Pero me dacalculando el inverso de la matriz obtengo:
re-etiquetado en este caso se emplea multiplicadores de lagrange a un problema de optimización de programación lineal mediante algebra lineal y derivadas parciales para facilitar su resolución en una función mediante la inversa de una matriz de covarianza
HubertRonald
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Solve(covMat) retorna que system is computationally singular: reciprocal condition number
Quiero obtener la cartera de variación mínima. Los rendimientos esperados mu son:
> mu
.SXQR .SXTR .SXNR .SXMR .SXAR .SX3R
0.100496686 0.068652744 0.065081570 0.013155820 0.086947540 0.103143934
.SX6R .SXFR .SXOR .SXDR .SX4R .SXRR
0.054990629 0.088484620 0.085435533 0.068080455 0.098365460 0.023932074
.SXER .SXKR .SX7R .SX8R .SXIR .SXPR
0.037525561 -0.000400454 0.024776148 0.007051037 0.042215791 0.116013074
y la matriz de covarianza covMat esta :
> covMat
.SXQR .SXTR .SXNR .SXMR .SXAR .SX3R .SX6R
.SXQR 0.03345763 0.03498086 0.04185753 0.03245136 0.03497776 0.02324828 0.02081399
.SXTR 0.03498086 0.04974472 0.04619830 0.04159817 0.04420657 0.02401824 0.02689768
.SXNR 0.04185753 0.04619830 0.06097311 0.04537355 0.05011720 0.02686316 0.03057380
.SXMR 0.03245136 0.04159817 0.04537355 0.04287405 0.04017447 0.02191462 0.02405812
.SXAR 0.03497776 0.04420657 0.05011720 0.04017447 0.05465295 0.02184147 0.02625680
.SX3R 0.02324828 0.02401824 0.02686316 0.02191462 0.02184147 0.02318865 0.01733667
.SX6R 0.02081399 0.02689768 0.03057380 0.02405812 0.02625680 0.01733667 0.03490965
.SXFR 0.04086303 0.05423479 0.05599539 0.04781758 0.04785298 0.03177379 0.03971822
.SXOR 0.03468033 0.04174388 0.04790487 0.03778244 0.03958789 0.02265676 0.03305845
.SXDR 0.01823918 0.02550628 0.02203189 0.02453928 0.01603731 0.01815483 0.01477641
.SX4R 0.03342966 0.03293408 0.04631396 0.03373207 0.03772380 0.02582638 0.02640921
.SXRR 0.03033003 0.03421856 0.04020604 0.03334523 0.03561357 0.01863272 0.02276777
.SXER 0.02051229 0.01525291 0.02833009 0.01743750 0.01769105 0.01464734 0.01775119
.SXKR 0.02694061 0.03196615 0.03950701 0.03682066 0.03574271 0.01394396 0.02498871
.SX7R 0.03635913 0.04453817 0.04871591 0.03789661 0.03882093 0.02804067 0.03282608
.SX8R 0.03991513 0.04959444 0.05847244 0.04934120 0.04838590 0.02522826 0.02852557
.SXIR 0.03508348 0.04831080 0.04905516 0.04555107 0.04046836 0.02949463 0.03263901
.SXPR 0.04456718 0.03223030 0.06505796 0.03031465 0.04557004 0.02648925 0.03399364
.SXFR .SXOR .SXDR .SX4R .SXRR .SXER .SXKR
.SXQR 0.04086303 0.03468033 0.018239181 0.03342966 0.03033003 0.02051229 0.02694061
.SXTR 0.05423479 0.04174388 0.025506282 0.03293408 0.03421856 0.01525291 0.03196615
.SXNR 0.05599539 0.04790487 0.022031890 0.04631396 0.04020604 0.02833009 0.03950701
.SXMR 0.04781758 0.03778244 0.024539282 0.03373207 0.03334523 0.01743750 0.03682066
.SXAR 0.04785298 0.03958789 0.016037311 0.03772380 0.03561357 0.01769105 0.03574271
.SX3R 0.03177379 0.02265676 0.018154833 0.02582638 0.01863272 0.01464734 0.01394396
.SX6R 0.03971822 0.03305845 0.014776414 0.02640921 0.02276777 0.01775119 0.02498871
.SXFR 0.07060256 0.05433736 0.029870028 0.04370332 0.04173824 0.02543286 0.03772980
.SXOR 0.05433736 0.05018950 0.019754192 0.03724791 0.03814745 0.02642396 0.03293653
.SXDR 0.02987003 0.01975419 0.024627383 0.01758262 0.01499347 0.01045468 0.01481692
.SX4R 0.04370332 0.03724791 0.017582623 0.04093423 0.03116615 0.02429916 0.02793648
.SXRR 0.04173824 0.03814745 0.014993470 0.03116615 0.03504357 0.01910385 0.03251937
.SXER 0.02543286 0.02642396 0.010454676 0.02429916 0.01910385 0.02722964 0.01322536
.SXKR 0.03772980 0.03293653 0.014816920 0.02793648 0.03251937 0.01322536 0.04505911
.SX7R 0.05938230 0.05169770 0.023760635 0.04122183 0.03709132 0.02779035 0.02632013
.SX8R 0.05506206 0.04556889 0.027748962 0.04155255 0.03723654 0.02359730 0.04231239
.SXIR 0.05991709 0.04424346 0.033142798 0.03888777 0.03233359 0.02232765 0.03104647
.SXPR 0.04889303 0.05858437 0.006954027 0.05553596 0.04425855 0.05085459 0.02653357
.SX7R .SX8R .SXIR .SXPR
.SXQR 0.03635913 0.03991513 0.03508348 0.044567182
.SXTR 0.04453817 0.04959444 0.04831080 0.032230303
.SXNR 0.04871591 0.05847244 0.04905516 0.065057961
.SXMR 0.03789661 0.04934120 0.04555107 0.030314650
.SXAR 0.03882093 0.04838590 0.04046836 0.045570043
.SX3R 0.02804067 0.02522826 0.02949463 0.026489254
.SX6R 0.03282608 0.02852557 0.03263901 0.033993645
.SXFR 0.05938230 0.05506206 0.05991709 0.048893031
.SXOR 0.05169770 0.04556889 0.04424346 0.058584372
.SXDR 0.02376063 0.02774896 0.03314280 0.006954027
.SX4R 0.04122183 0.04155255 0.03888777 0.055535956
.SXRR 0.03709132 0.03723654 0.03233359 0.044258552
.SXER 0.02779035 0.02359730 0.02232765 0.050854589
.SXKR 0.02632013 0.04231239 0.03104647 0.026533566
.SX7R 0.06443470 0.04622553 0.04997693 0.062958984
.SX8R 0.04622553 0.06557348 0.05449832 0.047301440
.SXIR 0.04997693 0.05449832 0.06063113 0.032824422
.SXPR 0.06295898 0.04730144 0.03282442 0.143337184
He visto que hay este articulo que da la ecuación y el código:
Entonces utilizo el código siguiente.
assetSymbols <- colnames(yearly_return)
mu <- colMeans(yearly_return,na.rm = TRUE) # expected returns
covMat <- cov(yearly_return) # covariance matrix
corMat <- cor(yearly_return) # correlation matrix
## Minimum Variance Portfolio function ####
getMinVariancePortfolio <- function(mu,covMat,assetSymbols) {
U <- rep(1, length(mu)) # vector of 1
O <- solve(covMat) # inverse of covariance matrix
w <- O%*%U /as.numeric(t(U)%*%O%*% U)
Risk <- sqrt(t(w) %*% covMat %*% w)
ExpReturn <- t(w) %*% mu
Weights <- `names<-`(round(w, 5), assetSymbols)
list(Weights = t(Weights),
ExpReturn = round(as.numeric(ExpReturn), 5),
Risk = round(as.numeric(Risk), 5))
}
Pero me da
Error in solve.default(covMat) :
system is computationally singular: reciprocal condition number = 1.06734e-19