fixed dependencies

2024-10-24 15:46:01 +08:00
parent d16a5bd9c0
commit 1161e8d054
2005 changed files with 690883 additions and 0 deletions
--- a/vendor/github.com/starainrt/astro/basic/neptune.go
+++ b/vendor/github.com/starainrt/astro/basic/neptune.go
@@ -0,0 +1,437 @@
+package basic
+
+import (
+	"math"
+
+	"github.com/starainrt/astro/planet"
+	. "github.com/starainrt/astro/tools"
+)
+
+func NeptuneL(JD float64) float64 {
+	return planet.WherePlanet(7, 0, JD)
+}
+
+func NeptuneB(JD float64) float64 {
+	return planet.WherePlanet(7, 1, JD)
+}
+func NeptuneR(JD float64) float64 {
+	return planet.WherePlanet(7, 2, JD)
+}
+func ANeptuneX(JD float64) float64 {
+	l := NeptuneL(JD)
+	b := NeptuneB(JD)
+	r := NeptuneR(JD)
+	el := planet.WherePlanet(-1, 0, JD)
+	eb := planet.WherePlanet(-1, 1, JD)
+	er := planet.WherePlanet(-1, 2, JD)
+	x := r*Cos(b)*Cos(l) - er*Cos(eb)*Cos(el)
+	return x
+}
+
+func ANeptuneY(JD float64) float64 {
+
+	l := NeptuneL(JD)
+	b := NeptuneB(JD)
+	r := NeptuneR(JD)
+	el := planet.WherePlanet(-1, 0, JD)
+	eb := planet.WherePlanet(-1, 1, JD)
+	er := planet.WherePlanet(-1, 2, JD)
+	y := r*Cos(b)*Sin(l) - er*Cos(eb)*Sin(el)
+	return y
+}
+func ANeptuneZ(JD float64) float64 {
+	//l := NeptuneL(JD)
+	b := NeptuneB(JD)
+	r := NeptuneR(JD)
+	//	el := planet.WherePlanet(-1, 0, JD)
+	eb := planet.WherePlanet(-1, 1, JD)
+	er := planet.WherePlanet(-1, 2, JD)
+	z := r*Sin(b) - er*Sin(eb)
+	return z
+}
+
+func ANeptuneXYZ(JD float64) (float64, float64, float64) {
+	l := NeptuneL(JD)
+	b := NeptuneB(JD)
+	r := NeptuneR(JD)
+	el := planet.WherePlanet(-1, 0, JD)
+	eb := planet.WherePlanet(-1, 1, JD)
+	er := planet.WherePlanet(-1, 2, JD)
+	x := r*Cos(b)*Cos(l) - er*Cos(eb)*Cos(el)
+	y := r*Cos(b)*Sin(l) - er*Cos(eb)*Sin(el)
+	z := r*Sin(b) - er*Sin(eb)
+	return x, y, z
+}
+
+func NeptuneApparentRa(JD float64) float64 {
+	lo, bo := NeptuneApparentLoBo(JD)
+	sita := Sita(JD)
+	ra := math.Atan2((Sin(lo)*Cos(sita) - Tan(bo)*Sin(sita)), Cos(lo))
+	ra = ra * 180 / math.Pi
+	return Limit360(ra)
+}
+func NeptuneApparentDec(JD float64) float64 {
+	lo, bo := NeptuneApparentLoBo(JD)
+	sita := Sita(JD)
+	dec := ArcSin(Sin(bo)*Cos(sita) + Cos(bo)*Sin(sita)*Sin(lo))
+	return dec
+}
+
+func NeptuneApparentRaDec(JD float64) (float64, float64) {
+	lo, bo := NeptuneApparentLoBo(JD)
+	sita := Sita(JD)
+	ra := math.Atan2((Sin(lo)*Cos(sita) - Tan(bo)*Sin(sita)), Cos(lo))
+	ra = ra * 180 / math.Pi
+	dec := ArcSin(Sin(bo)*Cos(sita) + Cos(bo)*Sin(sita)*Sin(lo))
+	return Limit360(ra), dec
+}
+
+func EarthNeptuneAway(JD float64) float64 {
+	x, y, z := ANeptuneXYZ(JD)
+	to := math.Sqrt(x*x + y*y + z*z)
+	return to
+}
+
+func NeptuneApparentLo(JD float64) float64 {
+	x, y, z := ANeptuneXYZ(JD)
+	to := 0.0057755183 * math.Sqrt(x*x+y*y+z*z)
+	x, y, z = ANeptuneXYZ(JD - to)
+	lo := math.Atan2(y, x)
+	bo := math.Atan2(z, math.Sqrt(x*x+y*y))
+	lo = lo * 180 / math.Pi
+	bo = bo * 180 / math.Pi
+	lo = Limit360(lo)
+	//lo-=GXCLo(lo,bo,JD)/3600;
+	//bo+=GXCBo(lo,bo,JD);
+	lo += HJZD(JD)
+	return lo
+}
+
+func NeptuneApparentBo(JD float64) float64 {
+	x, y, z := ANeptuneXYZ(JD)
+	to := 0.0057755183 * math.Sqrt(x*x+y*y+z*z)
+	x, y, z = ANeptuneXYZ(JD - to)
+	//lo := math.Atan2(y, x)
+	bo := math.Atan2(z, math.Sqrt(x*x+y*y))
+	//lo = lo * 180 / math.Pi
+	bo = bo * 180 / math.Pi
+	//lo+=GXCLo(lo,bo,JD);
+	//bo+=GXCBo(lo,bo,JD)/3600;
+	//lo+=HJZD(JD);
+	return bo
+}
+
+func NeptuneApparentLoBo(JD float64) (float64, float64) {
+	x, y, z := ANeptuneXYZ(JD)
+	to := 0.0057755183 * math.Sqrt(x*x+y*y+z*z)
+	x, y, z = ANeptuneXYZ(JD - to)
+	lo := math.Atan2(y, x)
+	bo := math.Atan2(z, math.Sqrt(x*x+y*y))
+	lo = lo * 180 / math.Pi
+	bo = bo * 180 / math.Pi
+	lo = Limit360(lo)
+	//lo-=GXCLo(lo,bo,JD)/3600;
+	//bo+=GXCBo(lo,bo,JD);
+	lo += HJZD(JD)
+	return lo, bo
+}
+
+func NeptuneMag(JD float64) float64 {
+	AwaySun := NeptuneR(JD)
+	AwayEarth := EarthNeptuneAway(JD)
+	Away := planet.WherePlanet(-1, 2, JD)
+	i := (AwaySun*AwaySun + AwayEarth*AwayEarth - Away*Away) / (2 * AwaySun * AwayEarth)
+	i = ArcCos(i)
+	Mag := -6.87 + 5*math.Log10(AwaySun*AwayEarth)
+	return FloatRound(Mag, 2)
+}
+
+func NeptuneHeight(jde, lon, lat, timezone float64) float64 {
+	// 转换为世界时
+	utcJde := jde - timezone/24.0
+	// 计算视恒星时
+	ra, dec := NeptuneApparentRaDec(TD2UT(utcJde, true))
+	st := Limit360(ApparentSiderealTime(utcJde)*15 + lon)
+	// 计算时角
+	H := Limit360(st - ra)
+	// 高度角、时角与天球座标三角转换公式
+	// sin(h)=sin(lat)*sin(dec)+cos(dec)*cos(lat)*cos(H)
+	sinHeight := Sin(lat)*Sin(dec) + Cos(dec)*Cos(lat)*Cos(H)
+	return ArcSin(sinHeight)
+}
+
+func NeptuneAzimuth(jde, lon, lat, timezone float64) float64 {
+	// 转换为世界时
+	utcJde := jde - timezone/24.0
+	// 计算视恒星时
+	ra, dec := NeptuneApparentRaDec(TD2UT(utcJde, true))
+	st := Limit360(ApparentSiderealTime(utcJde)*15 + lon)
+	// 计算时角
+	H := Limit360(st - ra)
+	// 三角转换公式
+	tanAzimuth := Sin(H) / (Cos(H)*Sin(lat) - Tan(dec)*Cos(lat))
+	Azimuth := ArcTan(tanAzimuth)
+	if Azimuth < 0 {
+		if H/15 < 12 {
+			return Azimuth + 360
+		}
+		return Azimuth + 180
+	}
+	if H/15 < 12 {
+		return Azimuth + 180
+	}
+	return Azimuth
+}
+
+func NeptuneHourAngle(JD, Lon, TZ float64) float64 {
+	startime := Limit360(ApparentSiderealTime(JD-TZ/24)*15 + Lon)
+	timeangle := startime - NeptuneApparentRa(TD2UT(JD-TZ/24.0, true))
+	if timeangle < 0 {
+		timeangle += 360
+	}
+	return timeangle
+}
+
+func NeptuneCulminationTime(jde, lon, timezone float64) float64 {
+	//jde 世界时，非力学时，当地时区 0时，无需转换力学时
+	//ra,dec 瞬时天球座标，非J2000等时间天球坐标
+	jde = math.Floor(jde) + 0.5
+	JD1 := jde + Limit360(360-NeptuneHourAngle(jde, lon, timezone))/15.0/24.0*0.99726851851851851851
+	limitHA := func(jde, lon, timezone float64) float64 {
+		ha := NeptuneHourAngle(jde, lon, timezone)
+		if ha < 180 {
+			ha += 360
+		}
+		return ha
+	}
+	for {
+		JD0 := JD1
+		stDegree := limitHA(JD0, lon, timezone) - 360
+		stDegreep := (limitHA(JD0+0.000005, lon, timezone) - limitHA(JD0-0.000005, lon, timezone)) / 0.00001
+		JD1 = JD0 - stDegree/stDegreep
+		if math.Abs(JD1-JD0) <= 0.00001 {
+			break
+		}
+	}
+	return JD1
+}
+
+func NeptuneRiseTime(JD, Lon, Lat, TZ, ZS, HEI float64) float64 {
+	return neptuneRiseDown(JD, Lon, Lat, TZ, ZS, HEI, true)
+}
+
+func NeptuneDownTime(JD, Lon, Lat, TZ, ZS, HEI float64) float64 {
+	return neptuneRiseDown(JD, Lon, Lat, TZ, ZS, HEI, false)
+}
+
+func neptuneRiseDown(JD, Lon, Lat, TZ, ZS, HEI float64, isRise bool) float64 {
+	var An float64
+	JD = math.Floor(JD) + 0.5
+	ntz := math.Round(Lon / 15)
+	if ZS != 0 {
+		An = -0.8333
+	}
+	An = An - HeightDegreeByLat(HEI, Lat)
+	tztime := NeptuneCulminationTime(JD, Lon, ntz)
+	if NeptuneHeight(tztime, Lon, Lat, ntz) < An {
+		return -2 //极夜
+	}
+	if NeptuneHeight(tztime-0.5, Lon, Lat, ntz) > An {
+		return -1 //极昼
+	}
+	dec := HSunApparentDec(TD2UT(tztime-ntz/24, true))
+	//(sin(ho)-sin(φ)*sin(δ2))/(cos(φ)*cos(δ2))
+	tmp := (Sin(An) - Sin(dec)*Sin(Lat)) / (Cos(dec) * Cos(Lat))
+	var rise float64
+	if math.Abs(tmp) <= 1 {
+		rzsc := ArcCos(tmp) / 15
+		if isRise {
+			rise = tztime - rzsc/24 - 25.0/24.0/60.0
+		} else {
+			rise = tztime + rzsc/24 - 25.0/24.0/60.0
+		}
+	} else {
+		rise = tztime
+		i := 0
+		//TODO:使用二分法计算
+		for NeptuneHeight(rise, Lon, Lat, ntz) > An {
+			i++
+			if isRise {
+				rise -= 15.0 / 60.0 / 24.0
+			} else {
+				rise += 15.0 / 60.0 / 24.0
+			}
+			if i > 48 {
+				break
+			}
+		}
+	}
+	JD1 := rise
+	for {
+		JD0 := JD1
+		stDegree := NeptuneHeight(JD0, Lon, Lat, ntz) - An
+		stDegreep := (NeptuneHeight(JD0+0.000005, Lon, Lat, ntz) - NeptuneHeight(JD0-0.000005, Lon, Lat, ntz)) / 0.00001
+		JD1 = JD0 - stDegree/stDegreep
+		if math.Abs(JD1-JD0) <= 0.00001 {
+			break
+		}
+	}
+	return JD1 - ntz/24 + TZ/24
+}
+
+// Pos
+
+const NEPTUNE_S_PERIOD = 1 / ((1 / 365.256363004) - (1 / 4332.59))
+
+func neptuneConjunction(jde, degree float64, next uint8) float64 {
+	//0=last 1=next
+	decSub := func(jde float64, degree float64, filter bool) float64 {
+		sub := Limit360(Limit360(NeptuneApparentLo(jde)-HSunApparentLo(jde)) - degree)
+		if filter {
+			if sub > 180 {
+				sub -= 360
+			}
+			if sub < -180 {
+				sub += 360
+			}
+		}
+		return sub
+	}
+	dayCost := NEPTUNE_S_PERIOD / 360
+	nowSub := decSub(jde, degree, false)
+	if next == 0 {
+		jde -= (360 - nowSub) * dayCost
+	} else {
+		jde += dayCost * nowSub
+	}
+	JD1 := jde
+	for {
+		JD0 := JD1
+		stDegree := decSub(JD0, degree, true)
+		stDegreep := (decSub(JD0+0.000005, degree, true) - decSub(JD0-0.000005, degree, true)) / 0.00001
+		JD1 = JD0 - stDegree/stDegreep
+		if math.Abs(JD1-JD0) <= 0.00001 {
+			break
+		}
+	}
+	return TD2UT(JD1, false)
+}
+
+func LastNeptuneConjunction(jde float64) float64 {
+	return neptuneConjunction(jde, 0, 0)
+}
+
+func NextNeptuneConjunction(jde float64) float64 {
+	return neptuneConjunction(jde, 0, 1)
+}
+
+func LastNeptuneOpposition(jde float64) float64 {
+	return neptuneConjunction(jde, 180, 0)
+}
+
+func NextNeptuneOpposition(jde float64) float64 {
+	return neptuneConjunction(jde, 180, 1)
+}
+
+func NextNeptuneEasternQuadrature(jde float64) float64 {
+	return neptuneConjunction(jde, 90, 1)
+}
+
+func LastNeptuneEasternQuadrature(jde float64) float64 {
+	return neptuneConjunction(jde, 90, 0)
+}
+
+func NextNeptuneWesternQuadrature(jde float64) float64 {
+	return neptuneConjunction(jde, 270, 1)
+}
+
+func LastNeptuneWesternQuadrature(jde float64) float64 {
+	return neptuneConjunction(jde, 270, 0)
+}
+
+func neptuneRetrograde(jde float64, isLeft bool) float64 {
+	//0=last 1=next
+	decSub := func(jde float64, val float64) float64 {
+		sub := NeptuneApparentRa(jde+val) - NeptuneApparentRa(jde-val)
+		if sub > 180 {
+			sub -= 360
+		}
+		if sub < -180 {
+			sub += 360
+		}
+		return sub / (2 * val)
+	}
+	jde = NextNeptuneOpposition(jde)
+	if isLeft {
+		jde -= 60
+	} else {
+		jde += 60
+	}
+	for {
+		nowSub := decSub(jde, 1.0/86400.0)
+		if math.Abs(nowSub) > 0.55 {
+			jde += 2
+			continue
+		}
+		break
+	}
+	JD1 := jde
+	for {
+		JD0 := JD1
+		stDegree := decSub(JD0, 2.0/86400.0)
+		stDegreep := (decSub(JD0+15.0/86400.0, 2.0/86400.0) - decSub(JD0-15.0/86400.0, 2.0/86400.0)) / (30.0 / 86400.0)
+		JD1 = JD0 - stDegree/stDegreep
+		if math.Abs(JD1-JD0) <= 30.0/86400.0 {
+			break
+		}
+	}
+	JD1 = JD1 - 15.0/86400.0
+	min := JD1
+	minRa := 100.0
+	for i := 0.0; i < 60.0; i++ {
+		tmp := decSub(JD1+i*0.5/86400.0, 0.5/86400.0)
+		if math.Abs(tmp) < math.Abs(minRa) {
+			minRa = tmp
+			min = JD1 + i*0.5/86400.0
+		}
+	}
+	return TD2UT(min, false)
+}
+
+func NextNeptuneRetrogradeToPrograde(jde float64) float64 {
+	date := neptuneRetrograde(jde, false)
+	if date < jde {
+		op := NextNeptuneOpposition(jde)
+		return neptuneRetrograde(op+10, false)
+	}
+	return date
+}
+
+func LastNeptuneRetrogradeToPrograde(jde float64) float64 {
+	jde = LastNeptuneOpposition(jde) - 10
+	date := neptuneRetrograde(jde, false)
+	if date > jde {
+		op := LastNeptuneOpposition(jde)
+		return neptuneRetrograde(op-10, false)
+	}
+	return date
+}
+
+func NextNeptuneProgradeToRetrograde(jde float64) float64 {
+	date := neptuneRetrograde(jde, true)
+	if date < jde {
+		op := NextNeptuneOpposition(jde)
+		return neptuneRetrograde(op+10, true)
+	}
+	return date
+}
+
+func LastNeptuneProgradeToRetrograde(jde float64) float64 {
+	jde = LastNeptuneOpposition(jde) - 10
+	date := neptuneRetrograde(jde, true)
+	if date > jde {
+		op := LastNeptuneOpposition(jde)
+		return neptuneRetrograde(op-10, true)
+	}
+	return date
+}