文件名称:us_anamr
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zemax源码:
This DLL models an anamorphic aspheric surface.
This surface is essentially an even aspheric surface with different terms for
the x and y directions.
The sag is given by:
Z = ((CX*x*x)+(CY*y*y)) / (1 + sqrt(1-((1+KX)*CX*CX*x*x)-((1+KY)*CY*CY*y*y)))
+ AR*( (1 - AP)*x*x + (1 + AP)*y*y )^2
+ BR*( (1 - BP)*x*x + (1 + BP)*y*y )^3
+ CR*( (1 - CP)*x*x + (1 + CP)*y*y )^4
+ DR*( (1 - DP)*x*x + (1 + DP)*y*y )^5
Note the terms AR, BR, CR, and DR ... have units of length to the -3, -5, -7, and -9 power.
The terms AP, BP, CP, and DP are dimensionless.
The surface is rotationally symmetric only if AP = BP = CP = DP == 0 and CX = CY and KX = KY.
-ZEMAX source: This DLL models an anamorphic aspheric surface.This surface is essentially an even aspheric surface with different terms forthe x and y directions.The sag is given by: Z = ((CX* x* x)+ (CY* y* y))/(1+ sqrt (1- ((1+ KX)* CX* CX* x* x)- ((1+ KY)* CY* CY* y* y)))+ AR* ((1- AP)* x* x+ (1+ AP)* y* y) ^ 2+ BR* ((1- BP)* x* x+ (1+ BP)* y* y) ^ 3+ CR* ((1- CP)* x* x+ (1+ CP)* y* y) ^ 4+ DR* ((1- DP)* x* x+ (1 2B ! DP)* y* y) ^ 5Note the terms AR, BR, CR, and DR ... have units of length to the-3,-5,-7, and-9 power.The terms AP, BP, CP , and DP are dimensionless.The surface is rotationally symmetric only if AP = BP = CP = DP == 0 and CX = CY and KX = KY.
This DLL models an anamorphic aspheric surface.
This surface is essentially an even aspheric surface with different terms for
the x and y directions.
The sag is given by:
Z = ((CX*x*x)+(CY*y*y)) / (1 + sqrt(1-((1+KX)*CX*CX*x*x)-((1+KY)*CY*CY*y*y)))
+ AR*( (1 - AP)*x*x + (1 + AP)*y*y )^2
+ BR*( (1 - BP)*x*x + (1 + BP)*y*y )^3
+ CR*( (1 - CP)*x*x + (1 + CP)*y*y )^4
+ DR*( (1 - DP)*x*x + (1 + DP)*y*y )^5
Note the terms AR, BR, CR, and DR ... have units of length to the -3, -5, -7, and -9 power.
The terms AP, BP, CP, and DP are dimensionless.
The surface is rotationally symmetric only if AP = BP = CP = DP == 0 and CX = CY and KX = KY.
-ZEMAX source: This DLL models an anamorphic aspheric surface.This surface is essentially an even aspheric surface with different terms forthe x and y directions.The sag is given by: Z = ((CX* x* x)+ (CY* y* y))/(1+ sqrt (1- ((1+ KX)* CX* CX* x* x)- ((1+ KY)* CY* CY* y* y)))+ AR* ((1- AP)* x* x+ (1+ AP)* y* y) ^ 2+ BR* ((1- BP)* x* x+ (1+ BP)* y* y) ^ 3+ CR* ((1- CP)* x* x+ (1+ CP)* y* y) ^ 4+ DR* ((1- DP)* x* x+ (1 2B ! DP)* y* y) ^ 5Note the terms AR, BR, CR, and DR ... have units of length to the-3,-5,-7, and-9 power.The terms AP, BP, CP , and DP are dimensionless.The surface is rotationally symmetric only if AP = BP = CP = DP == 0 and CX = CY and KX = KY.
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下载文件列表
us_anamr.c
us_anamr.dll
us_anamr.dll