, r1 = End, r2 and r3 affect path of curve! return rLin( rLin(r0,r1,t), rLin(r2,r3,t), 2*t*(1-t) );}
default{state_entry(){}}
</lsl>